+REGISTER_FUNCTION(beta, beta_eval, beta_evalf, beta_diff, beta_series);
+
+//////////
+// Psi-function (aka digamma-function)
+//////////
+
+static ex psi1_evalf(const ex & x)
+{
+ BEGIN_TYPECHECK
+ TYPECHECK(x,numeric)
+ END_TYPECHECK(psi(x))
+
+ return psi(ex_to_numeric(x));
+}
+
+/** Evaluation of digamma-function psi(x).
+ * Somebody ought to provide some good numerical evaluation some day... */
+static ex psi1_eval(const ex & x)
+{
+ if (x.info(info_flags::numeric)) {
+ numeric nx = ex_to_numeric(x);
+ if (nx.is_integer()) {
+ // integer case
+ if (nx.is_positive()) {
+ // psi(n) -> 1 + 1/2 +...+ 1/(n-1) - EulerGamma
+ numeric rat(0);
+ for (numeric i(nx+_num_1()); i.is_positive(); --i)
+ rat += i.inverse();
+ return rat-EulerGamma;
+ } else {
+ // for non-positive integers there is a pole:
+ throw (std::domain_error("psi_eval(): simple pole"));
+ }
+ }
+ if ((_num2()*nx).is_integer()) {
+ // half integer case
+ if (nx.is_positive()) {
+ // psi((2m+1)/2) -> 2/(2m+1) + 2/2m +...+ 2/1 - EulerGamma - 2log(2)
+ numeric rat(0);
+ for (numeric i((nx+_num_1())*_num2()); i.is_positive(); i-=_num2())
+ rat += _num2()*i.inverse();
+ return rat-EulerGamma-_ex2()*log(_ex2());
+ } else {
+ // use the recurrence relation
+ // psi(-m-1/2) == psi(-m-1/2+1) - 1 / (-m-1/2)
+ // to relate psi(-m-1/2) to psi(1/2):
+ // psi(-m-1/2) == psi(1/2) + r
+ // where r == ((-1/2)^(-1) + ... + (-m-1/2)^(-1))
+ numeric recur(0);
+ for (numeric p(nx); p<0; ++p)
+ recur -= pow(p, _num_1());
+ return recur+psi(_ex1_2());
+ }
+ }
+ // psi1_evalf should be called here once it becomes available
+ }
+
+ return psi(x).hold();
+}
+
+static ex psi1_diff(const ex & x, unsigned diff_param)
+{
+ GINAC_ASSERT(diff_param==0);
+
+ // d/dx psi(x) -> psi(1,x)
+ return psi(_ex1(), x);
+}
+
+static ex psi1_series(const ex & x, const symbol & s, const ex & pt, int order)
+{
+ // method:
+ // Taylor series where there is no pole falls back to polygamma function
+ // evaluation.
+ // On a pole at -m use the recurrence relation
+ // psi(x) == psi(x+1) - 1/z
+ // from which follows
+ // series(psi(x),x,-m,order) ==
+ // series(psi(x+m+1) - 1/x - 1/(x+1) - 1/(x+m)),x,-m,order);
+ const ex x_pt = x.subs(s==pt);
+ if (!x_pt.info(info_flags::integer) || x_pt.info(info_flags::positive))
+ throw do_taylor(); // caught by function::series()
+ // if we got here we have to care for a simple pole at -m:
+ numeric m = -ex_to_numeric(x_pt);
+ ex recur;
+ for (numeric p; p<=m; ++p)
+ recur += power(x+p,_ex_1());
+ return (psi(x+m+_ex1())-recur).series(s, pt, order);
+}
+
+const unsigned function_index_psi1 = function::register_new("psi", psi1_eval, psi1_evalf, psi1_diff, psi1_series);
+
+//////////
+// Psi-functions (aka polygamma-functions) psi(0,x)==psi(x)
+//////////
+
+static ex psi2_evalf(const ex & n, const ex & x)
+{
+ BEGIN_TYPECHECK
+ TYPECHECK(n,numeric)
+ TYPECHECK(x,numeric)
+ END_TYPECHECK(psi(n,x))
+
+ return psi(ex_to_numeric(n), ex_to_numeric(x));
+}
+
+/** Evaluation of polygamma-function psi(n,x).
+ * Somebody ought to provide some good numerical evaluation some day... */
+static ex psi2_eval(const ex & n, const ex & x)
+{
+ // psi(0,x) -> psi(x)
+ if (n.is_zero())
+ return psi(x);
+ // psi(-1,x) -> log(gamma(x))
+ if (n.is_equal(_ex_1()))
+ return log(gamma(x));
+ if (n.info(info_flags::numeric) && n.info(info_flags::posint) &&
+ x.info(info_flags::numeric)) {
+ numeric nn = ex_to_numeric(n);
+ numeric nx = ex_to_numeric(x);
+ if (nx.is_integer()) {
+ // integer case
+ if (nx.is_equal(_num1()))
+ // use psi(n,1) == (-)^(n+1) * n! * zeta(n+1)
+ return pow(_num_1(),nn+_num1())*factorial(nn)*zeta(ex(nn+_num1()));
+ if (nx.is_positive()) {
+ // use the recurrence relation
+ // psi(n,m) == psi(n,m+1) - (-)^n * n! / m^(n+1)
+ // to relate psi(n,m) to psi(n,1):
+ // psi(n,m) == psi(n,1) + r
+ // where r == (-)^n * n! * (1^(-n-1) + ... + (m-1)^(-n-1))
+ numeric recur(0);
+ for (numeric p(1); p<nx; ++p)
+ recur += pow(p, -nn+_num_1());
+ recur *= factorial(nn)*pow(_num_1(), nn);
+ return recur+psi(n,_ex1());
+ } else {
+ // for non-positive integers there is a pole:
+ throw (std::domain_error("psi2_eval(): pole"));
+ }
+ }
+ if ((_num2()*nx).is_integer()) {
+ // half integer case
+ if (nx.is_equal(_num1_2()))
+ // use psi(n,1/2) == (-)^(n+1) * n! * (2^(n+1)-1) * zeta(n+1)
+ return pow(_num_1(),nn+_num1())*factorial(nn)*(pow(_num2(),nn+_num1()) + _num_1())*zeta(ex(nn+_num1()));
+ if (nx.is_positive()) {
+ numeric m = nx - _num1_2();
+ // use the multiplication formula
+ // psi(n,2*m) == (psi(n,m) + psi(n,m+1/2)) / 2^(n+1)
+ // to revert to positive integer case
+ return psi(n,_num2()*m)*pow(_num2(),nn+_num1())-psi(n,m);
+ } else {
+ // use the recurrence relation
+ // psi(n,-m-1/2) == psi(n,-m-1/2+1) - (-)^n * n! / (-m-1/2)^(n+1)
+ // to relate psi(n,-m-1/2) to psi(n,1/2):
+ // psi(n,-m-1/2) == psi(n,1/2) + r
+ // where r == (-)^(n+1) * n! * ((-1/2)^(-n-1) + ... + (-m-1/2)^(-n-1))
+ numeric recur(0);
+ for (numeric p(nx); p<0; ++p)
+ recur += pow(p, -nn+_num_1());
+ recur *= factorial(nn)*pow(_num_1(), nn+_num_1());
+ return recur+psi(n,_ex1_2());
+ }
+ }
+ // psi2_evalf should be called here once it becomes available
+ }
+
+ return psi(n, x).hold();
+}
+
+static ex psi2_diff(const ex & n, const ex & x, unsigned diff_param)
+{
+ GINAC_ASSERT(diff_param<2);
+
+ if (diff_param==0) {
+ // d/dn psi(n,x)
+ throw(std::logic_error("cannot diff psi(n,x) with respect to n"));
+ }
+ // d/dx psi(n,x) -> psi(n+1,x)
+ return psi(n+_ex1(), x);
+}
+
+static ex psi2_series(const ex & n, const ex & x, const symbol & s, const ex & pt, int order)
+{
+ // method:
+ // Taylor series where there is no pole falls back to polygamma function
+ // evaluation.
+ // On a pole at -m use the recurrence relation
+ // psi(n,x) == psi(n,x+1) - (-)^n * n! / x^(n+1)
+ // from which follows
+ // series(psi(x),x,-m,order) ==
+ // series(psi(x+m+1) - (-1)^n * n! * ((x)^(-n-1) + (x+1)^(-n-1) + ...
+ // ... + (x+m)^(-n-1))),x,-m,order);
+ const ex x_pt = x.subs(s==pt);
+ if (!x_pt.info(info_flags::integer) || x_pt.info(info_flags::positive))
+ throw do_taylor(); // caught by function::series()
+ // if we got here we have to care for a pole of order n+1 at -m:
+ numeric m = -ex_to_numeric(x_pt);
+ ex recur;
+ for (numeric p; p<=m; ++p)
+ recur += power(x+p,-n+_ex_1());
+ recur *= factorial(n)*power(_ex_1(),n);
+ return (psi(n, x+m+_ex1())-recur).series(s, pt, order);
+}
+
+const unsigned function_index_psi2 = function::register_new("psi", psi2_eval, psi2_evalf, psi2_diff, psi2_series);