Remove MSVC-specific definition of __func__ and __alignof__.

[ginac.git] / ginac / matrix.cpp

/** @file matrix.cpp
 *
 *  Implementation of symbolic matrices */

/*
 *  GiNaC Copyright (C) 1999-2018 Johannes Gutenberg University Mainz, Germany
 *
 *  This program is free software; you can redistribute it and/or modify
 *  it under the terms of the GNU General Public License as published by
 *  the Free Software Foundation; either version 2 of the License, or
 *  (at your option) any later version.
 *
 *  This program is distributed in the hope that it will be useful,
 *  but WITHOUT ANY WARRANTY; without even the implied warranty of
 *  MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
 *  GNU General Public License for more details.
 *
 *  You should have received a copy of the GNU General Public License
 *  along with this program; if not, write to the Free Software
 *  Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA  02110-1301  USA
 */

#include "matrix.h"
#include "numeric.h"
#include "lst.h"
#include "idx.h"
#include "indexed.h"
#include "add.h"
#include "power.h"
#include "symbol.h"
#include "operators.h"
#include "normal.h"
#include "archive.h"
#include "utils.h"

#include <algorithm>
#include <iostream>
#include <map>
#include <sstream>
#include <stdexcept>
#include <string>

namespace GiNaC {

GINAC_IMPLEMENT_REGISTERED_CLASS_OPT(matrix, basic,
  print_func<print_context>(&matrix::do_print).
  print_func<print_latex>(&matrix::do_print_latex).
  print_func<print_tree>(&matrix::do_print_tree).
  print_func<print_python_repr>(&matrix::do_print_python_repr))

//////////
// default constructor
//////////

/** Default ctor.  Initializes to 1 x 1-dimensional zero-matrix. */
matrix::matrix() : row(1), col(1), m(1, _ex0)
{
        setflag(status_flags::not_shareable);
}

//////////
// other constructors
//////////

// public

/** Very common ctor.  Initializes to r x c-dimensional zero-matrix.
 *
 *  @param r number of rows
 *  @param c number of cols */
matrix::matrix(unsigned r, unsigned c) : row(r), col(c), m(r*c, _ex0)
{
        setflag(status_flags::not_shareable);
}

/** Construct matrix from (flat) list of elements. If the list has fewer
 *  elements than the matrix, the remaining matrix elements are set to zero.
 *  If the list has more elements than the matrix, the excessive elements are
 *  thrown away. */
matrix::matrix(unsigned r, unsigned c, const lst & l)
  : row(r), col(c), m(r*c, _ex0)
{
        setflag(status_flags::not_shareable);

        size_t i = 0;
        for (auto & it : l) {
                size_t x = i % c;
                size_t y = i / c;
                if (y >= r)
                        break; // matrix smaller than list: throw away excessive elements
                m[y*c+x] = it;
                ++i;
        }
}

/** Construct a matrix from an 2 dimensional initializer list.
 *  Throws an exception if some row has a different length than all the others.
 */
matrix::matrix(std::initializer_list<std::initializer_list<ex>> l)
  : row(l.size()), col(l.begin()->size())
{
        setflag(status_flags::not_shareable);

        m.reserve(row*col);
        for (const auto & r : l) {
                unsigned c = 0;
                for (const auto & e : r) {
                        m.push_back(e);
                        ++c;
                }
                if (c != col)
                        throw std::invalid_argument("matrix::matrix{{}}: wrong dimension");
        }
}

// protected

/** Ctor from representation, for internal use only. */
matrix::matrix(unsigned r, unsigned c, const exvector & m2)
  : row(r), col(c), m(m2)
{
        setflag(status_flags::not_shareable);
}
matrix::matrix(unsigned r, unsigned c, exvector && m2)
  : row(r), col(c), m(std::move(m2))
{
        setflag(status_flags::not_shareable);
}

//////////
// archiving
//////////

void matrix::read_archive(const archive_node &n, lst &sym_lst)
{
        inherited::read_archive(n, sym_lst);

        if (!(n.find_unsigned("row", row)) || !(n.find_unsigned("col", col)))
                throw (std::runtime_error("unknown matrix dimensions in archive"));
        m.reserve(row * col);
        // XXX: default ctor inserts a zero element, we need to erase it here.
        m.pop_back();
        auto first = n.find_first("m");
        auto last = n.find_last("m");
        ++last;
        for (auto i=first; i != last; ++i) {
                ex e;
                n.find_ex_by_loc(i, e, sym_lst);
                m.push_back(e);
        }
}
GINAC_BIND_UNARCHIVER(matrix);

void matrix::archive(archive_node &n) const
{
        inherited::archive(n);
        n.add_unsigned("row", row);
        n.add_unsigned("col", col);
        for (auto & i : m) {
                n.add_ex("m", i);
        }
}

//////////
// functions overriding virtual functions from base classes
//////////

// public

void matrix::print_elements(const print_context & c, const char *row_start, const char *row_end, const char *row_sep, const char *col_sep) const
{
        for (unsigned ro=0; ro<row; ++ro) {
                c.s << row_start;
                for (unsigned co=0; co<col; ++co) {
                        m[ro*col+co].print(c);
                        if (co < col-1)
                                c.s << col_sep;
                        else
                                c.s << row_end;
                }
                if (ro < row-1)
                        c.s << row_sep;
        }
}

void matrix::do_print(const print_context & c, unsigned level) const
{
        c.s << "[";
        print_elements(c, "[", "]", ",", ",");
        c.s << "]";
}

void matrix::do_print_latex(const print_latex & c, unsigned level) const
{
        c.s << "\\left(\\begin{array}{" << std::string(col,'c') << "}";
        print_elements(c, "", "", "\\\\", "&");
        c.s << "\\end{array}\\right)";
}

void matrix::do_print_python_repr(const print_python_repr & c, unsigned level) const
{
        c.s << class_name() << '(';
        print_elements(c, "[", "]", ",", ",");
        c.s << ')';
}

/** nops is defined to be rows x columns. */
size_t matrix::nops() const
{
        return static_cast<size_t>(row) * static_cast<size_t>(col);
}

/** returns matrix entry at position (i/col, i%col). */
ex matrix::op(size_t i) const
{
        GINAC_ASSERT(i<nops());
        
        return m[i];
}

/** returns writable matrix entry at position (i/col, i%col). */
ex & matrix::let_op(size_t i)
{
        GINAC_ASSERT(i<nops());
        
        ensure_if_modifiable();
        return m[i];
}

ex matrix::subs(const exmap & mp, unsigned options) const
{
        exvector m2(row * col);
        for (unsigned r=0; r<row; ++r)
                for (unsigned c=0; c<col; ++c)
                        m2[r*col+c] = m[r*col+c].subs(mp, options);

        return matrix(row, col, std::move(m2)).subs_one_level(mp, options);
}

/** Complex conjugate every matrix entry. */
ex matrix::conjugate() const
{
        std::unique_ptr<exvector> ev(nullptr);
        for (auto i=m.begin(); i!=m.end(); ++i) {
                ex x = i->conjugate();
                if (ev) {
                        ev->push_back(x);
                        continue;
                }
                if (are_ex_trivially_equal(x, *i)) {
                        continue;
                }
                ev.reset(new exvector);
                ev->reserve(m.size());
                for (auto j=m.begin(); j!=i; ++j) {
                        ev->push_back(*j);
                }
                ev->push_back(x);
        }
        if (ev) {
                return matrix(row, col, std::move(*ev));
        }
        return *this;
}

ex matrix::real_part() const
{
        exvector v;
        v.reserve(m.size());
        for (auto & i : m)
                v.push_back(i.real_part());
        return matrix(row, col, std::move(v));
}

ex matrix::imag_part() const
{
        exvector v;
        v.reserve(m.size());
        for (auto & i : m)
                v.push_back(i.imag_part());
        return matrix(row, col, std::move(v));
}

// protected

int matrix::compare_same_type(const basic & other) const
{
        GINAC_ASSERT(is_exactly_a<matrix>(other));
        const matrix &o = static_cast<const matrix &>(other);
        
        // compare number of rows
        if (row != o.rows())
                return row < o.rows() ? -1 : 1;
        
        // compare number of columns
        if (col != o.cols())
                return col < o.cols() ? -1 : 1;
        
        // equal number of rows and columns, compare individual elements
        int cmpval;
        for (unsigned r=0; r<row; ++r) {
                for (unsigned c=0; c<col; ++c) {
                        cmpval = ((*this)(r,c)).compare(o(r,c));
                        if (cmpval!=0) return cmpval;
                }
        }
        // all elements are equal => matrices are equal;
        return 0;
}

bool matrix::match_same_type(const basic & other) const
{
        GINAC_ASSERT(is_exactly_a<matrix>(other));
        const matrix & o = static_cast<const matrix &>(other);
        
        // The number of rows and columns must be the same. This is necessary to
        // prevent a 2x3 matrix from matching a 3x2 one.
        return row == o.rows() && col == o.cols();
}

/** Automatic symbolic evaluation of an indexed matrix. */
ex matrix::eval_indexed(const basic & i) const
{
        GINAC_ASSERT(is_a<indexed>(i));
        GINAC_ASSERT(is_a<matrix>(i.op(0)));

        bool all_indices_unsigned = static_cast<const indexed &>(i).all_index_values_are(info_flags::nonnegint);

        // Check indices
        if (i.nops() == 2) {

                // One index, must be one-dimensional vector
                if (row != 1 && col != 1)
                        throw (std::runtime_error("matrix::eval_indexed(): vector must have exactly 1 index"));

                const idx & i1 = ex_to<idx>(i.op(1));

                if (col == 1) {

                        // Column vector
                        if (!i1.get_dim().is_equal(row))
                                throw (std::runtime_error("matrix::eval_indexed(): dimension of index must match number of vector elements"));

                        // Index numeric -> return vector element
                        if (all_indices_unsigned) {
                                unsigned n1 = ex_to<numeric>(i1.get_value()).to_int();
                                if (n1 >= row)
                                        throw (std::runtime_error("matrix::eval_indexed(): value of index exceeds number of vector elements"));
                                return (*this)(n1, 0);
                        }

                } else {

                        // Row vector
                        if (!i1.get_dim().is_equal(col))
                                throw (std::runtime_error("matrix::eval_indexed(): dimension of index must match number of vector elements"));

                        // Index numeric -> return vector element
                        if (all_indices_unsigned) {
                                unsigned n1 = ex_to<numeric>(i1.get_value()).to_int();
                                if (n1 >= col)
                                        throw (std::runtime_error("matrix::eval_indexed(): value of index exceeds number of vector elements"));
                                return (*this)(0, n1);
                        }
                }

        } else if (i.nops() == 3) {

                // Two indices
                const idx & i1 = ex_to<idx>(i.op(1));
                const idx & i2 = ex_to<idx>(i.op(2));

                if (!i1.get_dim().is_equal(row))
                        throw (std::runtime_error("matrix::eval_indexed(): dimension of first index must match number of rows"));
                if (!i2.get_dim().is_equal(col))
                        throw (std::runtime_error("matrix::eval_indexed(): dimension of second index must match number of columns"));

                // Pair of dummy indices -> compute trace
                if (is_dummy_pair(i1, i2))
                        return trace();

                // Both indices numeric -> return matrix element
                if (all_indices_unsigned) {
                        unsigned n1 = ex_to<numeric>(i1.get_value()).to_int(), n2 = ex_to<numeric>(i2.get_value()).to_int();
                        if (n1 >= row)
                                throw (std::runtime_error("matrix::eval_indexed(): value of first index exceeds number of rows"));
                        if (n2 >= col)
                                throw (std::runtime_error("matrix::eval_indexed(): value of second index exceeds number of columns"));
                        return (*this)(n1, n2);
                }

        } else
                throw (std::runtime_error("matrix::eval_indexed(): matrix must have exactly 2 indices"));

        return i.hold();
}

/** Sum of two indexed matrices. */
ex matrix::add_indexed(const ex & self, const ex & other) const
{
        GINAC_ASSERT(is_a<indexed>(self));
        GINAC_ASSERT(is_a<matrix>(self.op(0)));
        GINAC_ASSERT(is_a<indexed>(other));
        GINAC_ASSERT(self.nops() == 2 || self.nops() == 3);

        // Only add two matrices
        if (is_a<matrix>(other.op(0))) {
                GINAC_ASSERT(other.nops() == 2 || other.nops() == 3);

                const matrix &self_matrix = ex_to<matrix>(self.op(0));
                const matrix &other_matrix = ex_to<matrix>(other.op(0));

                if (self.nops() == 2 && other.nops() == 2) { // vector + vector

                        if (self_matrix.row == other_matrix.row)
                                return indexed(self_matrix.add(other_matrix), self.op(1));
                        else if (self_matrix.row == other_matrix.col)
                                return indexed(self_matrix.add(other_matrix.transpose()), self.op(1));

                } else if (self.nops() == 3 && other.nops() == 3) { // matrix + matrix

                        if (self.op(1).is_equal(other.op(1)) && self.op(2).is_equal(other.op(2)))
                                return indexed(self_matrix.add(other_matrix), self.op(1), self.op(2));
                        else if (self.op(1).is_equal(other.op(2)) && self.op(2).is_equal(other.op(1)))
                                return indexed(self_matrix.add(other_matrix.transpose()), self.op(1), self.op(2));

                }
        }

        // Don't know what to do, return unevaluated sum
        return self + other;
}

/** Product of an indexed matrix with a number. */
ex matrix::scalar_mul_indexed(const ex & self, const numeric & other) const
{
        GINAC_ASSERT(is_a<indexed>(self));
        GINAC_ASSERT(is_a<matrix>(self.op(0)));
        GINAC_ASSERT(self.nops() == 2 || self.nops() == 3);

        const matrix &self_matrix = ex_to<matrix>(self.op(0));

        if (self.nops() == 2)
                return indexed(self_matrix.mul(other), self.op(1));
        else // self.nops() == 3
                return indexed(self_matrix.mul(other), self.op(1), self.op(2));
}

/** Contraction of an indexed matrix with something else. */
bool matrix::contract_with(exvector::iterator self, exvector::iterator other, exvector & v) const
{
        GINAC_ASSERT(is_a<indexed>(*self));
        GINAC_ASSERT(is_a<indexed>(*other));
        GINAC_ASSERT(self->nops() == 2 || self->nops() == 3);
        GINAC_ASSERT(is_a<matrix>(self->op(0)));

        // Only contract with other matrices
        if (!is_a<matrix>(other->op(0)))
                return false;

        GINAC_ASSERT(other->nops() == 2 || other->nops() == 3);

        const matrix &self_matrix = ex_to<matrix>(self->op(0));
        const matrix &other_matrix = ex_to<matrix>(other->op(0));

        if (self->nops() == 2) {

                if (other->nops() == 2) { // vector * vector (scalar product)

                        if (self_matrix.col == 1) {
                                if (other_matrix.col == 1) {
                                        // Column vector * column vector, transpose first vector
                                        *self = self_matrix.transpose().mul(other_matrix)(0, 0);
                                } else {
                                        // Column vector * row vector, swap factors
                                        *self = other_matrix.mul(self_matrix)(0, 0);
                                }
                        } else {
                                if (other_matrix.col == 1) {
                                        // Row vector * column vector, perfect
                                        *self = self_matrix.mul(other_matrix)(0, 0);
                                } else {
                                        // Row vector * row vector, transpose second vector
                                        *self = self_matrix.mul(other_matrix.transpose())(0, 0);
                                }
                        }
                        *other = _ex1;
                        return true;

                } else { // vector * matrix

                        // B_i * A_ij = (B*A)_j (B is row vector)
                        if (is_dummy_pair(self->op(1), other->op(1))) {
                                if (self_matrix.row == 1)
                                        *self = indexed(self_matrix.mul(other_matrix), other->op(2));
                                else
                                        *self = indexed(self_matrix.transpose().mul(other_matrix), other->op(2));
                                *other = _ex1;
                                return true;
                        }

                        // B_j * A_ij = (A*B)_i (B is column vector)
                        if (is_dummy_pair(self->op(1), other->op(2))) {
                                if (self_matrix.col == 1)
                                        *self = indexed(other_matrix.mul(self_matrix), other->op(1));
                                else
                                        *self = indexed(other_matrix.mul(self_matrix.transpose()), other->op(1));
                                *other = _ex1;
                                return true;
                        }
                }

        } else if (other->nops() == 3) { // matrix * matrix

                // A_ij * B_jk = (A*B)_ik
                if (is_dummy_pair(self->op(2), other->op(1))) {
                        *self = indexed(self_matrix.mul(other_matrix), self->op(1), other->op(2));
                        *other = _ex1;
                        return true;
                }

                // A_ij * B_kj = (A*Btrans)_ik
                if (is_dummy_pair(self->op(2), other->op(2))) {
                        *self = indexed(self_matrix.mul(other_matrix.transpose()), self->op(1), other->op(1));
                        *other = _ex1;
                        return true;
                }

                // A_ji * B_jk = (Atrans*B)_ik
                if (is_dummy_pair(self->op(1), other->op(1))) {
                        *self = indexed(self_matrix.transpose().mul(other_matrix), self->op(2), other->op(2));
                        *other = _ex1;
                        return true;
                }

                // A_ji * B_kj = (B*A)_ki
                if (is_dummy_pair(self->op(1), other->op(2))) {
                        *self = indexed(other_matrix.mul(self_matrix), other->op(1), self->op(2));
                        *other = _ex1;
                        return true;
                }
        }

        return false;
}


//////////
// non-virtual functions in this class
//////////

// public

/** Sum of matrices.
 *
 *  @exception logic_error (incompatible matrices) */
matrix matrix::add(const matrix & other) const
{
        if (col != other.col || row != other.row)
                throw std::logic_error("matrix::add(): incompatible matrices");
        
        exvector sum(this->m);
        auto ci = other.m.begin();
        for (auto & i : sum)
                i += *ci++;
        
        return matrix(row, col, std::move(sum));
}


/** Difference of matrices.
 *
 *  @exception logic_error (incompatible matrices) */
matrix matrix::sub(const matrix & other) const
{
        if (col != other.col || row != other.row)
                throw std::logic_error("matrix::sub(): incompatible matrices");
        
        exvector dif(this->m);
        auto ci = other.m.begin();
        for (auto & i : dif)
                i -= *ci++;
        
        return matrix(row, col, std::move(dif));
}


/** Product of matrices.
 *
 *  @exception logic_error (incompatible matrices) */
matrix matrix::mul(const matrix & other) const
{
        if (this->cols() != other.rows())
                throw std::logic_error("matrix::mul(): incompatible matrices");
        
        exvector prod(this->rows()*other.cols());
        
        for (unsigned r1=0; r1<this->rows(); ++r1) {
                for (unsigned c=0; c<this->cols(); ++c) {
                        // Quick test: can we shortcut?
                        if (m[r1*col+c].is_zero())
                                continue;
                        for (unsigned r2=0; r2<other.cols(); ++r2)
                                prod[r1*other.col+r2] += (m[r1*col+c] * other.m[c*other.col+r2]);
                }
        }
        return matrix(row, other.col, std::move(prod));
}


/** Product of matrix and scalar. */
matrix matrix::mul(const numeric & other) const
{
        exvector prod(row * col);

        for (unsigned r=0; r<row; ++r)
                for (unsigned c=0; c<col; ++c)
                        prod[r*col+c] = m[r*col+c] * other;

        return matrix(row, col, std::move(prod));
}


/** Product of matrix and scalar expression. */
matrix matrix::mul_scalar(const ex & other) const
{
        if (other.return_type() != return_types::commutative)
                throw std::runtime_error("matrix::mul_scalar(): non-commutative scalar");

        exvector prod(row * col);

        for (unsigned r=0; r<row; ++r)
                for (unsigned c=0; c<col; ++c)
                        prod[r*col+c] = m[r*col+c] * other;

        return matrix(row, col, std::move(prod));
}


/** Power of a matrix.  Currently handles integer exponents only. */
matrix matrix::pow(const ex & expn) const
{
        if (col!=row)
                throw (std::logic_error("matrix::pow(): matrix not square"));
        
        if (is_exactly_a<numeric>(expn)) {
                // Integer cases are computed by successive multiplication, using the
                // obvious shortcut of storing temporaries, like A^4 == (A*A)*(A*A).
                if (expn.info(info_flags::integer)) {
                        numeric b = ex_to<numeric>(expn);
                        matrix A(row,col);
                        if (expn.info(info_flags::negative)) {
                                b *= -1;
                                A = this->inverse();
                        } else {
                                A = *this;
                        }
                        matrix C(row,col);
                        for (unsigned r=0; r<row; ++r)
                                C(r,r) = _ex1;
                        if (b.is_zero())
                                return C;
                        // This loop computes the representation of b in base 2 from right
                        // to left and multiplies the factors whenever needed.  Note
                        // that this is not entirely optimal but close to optimal and
                        // "better" algorithms are much harder to implement.  (See Knuth,
                        // TAoCP2, section "Evaluation of Powers" for a good discussion.)
                        while (b!=*_num1_p) {
                                if (b.is_odd()) {
                                        C = C.mul(A);
                                        --b;
                                }
                                b /= *_num2_p;  // still integer.
                                A = A.mul(A);
                        }
                        return A.mul(C);
                }
        }
        throw (std::runtime_error("matrix::pow(): don't know how to handle exponent"));
}


/** operator() to access elements for reading.
 *
 *  @param ro row of element
 *  @param co column of element
 *  @exception range_error (index out of range) */
const ex & matrix::operator() (unsigned ro, unsigned co) const
{
        if (ro>=row || co>=col)
                throw (std::range_error("matrix::operator(): index out of range"));

        return m[ro*col+co];
}


/** operator() to access elements for writing.
 *
 *  @param ro row of element
 *  @param co column of element
 *  @exception range_error (index out of range) */
ex & matrix::operator() (unsigned ro, unsigned co)
{
        if (ro>=row || co>=col)
                throw (std::range_error("matrix::operator(): index out of range"));

        ensure_if_modifiable();
        return m[ro*col+co];
}


/** Transposed of an m x n matrix, producing a new n x m matrix object that
 *  represents the transposed. */
matrix matrix::transpose() const
{
        exvector trans(this->cols()*this->rows());
        
        for (unsigned r=0; r<this->cols(); ++r)
                for (unsigned c=0; c<this->rows(); ++c)
                        trans[r*this->rows()+c] = m[c*this->cols()+r];
        
        return matrix(this->cols(), this->rows(), std::move(trans));
}

/** Determinant of square matrix.  This routine doesn't actually calculate the
 *  determinant, it only implements some heuristics about which algorithm to
 *  run.  If all the elements of the matrix are elements of an integral domain
 *  the determinant is also in that integral domain and the result is expanded
 *  only.  If one or more elements are from a quotient field the determinant is
 *  usually also in that quotient field and the result is normalized before it
 *  is returned.  This implies that the determinant of the symbolic 2x2 matrix
 *  [[a/(a-b),1],[b/(a-b),1]] is returned as unity.  (In this respect, it
 *  behaves like MapleV and unlike Mathematica.)
 *
 *  @param     algo allows to chose an algorithm
 *  @return    the determinant as a new expression
 *  @exception logic_error (matrix not square)
 *  @see       determinant_algo */
ex matrix::determinant(unsigned algo) const
{
        if (row!=col)
                throw (std::logic_error("matrix::determinant(): matrix not square"));
        GINAC_ASSERT(row*col==m.capacity());
        
        // Gather some statistical information about this matrix:
        bool numeric_flag = true;
        bool normal_flag = false;
        unsigned sparse_count = 0;  // counts non-zero elements
        for (auto r : m) {
                if (!r.info(info_flags::numeric))
                        numeric_flag = false;
                exmap srl;  // symbol replacement list
                ex rtest = r.to_rational(srl);
                if (!rtest.is_zero())
                        ++sparse_count;
                if (!rtest.info(info_flags::crational_polynomial) &&
                     rtest.info(info_flags::rational_function))
                        normal_flag = true;
        }
        
        // Here is the heuristics in case this routine has to decide:
        if (algo == determinant_algo::automatic) {
                // Minor expansion is generally a good guess:
                algo = determinant_algo::laplace;
                // Does anybody know when a matrix is really sparse?
                // Maybe <~row/2.236 nonzero elements average in a row?
                if (row>3 && 5*sparse_count<=row*col)
                        algo = determinant_algo::bareiss;
                // Purely numeric matrix can be handled by Gauss elimination.
                // This overrides any prior decisions.
                if (numeric_flag)
                        algo = determinant_algo::gauss;
        }
        
        // Trap the trivial case here, since some algorithms don't like it
        if (this->row==1) {
                // for consistency with non-trivial determinants...
                if (normal_flag)
                        return m[0].normal();
                else
                        return m[0].expand();
        }

        // Compute the determinant
        switch(algo) {
                case determinant_algo::gauss: {
                        ex det = 1;
                        matrix tmp(*this);
                        int sign = tmp.gauss_elimination(true);
                        for (unsigned d=0; d<row; ++d)
                                det *= tmp.m[d*col+d];
                        if (normal_flag)
                                return (sign*det).normal();
                        else
                                return (sign*det).normal().expand();
                }
                case determinant_algo::bareiss: {
                        matrix tmp(*this);
                        int sign;
                        sign = tmp.fraction_free_elimination(true);
                        if (normal_flag)
                                return (sign*tmp.m[row*col-1]).normal();
                        else
                                return (sign*tmp.m[row*col-1]).expand();
                }
                case determinant_algo::divfree: {
                        matrix tmp(*this);
                        int sign;
                        sign = tmp.division_free_elimination(true);
                        if (sign==0)
                                return _ex0;
                        ex det = tmp.m[row*col-1];
                        // factor out accumulated bogus slag
                        for (unsigned d=0; d<row-2; ++d)
                                for (unsigned j=0; j<row-d-2; ++j)
                                        det = (det/tmp.m[d*col+d]).normal();
                        return (sign*det);
                }
                case determinant_algo::laplace:
                default: {
                        // This is the minor expansion scheme.  We always develop such
                        // that the smallest minors (i.e, the trivial 1x1 ones) are on the
                        // rightmost column.  For this to be efficient, empirical tests
                        // have shown that the emptiest columns (i.e. the ones with most
                        // zeros) should be the ones on the right hand side -- although
                        // this might seem counter-intuitive (and in contradiction to some
                        // literature like the FORM manual).  Please go ahead and test it
                        // if you don't believe me!  Therefore we presort the columns of
                        // the matrix:
                        typedef std::pair<unsigned,unsigned> uintpair;
                        std::vector<uintpair> c_zeros;  // number of zeros in column
                        for (unsigned c=0; c<col; ++c) {
                                unsigned acc = 0;
                                for (unsigned r=0; r<row; ++r)
                                        if (m[r*col+c].is_zero())
                                                ++acc;
                                c_zeros.push_back(uintpair(acc,c));
                        }
                        std::sort(c_zeros.begin(),c_zeros.end());
                        std::vector<unsigned> pre_sort;
                        for (auto & i : c_zeros)
                                pre_sort.push_back(i.second);
                        std::vector<unsigned> pre_sort_test(pre_sort); // permutation_sign() modifies the vector so we make a copy here
                        int sign = permutation_sign(pre_sort_test.begin(), pre_sort_test.end());
                        exvector result(row*col);  // represents sorted matrix
                        unsigned c = 0;
                        for (auto & it : pre_sort) {
                                for (unsigned r=0; r<row; ++r)
                                        result[r*col+c] = m[r*col+it];
                                ++c;
                        }
                        
                        if (normal_flag)
                                return (sign*matrix(row, col, std::move(result)).determinant_minor()).normal();
                        else
                                return sign*matrix(row, col, std::move(result)).determinant_minor();
                }
        }
}


/** Trace of a matrix.  The result is normalized if it is in some quotient
 *  field and expanded only otherwise.  This implies that the trace of the
 *  symbolic 2x2 matrix [[a/(a-b),x],[y,b/(b-a)]] is recognized to be unity.
 *
 *  @return    the sum of diagonal elements
 *  @exception logic_error (matrix not square) */
ex matrix::trace() const
{
        if (row != col)
                throw (std::logic_error("matrix::trace(): matrix not square"));
        
        ex tr;
        for (unsigned r=0; r<col; ++r)
                tr += m[r*col+r];
        
        if (tr.info(info_flags::rational_function) &&
           !tr.info(info_flags::crational_polynomial))
                return tr.normal();
        else
                return tr.expand();
}


/** Characteristic Polynomial.  Following mathematica notation the
 *  characteristic polynomial of a matrix M is defined as the determinant of
 *  (M - lambda * 1) where 1 stands for the unit matrix of the same dimension
 *  as M.  Note that some CASs define it with a sign inside the determinant
 *  which gives rise to an overall sign if the dimension is odd.  This method
 *  returns the characteristic polynomial collected in powers of lambda as a
 *  new expression.
 *
 *  @return    characteristic polynomial as new expression
 *  @exception logic_error (matrix not square)
 *  @see       matrix::determinant() */
ex matrix::charpoly(const ex & lambda) const
{
        if (row != col)
                throw (std::logic_error("matrix::charpoly(): matrix not square"));
        
        bool numeric_flag = true;
        for (auto & r : m) {
                if (!r.info(info_flags::numeric)) {
                        numeric_flag = false;
                        break;
                }
        }
        
        // The pure numeric case is traditionally rather common.  Hence, it is
        // trapped and we use Leverrier's algorithm which goes as row^3 for
        // every coefficient.  The expensive part is the matrix multiplication.
        if (numeric_flag) {

                matrix B(*this);
                ex c = B.trace();
                ex poly = power(lambda, row) - c*power(lambda, row-1);
                for (unsigned i=1; i<row; ++i) {
                        for (unsigned j=0; j<row; ++j)
                                B.m[j*col+j] -= c;
                        B = this->mul(B);
                        c = B.trace() / ex(i+1);
                        poly -= c*power(lambda, row-i-1);
                }
                if (row%2)
                        return -poly;
                else
                        return poly;

        } else {
        
                matrix M(*this);
                for (unsigned r=0; r<col; ++r)
                        M.m[r*col+r] -= lambda;
        
                return M.determinant().collect(lambda);
        }
}


/** Inverse of this matrix, with automatic algorithm selection. */
matrix matrix::inverse() const
{
        return inverse(solve_algo::automatic);
}

/** Inverse of this matrix.
 *
 *  @param algo selects the algorithm (one of solve_algo)
 *  @return    the inverted matrix
 *  @exception logic_error (matrix not square)
 *  @exception runtime_error (singular matrix) */
matrix matrix::inverse(unsigned algo) const
{
        if (row != col)
                throw (std::logic_error("matrix::inverse(): matrix not square"));
        
        // This routine actually doesn't do anything fancy at all.  We compute the
        // inverse of the matrix A by solving the system A * A^{-1} == Id.
        
        // First populate the identity matrix supposed to become the right hand side.
        matrix identity(row,col);
        for (unsigned i=0; i<row; ++i)
                identity(i,i) = _ex1;
        
        // Populate a dummy matrix of variables, just because of compatibility with
        // matrix::solve() which wants this (for compatibility with under-determined
        // systems of equations).
        matrix vars(row,col);
        for (unsigned r=0; r<row; ++r)
                for (unsigned c=0; c<col; ++c)
                        vars(r,c) = symbol();
        
        matrix sol(row,col);
        try {
                sol = this->solve(vars, identity, algo);
        } catch (const std::runtime_error & e) {
            if (e.what()==std::string("matrix::solve(): inconsistent linear system"))
                        throw (std::runtime_error("matrix::inverse(): singular matrix"));
                else
                        throw;
        }
        return sol;
}


/** Solve a linear system consisting of a m x n matrix and a m x p right hand
 *  side by applying an elimination scheme to the augmented matrix.
 *
 *  @param vars n x p matrix, all elements must be symbols 
 *  @param rhs m x p matrix
 *  @param algo selects the solving algorithm
 *  @return n x p solution matrix
 *  @exception logic_error (incompatible matrices)
 *  @exception invalid_argument (1st argument must be matrix of symbols)
 *  @exception runtime_error (inconsistent linear system)
 *  @see       solve_algo */
matrix matrix::solve(const matrix & vars,
                     const matrix & rhs,
                     unsigned algo) const
{
        const unsigned m = this->rows();
        const unsigned n = this->cols();
        const unsigned p = rhs.cols();
        
        // syntax checks    
        if ((rhs.rows() != m) || (vars.rows() != n) || (vars.col != p))
                throw (std::logic_error("matrix::solve(): incompatible matrices"));
        for (unsigned ro=0; ro<n; ++ro)
                for (unsigned co=0; co<p; ++co)
                        if (!vars(ro,co).info(info_flags::symbol))
                                throw (std::invalid_argument("matrix::solve(): 1st argument must be matrix of symbols"));
        
        // build the augmented matrix of *this with rhs attached to the right
        matrix aug(m,n+p);
        for (unsigned r=0; r<m; ++r) {
                for (unsigned c=0; c<n; ++c)
                        aug.m[r*(n+p)+c] = this->m[r*n+c];
                for (unsigned c=0; c<p; ++c)
                        aug.m[r*(n+p)+c+n] = rhs.m[r*p+c];
        }
        
        // Gather some statistical information about the augmented matrix:
        bool numeric_flag = true;
        for (auto & r : aug.m) {
                if (!r.info(info_flags::numeric)) {
                        numeric_flag = false;
                        break;
                }
        }
        
        // Here is the heuristics in case this routine has to decide:
        if (algo == solve_algo::automatic) {
                // Bareiss (fraction-free) elimination is generally a good guess:
                algo = solve_algo::bareiss;
                // For m<3, Bareiss elimination is equivalent to division free
                // elimination but has more logistic overhead
                if (m<3)
                        algo = solve_algo::divfree;
                // This overrides any prior decisions.
                if (numeric_flag)
                        algo = solve_algo::gauss;
        }
        
        // Eliminate the augmented matrix:
        switch(algo) {
                case solve_algo::gauss:
                        aug.gauss_elimination();
                        break;
                case solve_algo::divfree:
                        aug.division_free_elimination();
                        break;
                case solve_algo::bareiss:
                default:
                        aug.fraction_free_elimination();
        }
        
        // assemble the solution matrix:
        matrix sol(n,p);
        for (unsigned co=0; co<p; ++co) {
                unsigned last_assigned_sol = n+1;
                for (int r=m-1; r>=0; --r) {
                        unsigned fnz = 1;    // first non-zero in row
                        while ((fnz<=n) && (aug.m[r*(n+p)+(fnz-1)].normal().is_zero()))
                                ++fnz;
                        if (fnz>n) {
                                // row consists only of zeros, corresponding rhs must be 0, too
                                if (!aug.m[r*(n+p)+n+co].normal().is_zero()) {
                                        throw (std::runtime_error("matrix::solve(): inconsistent linear system"));
                                }
                        } else {
                                // assign solutions for vars between fnz+1 and
                                // last_assigned_sol-1: free parameters
                                for (unsigned c=fnz; c<last_assigned_sol-1; ++c)
                                        sol(c,co) = vars.m[c*p+co];
                                ex e = aug.m[r*(n+p)+n+co];
                                for (unsigned c=fnz; c<n; ++c)
                                        e -= aug.m[r*(n+p)+c]*sol.m[c*p+co];
                                sol(fnz-1,co) = (e/(aug.m[r*(n+p)+(fnz-1)])).normal();
                                last_assigned_sol = fnz;
                        }
                }
                // assign solutions for vars between 1 and
                // last_assigned_sol-1: free parameters
                for (unsigned ro=0; ro<last_assigned_sol-1; ++ro)
                        sol(ro,co) = vars(ro,co);
        }
        
        return sol;
}


/** Compute the rank of this matrix. */
unsigned matrix::rank() const
{
        // Method:
        // Transform this matrix into upper echelon form and then count the
        // number of non-zero rows.

        GINAC_ASSERT(row*col==m.capacity());

        // Actually, any elimination scheme will do since we are only
        // interested in the echelon matrix' zeros.
        matrix to_eliminate = *this;
        to_eliminate.fraction_free_elimination();

        unsigned r = row*col;  // index of last non-zero element
        while (r--) {
                if (!to_eliminate.m[r].is_zero())
                        return 1+r/col;
        }
        return 0;
}


// protected

/** Recursive determinant for small matrices having at least one symbolic
 *  entry.  The basic algorithm, known as Laplace-expansion, is enhanced by
 *  some bookkeeping to avoid calculation of the same submatrices ("minors")
 *  more than once.  According to W.M.Gentleman and S.C.Johnson this algorithm
 *  is better than elimination schemes for matrices of sparse multivariate
 *  polynomials and also for matrices of dense univariate polynomials if the
 *  matrix' dimension is larger than 7.
 *
 *  @return the determinant as a new expression (in expanded form)
 *  @see matrix::determinant() */
ex matrix::determinant_minor() const
{
        // for small matrices the algorithm does not make any sense:
        const unsigned n = this->cols();
        if (n==1)
                return m[0].expand();
        if (n==2)
                return (m[0]*m[3]-m[2]*m[1]).expand();
        if (n==3)
                return (m[0]*m[4]*m[8]-m[0]*m[5]*m[7]-
                        m[1]*m[3]*m[8]+m[2]*m[3]*m[7]+
                        m[1]*m[5]*m[6]-m[2]*m[4]*m[6]).expand();
        
        // This algorithm can best be understood by looking at a naive
        // implementation of Laplace-expansion, like this one:
        // ex det;
        // matrix minorM(this->rows()-1,this->cols()-1);
        // for (unsigned r1=0; r1<this->rows(); ++r1) {
        //     // shortcut if element(r1,0) vanishes
        //     if (m[r1*col].is_zero())
        //         continue;
        //     // assemble the minor matrix
        //     for (unsigned r=0; r<minorM.rows(); ++r) {
        //         for (unsigned c=0; c<minorM.cols(); ++c) {
        //             if (r<r1)
        //                 minorM(r,c) = m[r*col+c+1];
        //             else
        //                 minorM(r,c) = m[(r+1)*col+c+1];
        //         }
        //     }
        //     // recurse down and care for sign:
        //     if (r1%2)
        //         det -= m[r1*col] * minorM.determinant_minor();
        //     else
        //         det += m[r1*col] * minorM.determinant_minor();
        // }
        // return det.expand();
        // What happens is that while proceeding down many of the minors are
        // computed more than once.  In particular, there are binomial(n,k)
        // kxk minors and each one is computed factorial(n-k) times.  Therefore
        // it is reasonable to store the results of the minors.  We proceed from
        // right to left.  At each column c we only need to retrieve the minors
        // calculated in step c-1.  We therefore only have to store at most 
        // 2*binomial(n,n/2) minors.
        
        // Unique flipper counter for partitioning into minors
        std::vector<unsigned> Pkey;
        Pkey.reserve(n);
        // key for minor determinant (a subpartition of Pkey)
        std::vector<unsigned> Mkey;
        Mkey.reserve(n-1);
        // we store our subminors in maps, keys being the rows they arise from
        typedef std::map<std::vector<unsigned>,class ex> Rmap;
        typedef std::map<std::vector<unsigned>,class ex>::value_type Rmap_value;
        Rmap A;
        Rmap B;
        ex det;
        // initialize A with last column:
        for (unsigned r=0; r<n; ++r) {
                Pkey.erase(Pkey.begin(),Pkey.end());
                Pkey.push_back(r);
                A.insert(Rmap_value(Pkey,m[n*(r+1)-1]));
        }
        // proceed from right to left through matrix
        for (int c=n-2; c>=0; --c) {
                Pkey.erase(Pkey.begin(),Pkey.end());  // don't change capacity
                Mkey.erase(Mkey.begin(),Mkey.end());
                for (unsigned i=0; i<n-c; ++i)
                        Pkey.push_back(i);
                unsigned fc = 0;  // controls logic for our strange flipper counter
                do {
                        det = _ex0;
                        for (unsigned r=0; r<n-c; ++r) {
                                // maybe there is nothing to do?
                                if (m[Pkey[r]*n+c].is_zero())
                                        continue;
                                // create the sorted key for all possible minors
                                Mkey.erase(Mkey.begin(),Mkey.end());
                                for (unsigned i=0; i<n-c; ++i)
                                        if (i!=r)
                                                Mkey.push_back(Pkey[i]);
                                // Fetch the minors and compute the new determinant
                                if (r%2)
                                        det -= m[Pkey[r]*n+c]*A[Mkey];
                                else
                                        det += m[Pkey[r]*n+c]*A[Mkey];
                        }
                        // prevent build-up of deep nesting of expressions saves time:
                        det = det.expand();
                        // store the new determinant at its place in B:
                        if (!det.is_zero())
                                B.insert(Rmap_value(Pkey,det));
                        // increment our strange flipper counter
                        for (fc=n-c; fc>0; --fc) {
                                ++Pkey[fc-1];
                                if (Pkey[fc-1]<fc+c)
                                        break;
                        }
                        if (fc<n-c && fc>0)
                                for (unsigned j=fc; j<n-c; ++j)
                                        Pkey[j] = Pkey[j-1]+1;
                } while(fc);
                // next column, clear B and change the role of A and B:
                A = std::move(B);
        }
        
        return det;
}


/** Perform the steps of an ordinary Gaussian elimination to bring the m x n
 *  matrix into an upper echelon form.  The algorithm is ok for matrices
 *  with numeric coefficients but quite unsuited for symbolic matrices.
 *
 *  @param det may be set to true to save a lot of space if one is only
 *  interested in the diagonal elements (i.e. for calculating determinants).
 *  The others are set to zero in this case.
 *  @return sign is 1 if an even number of rows was swapped, -1 if an odd
 *  number of rows was swapped and 0 if the matrix is singular. */
int matrix::gauss_elimination(const bool det)
{
        ensure_if_modifiable();
        const unsigned m = this->rows();
        const unsigned n = this->cols();
        GINAC_ASSERT(!det || n==m);
        int sign = 1;
        
        unsigned r0 = 0;
        for (unsigned c0=0; c0<n && r0<m-1; ++c0) {
                int indx = pivot(r0, c0, true);
                if (indx == -1) {
                        sign = 0;
                        if (det)
                                return 0;  // leaves *this in a messy state
                }
                if (indx>=0) {
                        if (indx > 0)
                                sign = -sign;
                        for (unsigned r2=r0+1; r2<m; ++r2) {
                                if (!this->m[r2*n+c0].is_zero()) {
                                        // yes, there is something to do in this row
                                        ex piv = this->m[r2*n+c0] / this->m[r0*n+c0];
                                        for (unsigned c=c0+1; c<n; ++c) {
                                                this->m[r2*n+c] -= piv * this->m[r0*n+c];
                                                if (!this->m[r2*n+c].info(info_flags::numeric))
                                                        this->m[r2*n+c] = this->m[r2*n+c].normal();
                                        }
                                }
                                // fill up left hand side with zeros
                                for (unsigned c=r0; c<=c0; ++c)
                                        this->m[r2*n+c] = _ex0;
                        }
                        if (det) {
                                // save space by deleting no longer needed elements
                                for (unsigned c=r0+1; c<n; ++c)
                                        this->m[r0*n+c] = _ex0;
                        }
                        ++r0;
                }
        }
        // clear remaining rows
        for (unsigned r=r0+1; r<m; ++r) {
                for (unsigned c=0; c<n; ++c)
                        this->m[r*n+c] = _ex0;
        }

        return sign;
}


/** Perform the steps of division free elimination to bring the m x n matrix
 *  into an upper echelon form.
 *
 *  @param det may be set to true to save a lot of space if one is only
 *  interested in the diagonal elements (i.e. for calculating determinants).
 *  The others are set to zero in this case.
 *  @return sign is 1 if an even number of rows was swapped, -1 if an odd
 *  number of rows was swapped and 0 if the matrix is singular. */
int matrix::division_free_elimination(const bool det)
{
        ensure_if_modifiable();
        const unsigned m = this->rows();
        const unsigned n = this->cols();
        GINAC_ASSERT(!det || n==m);
        int sign = 1;
        
        unsigned r0 = 0;
        for (unsigned c0=0; c0<n && r0<m-1; ++c0) {
                int indx = pivot(r0, c0, true);
                if (indx==-1) {
                        sign = 0;
                        if (det)
                                return 0;  // leaves *this in a messy state
                }
                if (indx>=0) {
                        if (indx>0)
                                sign = -sign;
                        for (unsigned r2=r0+1; r2<m; ++r2) {
                                for (unsigned c=c0+1; c<n; ++c)
                                        this->m[r2*n+c] = (this->m[r0*n+c0]*this->m[r2*n+c] - this->m[r2*n+c0]*this->m[r0*n+c]).expand();
                                // fill up left hand side with zeros
                                for (unsigned c=r0; c<=c0; ++c)
                                        this->m[r2*n+c] = _ex0;
                        }
                        if (det) {
                                // save space by deleting no longer needed elements
                                for (unsigned c=r0+1; c<n; ++c)
                                        this->m[r0*n+c] = _ex0;
                        }
                        ++r0;
                }
        }
        // clear remaining rows
        for (unsigned r=r0+1; r<m; ++r) {
                for (unsigned c=0; c<n; ++c)
                        this->m[r*n+c] = _ex0;
        }

        return sign;
}


/** Perform the steps of Bareiss' one-step fraction free elimination to bring
 *  the matrix into an upper echelon form.  Fraction free elimination means
 *  that divide is used straightforwardly, without computing GCDs first.  This
 *  is possible, since we know the divisor at each step.
 *  
 *  @param det may be set to true to save a lot of space if one is only
 *  interested in the last element (i.e. for calculating determinants). The
 *  others are set to zero in this case.
 *  @return sign is 1 if an even number of rows was swapped, -1 if an odd
 *  number of rows was swapped and 0 if the matrix is singular. */
int matrix::fraction_free_elimination(const bool det)
{
        // Method:
        // (single-step fraction free elimination scheme, already known to Jordan)
        //
        // Usual division-free elimination sets m[0](r,c) = m(r,c) and then sets
        //     m[k+1](r,c) = m[k](k,k) * m[k](r,c) - m[k](r,k) * m[k](k,c).
        //
        // Bareiss (fraction-free) elimination in addition divides that element
        // by m[k-1](k-1,k-1) for k>1, where it can be shown by means of the
        // Sylvester identity that this really divides m[k+1](r,c).
        //
        // We also allow rational functions where the original prove still holds.
        // However, we must care for numerator and denominator separately and
        // "manually" work in the integral domains because of subtle cancellations
        // (see below).  This blows up the bookkeeping a bit and the formula has
        // to be modified to expand like this (N{x} stands for numerator of x,
        // D{x} for denominator of x):
        //     N{m[k+1](r,c)} = N{m[k](k,k)}*N{m[k](r,c)}*D{m[k](r,k)}*D{m[k](k,c)}
        //                     -N{m[k](r,k)}*N{m[k](k,c)}*D{m[k](k,k)}*D{m[k](r,c)}
        //     D{m[k+1](r,c)} = D{m[k](k,k)}*D{m[k](r,c)}*D{m[k](r,k)}*D{m[k](k,c)}
        // where for k>1 we now divide N{m[k+1](r,c)} by
        //     N{m[k-1](k-1,k-1)}
        // and D{m[k+1](r,c)} by
        //     D{m[k-1](k-1,k-1)}.
        
        ensure_if_modifiable();
        const unsigned m = this->rows();
        const unsigned n = this->cols();
        GINAC_ASSERT(!det || n==m);
        int sign = 1;
        if (m==1)
                return 1;
        ex divisor_n = 1;
        ex divisor_d = 1;
        ex dividend_n;
        ex dividend_d;
        
        // We populate temporary matrices to subsequently operate on.  There is
        // one holding numerators and another holding denominators of entries.
        // This is a must since the evaluator (or even earlier mul's constructor)
        // might cancel some trivial element which causes divide() to fail.  The
        // elements are normalized first (yes, even though this algorithm doesn't
        // need GCDs) since the elements of *this might be unnormalized, which
        // makes things more complicated than they need to be.
        matrix tmp_n(*this);
        matrix tmp_d(m,n);  // for denominators, if needed
        exmap srl;  // symbol replacement list
        auto tmp_n_it = tmp_n.m.begin(), tmp_d_it = tmp_d.m.begin();
        for (auto & it : this->m) {
                ex nd = it.normal().to_rational(srl).numer_denom();
                *tmp_n_it++ = nd.op(0);
                *tmp_d_it++ = nd.op(1);
        }
        
        unsigned r0 = 0;
        for (unsigned c0=0; c0<n && r0<m-1; ++c0) {
                // When trying to find a pivot, we should try a bit harder than expand().
                // Searching the first non-zero element in-place here instead of calling
                // pivot() allows us to do no more substitutions and back-substitutions
                // than are actually necessary.
                unsigned indx = r0;
                while ((indx<m) &&
                       (tmp_n[indx*n+c0].subs(srl, subs_options::no_pattern).expand().is_zero()))
                        ++indx;
                if (indx==m) {
                        // all elements in column c0 below row r0 vanish
                        sign = 0;
                        if (det)
                                return 0;
                } else {
                        if (indx>r0) {
                                // Matrix needs pivoting, swap rows r0 and indx of tmp_n and tmp_d.
                                sign = -sign;
                                for (unsigned c=c0; c<n; ++c) {
                                        tmp_n.m[n*indx+c].swap(tmp_n.m[n*r0+c]);
                                        tmp_d.m[n*indx+c].swap(tmp_d.m[n*r0+c]);
                                }
                        }
                        for (unsigned r2=r0+1; r2<m; ++r2) {
                                for (unsigned c=c0+1; c<n; ++c) {
                                        dividend_n = (tmp_n.m[r0*n+c0]*tmp_n.m[r2*n+c]*
                                                      tmp_d.m[r2*n+c0]*tmp_d.m[r0*n+c]
                                                     -tmp_n.m[r2*n+c0]*tmp_n.m[r0*n+c]*
                                                      tmp_d.m[r0*n+c0]*tmp_d.m[r2*n+c]).expand();
                                        dividend_d = (tmp_d.m[r2*n+c0]*tmp_d.m[r0*n+c]*
                                                      tmp_d.m[r0*n+c0]*tmp_d.m[r2*n+c]).expand();
                                        bool check = divide(dividend_n, divisor_n,
                                                            tmp_n.m[r2*n+c], true);
                                        check &= divide(dividend_d, divisor_d,
                                                        tmp_d.m[r2*n+c], true);
                                        GINAC_ASSERT(check);
                                }
                                // fill up left hand side with zeros
                                for (unsigned c=r0; c<=c0; ++c)
                                        tmp_n.m[r2*n+c] = _ex0;
                        }
                        if (c0<n && r0<m-1) {
                                // compute next iteration's divisor
                                divisor_n = tmp_n.m[r0*n+c0].expand();
                                divisor_d = tmp_d.m[r0*n+c0].expand();
                                if (det) {
                                        // save space by deleting no longer needed elements
                                        for (unsigned c=0; c<n; ++c) {
                                                tmp_n.m[r0*n+c] = _ex0;
                                                tmp_d.m[r0*n+c] = _ex1;
                                        }
                                }
                        }
                        ++r0;
                }
        }
        // clear remaining rows
        for (unsigned r=r0+1; r<m; ++r) {
                for (unsigned c=0; c<n; ++c)
                        tmp_n.m[r*n+c] = _ex0;
        }

        // repopulate *this matrix:
        tmp_n_it = tmp_n.m.begin();
        tmp_d_it = tmp_d.m.begin();
        for (auto & it : this->m)
                it = ((*tmp_n_it++)/(*tmp_d_it++)).subs(srl, subs_options::no_pattern);
        
        return sign;
}


/** Partial pivoting method for matrix elimination schemes.
 *  Usual pivoting (symbolic==false) returns the index to the element with the
 *  largest absolute value in column ro and swaps the current row with the one
 *  where the element was found.  With (symbolic==true) it does the same thing
 *  with the first non-zero element.
 *
 *  @param ro is the row from where to begin
 *  @param co is the column to be inspected
 *  @param symbolic signal if we want the first non-zero element to be pivoted
 *  (true) or the one with the largest absolute value (false).
 *  @return 0 if no interchange occurred, -1 if all are zero (usually signaling
 *  a degeneracy) and positive integer k means that rows ro and k were swapped.
 */
int matrix::pivot(unsigned ro, unsigned co, bool symbolic)
{
        unsigned k = ro;
        if (symbolic) {
                // search first non-zero element in column co beginning at row ro
                while ((k<row) && (this->m[k*col+co].expand().is_zero()))
                        ++k;
        } else {
                // search largest element in column co beginning at row ro
                GINAC_ASSERT(is_exactly_a<numeric>(this->m[k*col+co]));
                unsigned kmax = k+1;
                numeric mmax = abs(ex_to<numeric>(m[kmax*col+co]));
                while (kmax<row) {
                        GINAC_ASSERT(is_exactly_a<numeric>(this->m[kmax*col+co]));
                        numeric tmp = ex_to<numeric>(this->m[kmax*col+co]);
                        if (abs(tmp) > mmax) {
                                mmax = tmp;
                                k = kmax;
                        }
                        ++kmax;
                }
                if (!mmax.is_zero())
                        k = kmax;
        }
        if (k==row)
                // all elements in column co below row ro vanish
                return -1;
        if (k==ro)
                // matrix needs no pivoting
                return 0;
        // matrix needs pivoting, so swap rows k and ro
        ensure_if_modifiable();
        for (unsigned c=0; c<col; ++c)
                this->m[k*col+c].swap(this->m[ro*col+c]);
        
        return k;
}

/** Function to check that all elements of the matrix are zero.
 */
bool matrix::is_zero_matrix() const
{
        for (auto & i : m)
                if (!i.is_zero())
                        return false;
        return true;
}

ex lst_to_matrix(const lst & l)
{
        // Find number of rows and columns
        size_t rows = l.nops(), cols = 0;
        for (auto & itr : l) {
                if (!is_a<lst>(itr))
                        throw (std::invalid_argument("lst_to_matrix: argument must be a list of lists"));
                if (itr.nops() > cols)
                        cols = itr.nops();
        }

        // Allocate and fill matrix
        matrix & M = dynallocate<matrix>(rows, cols);

        unsigned i = 0;
        for (auto & itr : l) {
                unsigned j = 0;
                for (auto & itc : ex_to<lst>(itr)) {
                        M(i, j) = itc;
                        ++j;
                }
                ++i;
        }

        return M;
}

ex diag_matrix(const lst & l)
{
        size_t dim = l.nops();

        // Allocate and fill matrix
        matrix & M = dynallocate<matrix>(dim, dim);

        unsigned i = 0;
        for (auto & it : l) {
                M(i, i) = it;
                ++i;
        }

        return M;
}

ex diag_matrix(std::initializer_list<ex> l)
{
        size_t dim = l.size();

        // Allocate and fill matrix
        matrix & M = dynallocate<matrix>(dim, dim);

        unsigned i = 0;
        for (auto & it : l) {
                M(i, i) = it;
                ++i;
        }

        return M;
}

ex unit_matrix(unsigned r, unsigned c)
{
        matrix & Id = dynallocate<matrix>(r, c);
        Id.setflag(status_flags::evaluated);
        for (unsigned i=0; i<r && i<c; i++)
                Id(i,i) = _ex1;

        return Id;
}

ex symbolic_matrix(unsigned r, unsigned c, const std::string & base_name, const std::string & tex_base_name)
{
        matrix & M = dynallocate<matrix>(r, c);
        M.setflag(status_flags::evaluated);

        bool long_format = (r > 10 || c > 10);
        bool single_row = (r == 1 || c == 1);

        for (unsigned i=0; i<r; i++) {
                for (unsigned j=0; j<c; j++) {
                        std::ostringstream s1, s2;
                        s1 << base_name;
                        s2 << tex_base_name << "_{";
                        if (single_row) {
                                if (c == 1) {
                                        s1 << i;
                                        s2 << i << '}';
                                } else {
                                        s1 << j;
                                        s2 << j << '}';
                                }
                        } else {
                                if (long_format) {
                                        s1 << '_' << i << '_' << j;
                                        s2 << i << ';' << j << "}";
                                } else {
                                        s1 << i << j;
                                        s2 << i << j << '}';
                                }
                        }
                        M(i, j) = symbol(s1.str(), s2.str());
                }
        }

        return M;
}

ex reduced_matrix(const matrix& m, unsigned r, unsigned c)
{
        if (r+1>m.rows() || c+1>m.cols() || m.cols()<2 || m.rows()<2)
                throw std::runtime_error("minor_matrix(): index out of bounds");

        const unsigned rows = m.rows()-1;
        const unsigned cols = m.cols()-1;
        matrix & M = dynallocate<matrix>(rows, cols);
        M.setflag(status_flags::evaluated);

        unsigned ro = 0;
        unsigned ro2 = 0;
        while (ro2<rows) {
                if (ro==r)
                        ++ro;
                unsigned co = 0;
                unsigned co2 = 0;
                while (co2<cols) {
                        if (co==c)
                                ++co;
                        M(ro2,co2) = m(ro, co);
                        ++co;
                        ++co2;
                }
                ++ro;
                ++ro2;
        }

        return M;
}

ex sub_matrix(const matrix&m, unsigned r, unsigned nr, unsigned c, unsigned nc)
{
        if (r+nr>m.rows() || c+nc>m.cols())
                throw std::runtime_error("sub_matrix(): index out of bounds");

        matrix & M = dynallocate<matrix>(nr, nc);
        M.setflag(status_flags::evaluated);

        for (unsigned ro=0; ro<nr; ++ro) {
                for (unsigned co=0; co<nc; ++co) {
                        M(ro,co) = m(ro+r,co+c);
                }
        }

        return M;
}

} // namespace GiNaC