include <algorithm> for use of std::min().

[ginac.git] / check / exam_clifford.cpp

/** @file exam_clifford.cpp
 *
 *  Here we test GiNaC's Clifford algebra objects. */

/*
 *  GiNaC Copyright (C) 1999-2015 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 "ginac.h"
using namespace GiNaC;

#include <iostream>
using namespace std;

const numeric half(1, 2);

static unsigned check_equal(const ex &e1, const ex &e2)
{
        ex e = normal(e1 - e2);
        if (!e.is_zero()) {
                clog << "(" << e1 << ") - (" << e2 << ") erroneously returned "
                     << e << " instead of 0" << endl;
                return 1;
        }
        return 0;
}

static unsigned check_equal_simplify(const ex &e1, const ex &e2)
{
        ex e = normal(simplify_indexed(e1) - e2);
        if (!e.is_zero()) {
                clog << "simplify_indexed(" << e1 << ") - (" << e2 << ") erroneously returned "
                         << e << " instead of 0" << endl;
                return 1;
        }
        return 0;
}

static unsigned check_equal_lst(const ex & e1, const ex & e2)
{
        for (unsigned int i = 0; i < e1.nops(); i++) {
                ex e = e1.op(i) - e2.op(i);
                if (!e.normal().is_zero()) {
                        clog << "(" << e1 << ") - (" << e2 << ") erroneously returned "
                             << e << " instead of 0 (in the entry " << i  << ")" << endl;
                        return 1;
                }
        }
        return 0;
}

static unsigned check_equal_simplify_term(const ex & e1, const ex & e2, idx & mu)
{
        ex e = expand_dummy_sum(normal(simplify_indexed(e1) - e2), true);

        for (int j=0; j<4; j++) {
                ex esub = e.subs(
                                is_a<varidx>(mu)
                                        ? lst {
                                                        mu == idx(j, mu.get_dim()),
                                                        ex_to<varidx>(mu).toggle_variance() == idx(j, mu.get_dim())
                                                }
                                        : lst{mu == idx(j, mu.get_dim())}
                        );
                if (!(canonicalize_clifford(esub).is_zero())) {
                        clog << "simplify_indexed(" << e1 << ") - (" << e2 << ") erroneously returned "
                                 << canonicalize_clifford(esub) << " instead of 0 for mu=" << j << endl;
                        return 1;
                }
        }
        return 0;
}

static unsigned check_equal_simplify_term2(const ex & e1, const ex & e2)
{
        ex e = expand_dummy_sum(normal(simplify_indexed(e1) - e2), true);
        if (!(canonicalize_clifford(e).is_zero())) {
                clog << "simplify_indexed(" << e1 << ") - (" << e2 << ") erroneously returned "
                         << canonicalize_clifford(e) << " instead of 0" << endl;
                return 1;
        }
        return 0;
}


static unsigned clifford_check1()
{
        // checks general identities and contractions

        unsigned result = 0;

        symbol dim("D");
        varidx mu(symbol("mu"), dim), nu(symbol("nu"), dim), rho(symbol("rho"), dim);
        ex e;

        e = dirac_ONE() * dirac_ONE();
        result += check_equal(e, dirac_ONE());

        e = dirac_ONE() * dirac_gamma(mu) * dirac_ONE();
        result += check_equal(e, dirac_gamma(mu));

        e = dirac_gamma(varidx(2, dim)) * dirac_gamma(varidx(1, dim)) *
            dirac_gamma(varidx(1, dim)) * dirac_gamma(varidx(2, dim));
        result += check_equal(e, dirac_ONE());

        e = dirac_gamma(mu) * dirac_gamma(nu) *
            dirac_gamma(nu.toggle_variance()) * dirac_gamma(mu.toggle_variance());
        result += check_equal_simplify(e, pow(dim, 2) * dirac_ONE());

        e = dirac_gamma(mu) * dirac_gamma(nu) *
            dirac_gamma(mu.toggle_variance()) * dirac_gamma(nu.toggle_variance());
        result += check_equal_simplify(e, 2*dim*dirac_ONE()-pow(dim, 2)*dirac_ONE());

        e = dirac_gamma(nu.toggle_variance()) * dirac_gamma(rho.toggle_variance()) *
            dirac_gamma(mu) * dirac_gamma(rho) * dirac_gamma(nu);
        e = e.simplify_indexed().collect(dirac_gamma(mu));
        result += check_equal(e, pow(2 - dim, 2).expand() * dirac_gamma(mu));

        return result;
}

static unsigned clifford_check2()
{
        // checks identities relating to gamma5

        unsigned result = 0;

        symbol dim("D");
        varidx mu(symbol("mu"), dim), nu(symbol("nu"), dim);
        ex e;

        e = dirac_gamma(mu) * dirac_gamma5() + dirac_gamma5() * dirac_gamma(mu);
        result += check_equal(e, 0);

        e = dirac_gamma5() * dirac_gamma(mu) * dirac_gamma5() + dirac_gamma(mu);
        result += check_equal(e, 0);

        return result;
}

static unsigned clifford_check3()
{
        // checks traces

        unsigned result = 0;

        symbol dim("D"), m("m"), q("q"), l("l"), ldotq("ldotq");
        varidx mu(symbol("mu"), dim), nu(symbol("nu"), dim), rho(symbol("rho"), dim),
               sig(symbol("sig"), dim), kap(symbol("kap"), dim), lam(symbol("lam"), dim);
        ex e;

        e = dirac_gamma(mu);
        result += check_equal(dirac_trace(e), 0);

        e = dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(rho);
        result += check_equal(dirac_trace(e), 0);

        e = dirac_gamma5() * dirac_gamma(mu);
        result += check_equal(dirac_trace(e), 0);

        e = dirac_gamma5() * dirac_gamma(mu) * dirac_gamma(nu);
        result += check_equal(dirac_trace(e), 0);

        e = dirac_gamma5() * dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(rho);
        result += check_equal(dirac_trace(e), 0);

        scalar_products sp;
        sp.add(q, q, pow(q, 2));
        sp.add(l, l, pow(l, 2));
        sp.add(l, q, ldotq);

        e = pow(m, 2) * dirac_slash(q, dim) * dirac_slash(q, dim);
        e = dirac_trace(e).simplify_indexed(sp);
        result += check_equal(e, 4*pow(m, 2)*pow(q, 2));

        // cyclicity without gamma5
        e = dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(rho) * dirac_gamma(sig)
          - dirac_gamma(nu) * dirac_gamma(rho) * dirac_gamma(sig) * dirac_gamma(mu);
        e = dirac_trace(e);
        result += check_equal(e, 0);

        e = dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(rho) * dirac_gamma(sig) * dirac_gamma(kap) * dirac_gamma(lam)
          - dirac_gamma(nu) * dirac_gamma(rho) * dirac_gamma(sig) * dirac_gamma(kap) * dirac_gamma(lam) * dirac_gamma(mu);
        e = dirac_trace(e).expand();
        result += check_equal(e, 0);

        // cyclicity of gamma5 * S_4
        e = dirac_gamma5() * dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(rho) * dirac_gamma(sig)
          - dirac_gamma(sig) * dirac_gamma5() * dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(rho);
        e = dirac_trace(e);
        result += check_equal(e, 0);

        // non-cyclicity of order D-4 of gamma5 * S_6
        e = dirac_gamma5() * dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(rho) * dirac_gamma(sig) * dirac_gamma(kap) * dirac_gamma(mu.toggle_variance())
          + dim * dirac_gamma5() * dirac_gamma(nu) * dirac_gamma(rho) * dirac_gamma(sig) * dirac_gamma(kap);
        e = dirac_trace(e).simplify_indexed();
        e = (e / (dim - 4)).normal();
        result += check_equal(e, 8 * I * lorentz_eps(nu.replace_dim(4), rho.replace_dim(4), sig.replace_dim(4), kap.replace_dim(4)));

        // one-loop vacuum polarization in QED
        e = dirac_gamma(mu) *
            (dirac_slash(l, dim) + dirac_slash(q, 4) + m * dirac_ONE()) *
            dirac_gamma(mu.toggle_variance()) *
            (dirac_slash(l, dim) + m * dirac_ONE());
        e = dirac_trace(e).simplify_indexed(sp);
        result += check_equal(e, 4*((2-dim)*l*l + (2-dim)*ldotq + dim*m*m).expand());

        e = dirac_slash(q, 4) *
            (dirac_slash(l, dim) + dirac_slash(q, 4) + m * dirac_ONE()) *
            dirac_slash(q, 4) *
            (dirac_slash(l, dim) + m * dirac_ONE());
        e = dirac_trace(e).simplify_indexed(sp);
        result += check_equal(e, 4*(2*ldotq*ldotq + q*q*ldotq - q*q*l*l + q*q*m*m).expand());

        // stuff that had problems in the past
        ex prop = dirac_slash(q, dim) - m * dirac_ONE();
        e = dirac_slash(l, dim) * dirac_gamma5() * dirac_slash(l, dim) * prop;
        e = dirac_trace(dirac_slash(q, dim) * e) - dirac_trace(m * e)
          - dirac_trace(prop * e);
        result += check_equal(e, 0);

        e = (dirac_gamma5() + dirac_ONE()) * dirac_gamma5();
        e = dirac_trace(e);
        result += check_equal(e, 4);

        // traces with multiple representation labels
        e = dirac_ONE(0) * dirac_ONE(1) / 16;
        result += check_equal(dirac_trace(e, 0), dirac_ONE(1) / 4);
        result += check_equal(dirac_trace(e, 1), dirac_ONE(0) / 4);
        result += check_equal(dirac_trace(e, 2), e);
        result += check_equal(dirac_trace(e, lst{0, 1}), 1);

        e = dirac_gamma(mu, 0) * dirac_gamma(mu.toggle_variance(), 1) * dirac_gamma(nu, 0) * dirac_gamma(nu.toggle_variance(), 1);
        result += check_equal_simplify(dirac_trace(e, 0), 4 * dim * dirac_ONE(1));
        result += check_equal_simplify(dirac_trace(e, 1), 4 * dim * dirac_ONE(0));
        // Fails with new tinfo mechanism because the order of gamma matrices with different rl depends on luck.
        // TODO: better check.
        //result += check_equal_simplify(dirac_trace(e, 2), canonicalize_clifford(e)); // e will be canonicalized by the calculation of the trace
        result += check_equal_simplify(dirac_trace(e, lst{0, 1}), 16 * dim);

        return result;
}

static unsigned clifford_check4()
{
        // simplify_indexed()/dirac_trace() cross-checks

        unsigned result = 0;

        symbol dim("D");
        varidx mu(symbol("mu"), dim), nu(symbol("nu"), dim), rho(symbol("rho"), dim),
               sig(symbol("sig"), dim), lam(symbol("lam"), dim);
        ex e, t1, t2;

        e = dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(rho) * dirac_gamma(mu.toggle_variance());
        t1 = dirac_trace(e).simplify_indexed();
        t2 = dirac_trace(e.simplify_indexed());
        result += check_equal((t1 - t2).expand(), 0);

        e = dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(rho) * dirac_gamma(sig) * dirac_gamma(mu.toggle_variance()) * dirac_gamma(lam);
        t1 = dirac_trace(e).simplify_indexed();
        t2 = dirac_trace(e.simplify_indexed());
        result += check_equal((t1 - t2).expand(), 0);

        e = dirac_gamma(sig) * dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(rho) * dirac_gamma(nu.toggle_variance()) * dirac_gamma(mu.toggle_variance());
        t1 = dirac_trace(e).simplify_indexed();
        t2 = dirac_trace(e.simplify_indexed());
        result += check_equal((t1 - t2).expand(), 0);

        e = dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(rho) * dirac_gamma(mu.toggle_variance()) * dirac_gamma(sig) * dirac_gamma(nu.toggle_variance());
        t1 = dirac_trace(e).simplify_indexed();
        t2 = dirac_trace(e.simplify_indexed());
        result += check_equal((t1 - t2).expand(), 0);

        return result;
}

static unsigned clifford_check5()
{
        // canonicalize_clifford() checks

        unsigned result = 0;

        symbol dim("D");
        varidx mu(symbol("mu"), dim), nu(symbol("nu"), dim), lam(symbol("lam"), dim);
        ex e;

        e = dirac_gamma(mu) * dirac_gamma(nu) + dirac_gamma(nu) * dirac_gamma(mu);
        result += check_equal(canonicalize_clifford(e), 2*dirac_ONE()*lorentz_g(mu, nu));

        e = (dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(lam)
           + dirac_gamma(nu) * dirac_gamma(lam) * dirac_gamma(mu)
           + dirac_gamma(lam) * dirac_gamma(mu) * dirac_gamma(nu)
           - dirac_gamma(nu) * dirac_gamma(mu) * dirac_gamma(lam)
           - dirac_gamma(lam) * dirac_gamma(nu) * dirac_gamma(mu)
           - dirac_gamma(mu) * dirac_gamma(lam) * dirac_gamma(nu)) / 6
          + lorentz_g(mu, nu) * dirac_gamma(lam)
          - lorentz_g(mu, lam) * dirac_gamma(nu)
          + lorentz_g(nu, lam) * dirac_gamma(mu)
          - dirac_gamma(mu) * dirac_gamma(nu) * dirac_gamma(lam);
        result += check_equal(canonicalize_clifford(e), 0);

        return result;
}

/* We make two identical checks with metrics defined through a matrix in
 * the cases when used indexes have or have not variance.
 * To this end we recycle the code through the following macros */

template <typename IDX> unsigned clifford_check6(const matrix &A)
{
        unsigned result = 0;

        matrix A_symm(4,4), A2(4, 4);
        A_symm = A.add(A.transpose()).mul(half);
        A2 = A_symm.mul(A_symm);

        IDX v(symbol("v"), 4), nu(symbol("nu"), 4), mu(symbol("mu"), 4),
               psi(symbol("psi"),4), lam(symbol("lambda"), 4),
               xi(symbol("xi"), 4),  rho(symbol("rho"),4);
        ex mu_TOGGLE = is_a<varidx>(mu) ? ex_to<varidx>(mu).toggle_variance() : mu;
        ex nu_TOGGLE = is_a<varidx>(nu) ? ex_to<varidx>(nu).toggle_variance() : nu;
        ex rho_TOGGLE
                = is_a<varidx>(rho) ? ex_to<varidx>(rho).toggle_variance() : rho;

        ex e, e1;

/* checks general identities and contractions for clifford_unit*/
        e = dirac_ONE(2) * clifford_unit(mu, A, 2) * dirac_ONE(2);
        result += check_equal(e, clifford_unit(mu, A, 2));

        e = clifford_unit(IDX(2, 4), A) * clifford_unit(IDX(1, 4), A)
          * clifford_unit(IDX(1, 4), A) * clifford_unit(IDX(2, 4), A);
        result += check_equal(e, A(1, 1) * A(2, 2) * dirac_ONE());

        e = clifford_unit(IDX(2, 4), A) * clifford_unit(IDX(1, 4), A)
          * clifford_unit(IDX(1, 4), A) * clifford_unit(IDX(2, 4), A);
        result += check_equal(e, A(1, 1) * A(2, 2) * dirac_ONE());

        e = clifford_unit(nu, A) * clifford_unit(nu_TOGGLE, A);
        result += check_equal_simplify(e, A.trace() * dirac_ONE());

        e = clifford_unit(nu, A) * clifford_unit(nu, A);
        result += check_equal_simplify(e, indexed(A_symm, sy_symm(), nu, nu) * dirac_ONE());

        e = clifford_unit(nu, A) * clifford_unit(nu_TOGGLE, A) * clifford_unit(mu, A);
        result += check_equal_simplify(e, A.trace() * clifford_unit(mu, A));

        e = clifford_unit(nu, A) * clifford_unit(mu, A) * clifford_unit(nu_TOGGLE, A);
        
        result += check_equal_simplify_term(e,  2 * indexed(A_symm, sy_symm(), nu_TOGGLE, mu) *clifford_unit(nu, A)-A.trace()*clifford_unit(mu, A), mu);

        e = clifford_unit(nu, A) * clifford_unit(nu_TOGGLE, A)
          * clifford_unit(mu, A) * clifford_unit(mu_TOGGLE, A);
        result += check_equal_simplify(e, pow(A.trace(), 2) * dirac_ONE());

        e = clifford_unit(mu, A) * clifford_unit(nu, A)
          * clifford_unit(nu_TOGGLE, A) * clifford_unit(mu_TOGGLE, A);
        result += check_equal_simplify(e, pow(A.trace(), 2)  * dirac_ONE());

        e = clifford_unit(mu, A) * clifford_unit(nu, A)
          * clifford_unit(mu_TOGGLE, A) * clifford_unit(nu_TOGGLE, A);

        result += check_equal_simplify_term2(e, 2*indexed(A_symm, sy_symm(), nu_TOGGLE, mu_TOGGLE) * clifford_unit(mu, A) * clifford_unit(nu, A) - pow(A.trace(), 2)*dirac_ONE());

        e = clifford_unit(mu_TOGGLE, A) * clifford_unit(nu, A)
          * clifford_unit(mu, A) * clifford_unit(nu_TOGGLE, A);

        result += check_equal_simplify_term2(e, 2*indexed(A_symm, nu, mu) * clifford_unit(mu_TOGGLE, A) * clifford_unit(nu_TOGGLE, A) - pow(A.trace(), 2)*dirac_ONE());

        e = clifford_unit(nu_TOGGLE, A) * clifford_unit(rho_TOGGLE, A)
          * clifford_unit(mu, A) * clifford_unit(rho, A) * clifford_unit(nu, A);
        e = e.simplify_indexed().collect(clifford_unit(mu, A));
        
        result += check_equal_simplify_term(e, 4* indexed(A_symm, sy_symm(), nu_TOGGLE,  rho)*indexed(A_symm, sy_symm(), rho_TOGGLE, mu) *clifford_unit(nu, A) 
                                            - 2*A.trace() * (clifford_unit(rho, A) * indexed(A_symm, sy_symm(), rho_TOGGLE, mu) 
                                                             + clifford_unit(nu, A) * indexed(A_symm, sy_symm(), nu_TOGGLE, mu)) + pow(A.trace(),2)* clifford_unit(mu, A), mu);

        e = clifford_unit(nu_TOGGLE, A) * clifford_unit(rho, A)
          * clifford_unit(mu, A) * clifford_unit(rho_TOGGLE, A) * clifford_unit(nu, A);
        e = e.simplify_indexed().collect(clifford_unit(mu, A));
        
        result += check_equal_simplify_term(e, 4* indexed(A_symm, sy_symm(), nu_TOGGLE,  rho)*indexed(A_symm, sy_symm(), rho_TOGGLE, mu) *clifford_unit(nu, A) 
                                            - 2*A.trace() * (clifford_unit(rho, A) * indexed(A_symm, sy_symm(), rho_TOGGLE, mu) 
                                                             + clifford_unit(nu, A) * indexed(A_symm, sy_symm(), nu_TOGGLE, mu)) + pow(A.trace(),2)* clifford_unit(mu, A), mu);

        e = clifford_unit(mu, A) * clifford_unit(nu, A) + clifford_unit(nu, A) * clifford_unit(mu, A);
        result += check_equal(canonicalize_clifford(e), 2*dirac_ONE()*indexed(A_symm, sy_symm(), mu, nu));

        e = (clifford_unit(mu, A) * clifford_unit(nu, A) * clifford_unit(lam, A)
                 + clifford_unit(nu, A) * clifford_unit(lam, A) * clifford_unit(mu, A)
                 + clifford_unit(lam, A) * clifford_unit(mu, A) * clifford_unit(nu, A)
                 - clifford_unit(nu, A) * clifford_unit(mu, A) * clifford_unit(lam, A)
                 - clifford_unit(lam, A) * clifford_unit(nu, A) * clifford_unit(mu, A)
                 - clifford_unit(mu, A) * clifford_unit(lam, A) * clifford_unit(nu, A)) / 6
                + indexed(A_symm, sy_symm(), mu, nu) * clifford_unit(lam, A)
                - indexed(A_symm, sy_symm(), mu, lam) * clifford_unit(nu, A)
                + indexed(A_symm, sy_symm(), nu, lam) * clifford_unit(mu, A)
                - clifford_unit(mu, A) * clifford_unit(nu, A) * clifford_unit(lam, A);
        result += check_equal(canonicalize_clifford(e), 0);

/* lst_to_clifford() and clifford_inverse()  check*/
        realsymbol s("s"), t("t"), x("x"), y("y"), z("z");

        ex c = clifford_unit(nu, A, 1);
        e = lst_to_clifford(lst{t, x, y, z}, mu, A, 1) * lst_to_clifford(lst{1, 2, 3, 4}, c);
        e1 = clifford_inverse(e);
        result += check_equal_simplify_term2((e*e1).simplify_indexed(), dirac_ONE(1));

/* lst_to_clifford() and clifford_to_lst()  check for vectors*/
        e = lst{t, x, y, z};
        result += check_equal_lst(clifford_to_lst(lst_to_clifford(e, c), c, false), e);
        result += check_equal_lst(clifford_to_lst(lst_to_clifford(e, c), c, true), e);

/* lst_to_clifford() and clifford_to_lst()  check for pseudovectors*/
        e = lst{s, t, x, y, z};
        result += check_equal_lst(clifford_to_lst(lst_to_clifford(e, c), c, false), e);
        result += check_equal_lst(clifford_to_lst(lst_to_clifford(e, c), c, true), e);

/* Moebius map (both forms) checks for symmetric metrics only */
        c = clifford_unit(nu, A);

        e = clifford_moebius_map(0, dirac_ONE(), 
                                 dirac_ONE(), 0, lst{t, x, y, z}, A);
/* this is just the inversion*/
        matrix M1 = {{0, dirac_ONE()},
                     {dirac_ONE(), 0}};
        e1 = clifford_moebius_map(M1, lst{t, x, y, z}, A);
/* the inversion again*/
        result += check_equal_lst(e, e1);

        e1 = clifford_to_lst(clifford_inverse(lst_to_clifford(lst{t, x, y, z}, mu, A)), c);
        result += check_equal_lst(e, e1);

        e = clifford_moebius_map(dirac_ONE(), lst_to_clifford(lst{1, 2, 3, 4}, nu, A),
                                 0, dirac_ONE(), lst{t, x, y, z}, A);
/*this is just a shift*/
        matrix M2 = {{dirac_ONE(), lst_to_clifford(lst{1, 2, 3, 4}, c),},
                     {0, dirac_ONE()}};
        e1 = clifford_moebius_map(M2, lst{t, x, y, z}, c);
/* the same shift*/
        result += check_equal_lst(e, e1);

        result += check_equal(e, lst{t+1, x+2, y+3, z+4});

/* Check the group law for Moebius maps */
        e = clifford_moebius_map(M1, ex_to<lst>(e1), c);
/*composition of M1 and M2*/
        e1 = clifford_moebius_map(M1.mul(M2), lst{t, x, y, z}, c);
/* the product M1*M2*/
        result += check_equal_lst(e, e1);
        return result;
}

static unsigned clifford_check7(const ex & G, const symbol & dim)
{
        // checks general identities and contractions

        unsigned result = 0;

        varidx mu(symbol("mu"), dim), nu(symbol("nu"), dim), rho(symbol("rho"), dim),
               psi(symbol("psi"),dim), lam(symbol("lambda"), dim), xi(symbol("xi"), dim);

        ex e;
        clifford unit = ex_to<clifford>(clifford_unit(mu, G));
        ex scalar = unit.get_metric(varidx(0, dim), varidx(0, dim));
        
        e = dirac_ONE() * dirac_ONE();
        result += check_equal(e, dirac_ONE());

        e = dirac_ONE() * clifford_unit(mu, G) * dirac_ONE();
        result += check_equal(e, clifford_unit(mu, G));

        e = clifford_unit(varidx(2, dim), G) * clifford_unit(varidx(1, dim), G)
          * clifford_unit(varidx(1, dim), G) * clifford_unit(varidx(2, dim), G);
        result += check_equal(e, dirac_ONE()*pow(scalar, 2));

        e = clifford_unit(mu, G) * clifford_unit(nu, G)
          * clifford_unit(nu.toggle_variance(), G) * clifford_unit(mu.toggle_variance(), G);
        result += check_equal_simplify(e, pow(dim*scalar, 2) * dirac_ONE());

        e = clifford_unit(mu, G) * clifford_unit(nu, G)
          * clifford_unit(mu.toggle_variance(), G) * clifford_unit(nu.toggle_variance(), G);
        result += check_equal_simplify(e, (2*dim - pow(dim, 2))*pow(scalar,2)*dirac_ONE());

        e = clifford_unit(nu.toggle_variance(), G) * clifford_unit(rho.toggle_variance(), G)
          * clifford_unit(mu, G) * clifford_unit(rho, G) * clifford_unit(nu, G);
        e = e.simplify_indexed().collect(clifford_unit(mu, G));
        result += check_equal(e, pow(scalar*(dim-2), 2).expand() * clifford_unit(mu, G));

        // canonicalize_clifford() checks, only for symmetric metrics
        if (is_a<indexed>(ex_to<clifford>(clifford_unit(mu, G)).get_metric()) &&
            ex_to<symmetry>(ex_to<indexed>(ex_to<clifford>(clifford_unit(mu, G)).get_metric()).get_symmetry()).has_symmetry()) {
                e = clifford_unit(mu, G) * clifford_unit(nu, G) + clifford_unit(nu, G) * clifford_unit(mu, G);
                result += check_equal(canonicalize_clifford(e), 2*dirac_ONE()*unit.get_metric(nu, mu));
                
                e = (clifford_unit(mu, G) * clifford_unit(nu, G) * clifford_unit(lam, G)
                         + clifford_unit(nu, G) * clifford_unit(lam, G) * clifford_unit(mu, G)
                         + clifford_unit(lam, G) * clifford_unit(mu, G) * clifford_unit(nu, G)
                         - clifford_unit(nu, G) * clifford_unit(mu, G) * clifford_unit(lam, G)
                         - clifford_unit(lam, G) * clifford_unit(nu, G) * clifford_unit(mu, G)
                         - clifford_unit(mu, G) * clifford_unit(lam, G) * clifford_unit(nu, G)) / 6
                        + unit.get_metric(mu, nu) * clifford_unit(lam, G)
                        - unit.get_metric(mu, lam) * clifford_unit(nu, G)
                        + unit.get_metric(nu, lam) * clifford_unit(mu, G)
                        - clifford_unit(mu, G) * clifford_unit(nu, G) * clifford_unit(lam, G);
                result += check_equal(canonicalize_clifford(e), 0);
        } else {
                e = clifford_unit(mu, G) * clifford_unit(nu, G) + clifford_unit(nu, G) * clifford_unit(mu, G);
                result += check_equal(canonicalize_clifford(e), dirac_ONE()*(unit.get_metric(mu, nu) + unit.get_metric(nu, mu)));
                
                e = (clifford_unit(mu, G) * clifford_unit(nu, G) * clifford_unit(lam, G)
                         + clifford_unit(nu, G) * clifford_unit(lam, G) * clifford_unit(mu, G)
                         + clifford_unit(lam, G) * clifford_unit(mu, G) * clifford_unit(nu, G)
                         - clifford_unit(nu, G) * clifford_unit(mu, G) * clifford_unit(lam, G)
                         - clifford_unit(lam, G) * clifford_unit(nu, G) * clifford_unit(mu, G)
                         - clifford_unit(mu, G) * clifford_unit(lam, G) * clifford_unit(nu, G)) / 6
                        + half * (unit.get_metric(mu, nu) + unit.get_metric(nu, mu)) * clifford_unit(lam, G)
                        - half * (unit.get_metric(mu, lam) + unit.get_metric(lam, mu)) * clifford_unit(nu, G)
                        + half * (unit.get_metric(nu, lam) + unit.get_metric(lam, nu)) * clifford_unit(mu, G)
                        - clifford_unit(mu, G) * clifford_unit(nu, G) * clifford_unit(lam, G);
                result += check_equal(canonicalize_clifford(e), 0);
        }
        return result;
}

static unsigned clifford_check8()
{
        unsigned result = 0;

        realsymbol a("a");
        varidx mu(symbol("mu", "\\mu"), 1);

        ex e = clifford_unit(mu, diag_matrix({-1})), e0 = e.subs(mu==0);
        result += ( exp(a*e0)*e0*e0 == -exp(e0*a) ) ? 0 : 1;

        return result;
}

unsigned exam_clifford()
{
        unsigned result = 0;
        
        cout << "examining clifford objects" << flush;

        result += clifford_check1(); cout << '.' << flush;
        result += clifford_check2(); cout << '.' << flush;
        result += clifford_check3(); cout << '.' << flush;
        result += clifford_check4(); cout << '.' << flush;
        result += clifford_check5(); cout << '.' << flush;

        // anticommuting, symmetric examples
        result += clifford_check6<varidx>(ex_to<matrix>(diag_matrix({-1, 1, 1, 1})));
        result += clifford_check6<idx>(ex_to<matrix>(diag_matrix({-1, 1, 1, 1})));; cout << '.' << flush;
        result += clifford_check6<varidx>(ex_to<matrix>(diag_matrix({-1, -1, -1, -1})))+clifford_check6<idx>(ex_to<matrix>(diag_matrix({-1, -1, -1, -1})));; cout << '.' << flush;
        result += clifford_check6<idx>(ex_to<matrix>(diag_matrix({-1, 1, 1, -1})))+clifford_check6<idx>(ex_to<matrix>(diag_matrix({-1, 1, 1, -1})));; cout << '.' << flush;
        result += clifford_check6<varidx>(ex_to<matrix>(diag_matrix({-1, 0, 1, -1})))+clifford_check6<idx>(ex_to<matrix>(diag_matrix({-1, 0, 1, -1})));; cout << '.' << flush;
        result += clifford_check6<varidx>(ex_to<matrix>(diag_matrix({-3, 0, 2, -1})))+clifford_check6<idx>(ex_to<matrix>(diag_matrix({-3, 0, 2, -1})));; cout << '.' << flush;

        realsymbol s("s"), t("t"); // symbolic entries in matric
        result += clifford_check6<varidx>(ex_to<matrix>(diag_matrix({-1, 1, s, t})))+clifford_check6<idx>(ex_to<matrix>(diag_matrix({-1, 1, s, t})));; cout << '.' << flush;

        matrix A(4, 4);
        A = {{1,  0,  0,  0}, // anticommuting, not symmetric, Tr=0
             {0, -1,  0,  0},
             {0,  0,  0, -1},
             {0,  0,  1,  0}};
        result += clifford_check6<varidx>(A)+clifford_check6<idx>(A);; cout << '.' << flush;

        A = {{1,  0,  0,  0}, // anticommuting, not symmetric, Tr=2
             {0,  1,  0,  0},
             {0,  0,  0, -1},
             {0,  0,  1,  0}};
        result += clifford_check6<varidx>(A)+clifford_check6<idx>(A);; cout << '.' << flush;

        A = {{1,  0,  0,  0}, // not anticommuting, symmetric, Tr=0
             {0, -1,  0,  0},
             {0,  0,  0, -1},
             {0,  0, -1,  0}};
        result += clifford_check6<varidx>(A)+clifford_check6<idx>(A);; cout << '.' << flush;

        A = {{1,  0,  0,  0}, // not anticommuting, symmetric, Tr=2
             {0,  1,  0,  0},
             {0,  0,  0, -1},
             {0,  0, -1,  0}};
        result += clifford_check6<varidx>(A)+clifford_check6<idx>(A);; cout << '.' << flush;

        A = {{1,  1,  0,  0}, // not anticommuting, not symmetric, Tr=4
             {0,  1,  1,  0},
             {0,  0,  1,  1},
             {0,  0,  0,  1}};
        result += clifford_check6<varidx>(A)+clifford_check6<idx>(A);; cout << '.' << flush;

        symbol dim("D");
        result += clifford_check7(minkmetric(), dim); cout << '.' << flush;

        varidx chi(symbol("chi"), dim), xi(symbol("xi"), dim);
        result += clifford_check7(delta_tensor(xi, chi), dim); cout << '.' << flush;

        result += clifford_check7(lorentz_g(xi, chi), dim); cout << '.' << flush;

        result += clifford_check7(indexed(-2*minkmetric(), sy_symm(), xi, chi), dim); cout << '.' << flush;
        result += clifford_check7(-2*delta_tensor(xi, chi), dim); cout << '.' << flush;

        result += clifford_check8(); cout << '.' << flush;

        return result;
}

int main(int argc, char** argv)
{
        return exam_clifford();
}