* functions. */
/*
- * GiNaC Copyright (C) 1999-2005 Johannes Gutenberg University Mainz, Germany
+ * GiNaC Copyright (C) 1999-2008 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
return exp(x);
}
+static ex exp_real_part(const ex & x)
+{
+ return exp(GiNaC::real_part(x))*cos(GiNaC::imag_part(x));
+}
+
+static ex exp_imag_part(const ex & x)
+{
+ return exp(GiNaC::real_part(x))*sin(GiNaC::imag_part(x));
+}
+
REGISTER_FUNCTION(exp, eval_func(exp_eval).
evalf_func(exp_evalf).
derivative_func(exp_deriv).
+ real_part_func(exp_real_part).
+ imag_part_func(exp_imag_part).
latex_name("\\exp"));
//////////
// log(exp(t)) -> t (if -Pi < t.imag() <= Pi):
if (is_ex_the_function(x, exp)) {
const ex &t = x.op(0);
- if (is_a<symbol>(t) && t.info(info_flags::real)) {
+ if (t.info(info_flags::real))
return t;
- }
- if (t.info(info_flags::numeric)) {
- const numeric &nt = ex_to<numeric>(t);
- if (nt.is_real())
- return t;
- }
}
return log(x).hold();
throw do_taylor(); // caught by function::series()
}
+static ex log_real_part(const ex & x)
+{
+ if (x.info(info_flags::nonnegative))
+ return log(x).hold();
+ return log(abs(x));
+}
+
+static ex log_imag_part(const ex & x)
+{
+ if (x.info(info_flags::nonnegative))
+ return 0;
+ return atan2(GiNaC::imag_part(x), GiNaC::real_part(x));
+}
+
REGISTER_FUNCTION(log, eval_func(log_eval).
evalf_func(log_evalf).
derivative_func(log_deriv).
series_func(log_series).
+ real_part_func(log_real_part).
+ imag_part_func(log_imag_part).
latex_name("\\ln"));
//////////
return cos(x);
}
+static ex sin_real_part(const ex & x)
+{
+ return cosh(GiNaC::imag_part(x))*sin(GiNaC::real_part(x));
+}
+
+static ex sin_imag_part(const ex & x)
+{
+ return sinh(GiNaC::imag_part(x))*cos(GiNaC::real_part(x));
+}
+
REGISTER_FUNCTION(sin, eval_func(sin_eval).
evalf_func(sin_evalf).
derivative_func(sin_deriv).
+ real_part_func(sin_real_part).
+ imag_part_func(sin_imag_part).
latex_name("\\sin"));
//////////
return -sin(x);
}
+static ex cos_real_part(const ex & x)
+{
+ return cosh(GiNaC::imag_part(x))*cos(GiNaC::real_part(x));
+}
+
+static ex cos_imag_part(const ex & x)
+{
+ return -sinh(GiNaC::imag_part(x))*sin(GiNaC::real_part(x));
+}
+
REGISTER_FUNCTION(cos, eval_func(cos_eval).
evalf_func(cos_evalf).
derivative_func(cos_deriv).
+ real_part_func(cos_real_part).
+ imag_part_func(cos_imag_part).
latex_name("\\cos"));
//////////
return (_ex1+power(tan(x),_ex2));
}
+static ex tan_real_part(const ex & x)
+{
+ ex a = GiNaC::real_part(x);
+ ex b = GiNaC::imag_part(x);
+ return tan(a)/(1+power(tan(a),2)*power(tan(b),2));
+}
+
+static ex tan_imag_part(const ex & x)
+{
+ ex a = GiNaC::real_part(x);
+ ex b = GiNaC::imag_part(x);
+ return tanh(b)/(1+power(tan(a),2)*power(tan(b),2));
+}
+
static ex tan_series(const ex &x,
const relational &rel,
int order,
evalf_func(tan_evalf).
derivative_func(tan_deriv).
series_func(tan_series).
+ real_part_func(tan_real_part).
+ imag_part_func(tan_imag_part).
latex_name("\\tan"));
//////////
static ex atan2_eval(const ex & y, const ex & x)
{
- if (y.info(info_flags::numeric) && x.info(info_flags::numeric)) {
+ if (y.is_zero()) {
- if (y.is_zero()) {
+ // atan(0, 0) -> 0
+ if (x.is_zero())
+ return _ex0;
- // atan(0, 0) -> 0
- if (x.is_zero())
- return _ex0;
+ // atan(0, x), x real and positive -> 0
+ if (x.info(info_flags::positive))
+ return _ex0;
- // atan(0, x), x real and positive -> 0
- if (x.info(info_flags::positive))
- return _ex0;
+ // atan(0, x), x real and negative -> Pi
+ if (x.info(info_flags::negative))
+ return Pi;
+ }
- // atan(0, x), x real and negative -> -Pi
- if (x.info(info_flags::negative))
- return _ex_1*Pi;
- }
+ if (x.is_zero()) {
- if (x.is_zero()) {
+ // atan(y, 0), y real and positive -> Pi/2
+ if (y.info(info_flags::positive))
+ return _ex1_2*Pi;
- // atan(y, 0), y real and positive -> Pi/2
- if (y.info(info_flags::positive))
- return _ex1_2*Pi;
+ // atan(y, 0), y real and negative -> -Pi/2
+ if (y.info(info_flags::negative))
+ return _ex_1_2*Pi;
+ }
- // atan(y, 0), y real and negative -> -Pi/2
- if (y.info(info_flags::negative))
- return _ex_1_2*Pi;
- }
+ if (y.is_equal(x)) {
- if (y.is_equal(x)) {
+ // atan(y, y), y real and positive -> Pi/4
+ if (y.info(info_flags::positive))
+ return _ex1_4*Pi;
- // atan(y, y), y real and positive -> Pi/4
- if (y.info(info_flags::positive))
- return _ex1_4*Pi;
+ // atan(y, y), y real and negative -> -3/4*Pi
+ if (y.info(info_flags::negative))
+ return numeric(-3, 4)*Pi;
+ }
- // atan(y, y), y real and negative -> -3/4*Pi
- if (y.info(info_flags::negative))
- return numeric(-3, 4)*Pi;
- }
+ if (y.is_equal(-x)) {
- if (y.is_equal(-x)) {
+ // atan(y, -y), y real and positive -> 3*Pi/4
+ if (y.info(info_flags::positive))
+ return numeric(3, 4)*Pi;
- // atan(y, -y), y real and positive -> 3*Pi/4
- if (y.info(info_flags::positive))
- return numeric(3, 4)*Pi;
+ // atan(y, -y), y real and negative -> -Pi/4
+ if (y.info(info_flags::negative))
+ return _ex_1_4*Pi;
+ }
- // atan(y, -y), y real and negative -> -Pi/4
- if (y.info(info_flags::negative))
- return _ex_1_4*Pi;
- }
+ // atan(float, float) -> float
+ if (is_a<numeric>(y) && !y.info(info_flags::crational) &&
+ is_a<numeric>(x) && !x.info(info_flags::crational))
+ return atan(ex_to<numeric>(y), ex_to<numeric>(x));
- // atan(float, float) -> float
- if (!y.info(info_flags::crational) && !x.info(info_flags::crational))
- return atan(ex_to<numeric>(y), ex_to<numeric>(x));
-
- // atan(real, real) -> atan(y/x) +/- Pi
- if (y.info(info_flags::real) && x.info(info_flags::real)) {
- if (x.info(info_flags::positive))
- return atan(y/x);
- else if(y.info(info_flags::positive))
- return atan(y/x)+Pi;
- else
- return atan(y/x)-Pi;
- }
+ // atan(real, real) -> atan(y/x) +/- Pi
+ if (y.info(info_flags::real) && x.info(info_flags::real)) {
+ if (x.info(info_flags::positive))
+ return atan(y/x);
+ else if (y.info(info_flags::positive))
+ return atan(y/x)+Pi;
+ else
+ return atan(y/x)-Pi;
}
return atan2(y, x).hold();
return cosh(x);
}
+static ex sinh_real_part(const ex & x)
+{
+ return sinh(GiNaC::real_part(x))*cos(GiNaC::imag_part(x));
+}
+
+static ex sinh_imag_part(const ex & x)
+{
+ return cosh(GiNaC::real_part(x))*sin(GiNaC::imag_part(x));
+}
+
REGISTER_FUNCTION(sinh, eval_func(sinh_eval).
evalf_func(sinh_evalf).
derivative_func(sinh_deriv).
+ real_part_func(sinh_real_part).
+ imag_part_func(sinh_imag_part).
latex_name("\\sinh"));
//////////
return sinh(x);
}
+static ex cosh_real_part(const ex & x)
+{
+ return cosh(GiNaC::real_part(x))*cos(GiNaC::imag_part(x));
+}
+
+static ex cosh_imag_part(const ex & x)
+{
+ return sinh(GiNaC::real_part(x))*sin(GiNaC::imag_part(x));
+}
+
REGISTER_FUNCTION(cosh, eval_func(cosh_eval).
evalf_func(cosh_evalf).
derivative_func(cosh_deriv).
+ real_part_func(cosh_real_part).
+ imag_part_func(cosh_imag_part).
latex_name("\\cosh"));
//////////
return (sinh(x)/cosh(x)).series(rel, order, options);
}
+static ex tanh_real_part(const ex & x)
+{
+ ex a = GiNaC::real_part(x);
+ ex b = GiNaC::imag_part(x);
+ return tanh(a)/(1+power(tanh(a),2)*power(tan(b),2));
+}
+
+static ex tanh_imag_part(const ex & x)
+{
+ ex a = GiNaC::real_part(x);
+ ex b = GiNaC::imag_part(x);
+ return tan(b)/(1+power(tanh(a),2)*power(tan(b),2));
+}
+
REGISTER_FUNCTION(tanh, eval_func(tanh_eval).
evalf_func(tanh_evalf).
derivative_func(tanh_deriv).
series_func(tanh_series).
+ real_part_func(tanh_real_part).
+ imag_part_func(tanh_imag_part).
latex_name("\\tanh"));
//////////