mention the "dummy()" function option

[ginac.git] / ginac / inifcns.h

diff --git a/ginac/inifcns.h b/ginac/inifcns.h
index e0ddc8bbe6ef0d885cdf614a49f757b3a1771ab9..e68bd175569b0c6f7b7ae1d40ec725972c0222a0 100644 (file)
--- a/ginac/inifcns.h
+++ b/ginac/inifcns.h
@@ -3,7 +3,7 @@
  *  Interface to GiNaC's initially known functions. */
 
 /*
- *  GiNaC Copyright (C) 1999-2001 Johannes Gutenberg University Mainz, Germany
+ *  GiNaC Copyright (C) 1999-2003 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
@@ -88,20 +88,37 @@ DECLARE_FUNCTION_1P(Li2)
 /** Trilogarithm. */
 DECLARE_FUNCTION_1P(Li3)
 
+/** Derivatives of Riemann's Zeta-function. */
+DECLARE_FUNCTION_2P(zetaderiv)
+
 // overloading at work: we cannot use the macros here
-/** Riemann's Zeta-function. */
-extern const unsigned function_index_zeta1;
+/** Multiple zeta value including Riemann's zeta-function. */
+class zeta1_SERIAL { public: static unsigned serial; };
 template<typename T1>
 inline function zeta(const T1 & p1) {
-       return function(function_index_zeta1, ex(p1));
+       return function(zeta1_SERIAL::serial, ex(p1));
 }
-/** Derivatives of Riemann's Zeta-function. */
-extern const unsigned function_index_zeta2;
+/** Alternating Euler sum or colored MZV. */
+class zeta2_SERIAL { public: static unsigned serial; };
 template<typename T1, typename T2>
 inline function zeta(const T1 & p1, const T2 & p2) {
-       return function(function_index_zeta2, ex(p1), ex(p2));
+       return function(zeta2_SERIAL::serial, ex(p1), ex(p2));
+}
+class zeta_SERIAL;
+template<> inline bool is_the_function<class zeta_SERIAL>(const ex & x)
+{
+       return is_the_function<zeta1_SERIAL>(x) || is_the_function<zeta2_SERIAL>(x);
 }
 
+/** Polylogarithm and multiple polylogarithm. */
+DECLARE_FUNCTION_2P(Li)
+
+/** Nielsen's generalized polylogarithm. */
+DECLARE_FUNCTION_3P(S)
+
+/** Harmonic polylogarithm. */
+DECLARE_FUNCTION_2P(H)
+
 /** Gamma-function. */
 DECLARE_FUNCTION_1P(lgamma)
 DECLARE_FUNCTION_1P(tgamma)
@@ -111,16 +128,21 @@ DECLARE_FUNCTION_2P(beta)
 
 // overloading at work: we cannot use the macros here
 /** Psi-function (aka digamma-function). */
-extern const unsigned function_index_psi1;
+class psi1_SERIAL { public: static unsigned serial; };
 template<typename T1>
 inline function psi(const T1 & p1) {
-       return function(function_index_psi1, ex(p1));
+       return function(psi1_SERIAL::serial, ex(p1));
 }
 /** Derivatives of Psi-function (aka polygamma-functions). */
-extern const unsigned function_index_psi2;
+class psi2_SERIAL { public: static unsigned serial; };
 template<typename T1, typename T2>
 inline function psi(const T1 & p1, const T2 & p2) {
-       return function(function_index_psi2, ex(p1), ex(p2));
+       return function(psi2_SERIAL::serial, ex(p1), ex(p2));
+}
+class psi_SERIAL;
+template<> inline bool is_the_function<class psi_SERIAL>(const ex & x)
+{
+       return is_the_function<psi1_SERIAL>(x) || is_the_function<psi2_SERIAL>(x);
 }
        
 /** Factorial function. */
@@ -132,7 +154,7 @@ DECLARE_FUNCTION_2P(binomial)
 /** Order term function (for truncated power series). */
 DECLARE_FUNCTION_1P(Order)
 
-ex lsolve(const ex &eqns, const ex &symbols, unsigned options = determinant_algo::automatic);
+ex lsolve(const ex &eqns, const ex &symbols, unsigned options = solve_algo::automatic);
 
 /** Check whether a function is the Order (O(n)) function. */
 inline bool is_order_function(const ex & e)