*
* 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
*
* 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
// from which follows
// series(lgamma(x),x==-m,order) ==
// series(lgamma(x+m+1)-log(x)...-log(x+m)),x==-m,order);
// from which follows
// series(lgamma(x),x==-m,order) ==
// series(lgamma(x+m+1)-log(x)...-log(x+m)),x==-m,order);
if (!arg_pt.info(info_flags::integer) || arg_pt.info(info_flags::positive))
throw do_taylor(); // caught by function::series()
// if we got here we have to care for a simple pole of tgamma(-m):
if (!arg_pt.info(info_flags::integer) || arg_pt.info(info_flags::positive))
throw do_taylor(); // caught by function::series()
// if we got here we have to care for a simple pole of tgamma(-m):
// tgamma(x) == tgamma(x+1) / x
// from which follows
// series(tgamma(x),x==-m,order) ==
// tgamma(x) == tgamma(x+1) / x
// from which follows
// series(tgamma(x),x==-m,order) ==
- // series(tgamma(x+m+1)/(x*(x+1)*...*(x+m)),x==-m,order+1);
- const ex arg_pt = arg.subs(rel);
+ // series(tgamma(x+m+1)/(x*(x+1)*...*(x+m)),x==-m,order);
+ const ex arg_pt = arg.subs(rel, subs_options::no_pattern);
if (!arg_pt.info(info_flags::integer) || arg_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:
if (!arg_pt.info(info_flags::integer) || arg_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:
if (x.info(info_flags::numeric) && y.info(info_flags::numeric)) {
// treat all problematic x and y that may not be passed into tgamma,
// because they would throw there although beta(x,y) is well-defined
if (x.info(info_flags::numeric) && y.info(info_flags::numeric)) {
// treat all problematic x and y that may not be passed into tgamma,
// because they would throw there although beta(x,y) is well-defined
// Taylor series where there is no pole of one of the tgamma functions
// falls back to beta function evaluation. Otherwise, fall back to
// tgamma series directly.
// Taylor series where there is no pole of one of the tgamma functions
// falls back to beta function evaluation. Otherwise, fall back to
// tgamma series directly.
- const ex arg1_pt = arg1.subs(rel);
- const ex arg2_pt = arg2.subs(rel);
- GINAC_ASSERT(is_exactly_a<symbol>(rel.lhs()));
+ const ex arg1_pt = arg1.subs(rel, subs_options::no_pattern);
+ const ex arg2_pt = arg2.subs(rel, subs_options::no_pattern);
+ GINAC_ASSERT(is_a<symbol>(rel.lhs()));
const symbol &s = ex_to<symbol>(rel.lhs());
ex arg1_ser, arg2_ser, arg1arg2_ser;
if ((!arg1_pt.info(info_flags::integer) || arg1_pt.info(info_flags::positive)) &&
const symbol &s = ex_to<symbol>(rel.lhs());
ex arg1_ser, arg2_ser, arg1arg2_ser;
if ((!arg1_pt.info(info_flags::integer) || arg1_pt.info(info_flags::positive)) &&
throw do_taylor(); // caught by function::series()
// trap the case where arg1 is on a pole:
if (arg1.info(info_flags::integer) && !arg1.info(info_flags::positive))
throw do_taylor(); // caught by function::series()
// trap the case where arg1 is on a pole:
if (arg1.info(info_flags::integer) && !arg1.info(info_flags::positive))
// trap the case where arg2 is on a pole:
if (arg2.info(info_flags::integer) && !arg2.info(info_flags::positive))
// trap the case where arg2 is on a pole:
if (arg2.info(info_flags::integer) && !arg2.info(info_flags::positive))
// trap the case where arg1+arg2 is on a pole:
if ((arg1+arg2).info(info_flags::integer) && !(arg1+arg2).info(info_flags::positive))
// trap the case where arg1+arg2 is on a pole:
if ((arg1+arg2).info(info_flags::integer) && !(arg1+arg2).info(info_flags::positive))
// compose the result (expanding all the terms):
return (arg1_ser*arg2_ser/arg1arg2_ser).series(rel, order, options).expand();
}
// compose the result (expanding all the terms):
return (arg1_ser*arg2_ser/arg1arg2_ser).series(rel, order, options).expand();
}
// 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);
// 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);
if (!arg_pt.info(info_flags::integer) || arg_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:
if (!arg_pt.info(info_flags::integer) || arg_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:
-const unsigned function_index_psi1 =
- function::register_new(function_options("psi").
+unsigned psi1_SERIAL::serial =
+ function::register_new(function_options("psi", 1).
// 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);
// 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);
if (!arg_pt.info(info_flags::integer) || arg_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:
if (!arg_pt.info(info_flags::integer) || arg_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:
return (psi(n, arg+m+_ex1)-recur).series(rel, order, options);
}
return (psi(n, arg+m+_ex1)-recur).series(rel, order, options);
}
-const unsigned function_index_psi2 =
- function::register_new(function_options("psi").
+unsigned psi2_SERIAL::serial =
+ function::register_new(function_options("psi", 2).