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digraph TrigonometricsFunctions {
node [shape=circle];
//
// -*- Basic Call -*-
//
F77_Call [label="Fortan Call", shape=doublecircle, color=green];
C_Call [label="C Call", shape=doublecircle, color=blue];
LAPACK_Call [label="LAPACK Call", shape=doublecircle, color=red];
//
// -*- Specific LAPACK Call -*-
//
Dlamch_E_Call [label="dlamch('E')", comment="Précision Machine - LAPACK", shape=doublecircle, color=red];
Dlamch_U_Call [label="dlamch('U')", comment="Borne Inférieure - LAPACK", shape=doublecircle, color=red];
Dlamch_O_Call [label="dlamch('O')", comment="Borne Supérieure - LAPACK", shape=doublecircle, color=red];
//
// -*- Functions definition -*-
//
// Cosinus
Cos_Real [label="cos(R)"];
Cos_Complex [label="cos(C)"];
Cos_Hyperbolic_Real [label="ch(R)"];
Cos_Hyperbolic_Complex [label="ch(C)"];
// ArcCosinus
ACos_Real [label="acos(R)"];
ACos_Complex [label="acos(C)"];
ACos_Hyperbolic_Real [label="ach(R)"];
ACos_Hyperbolic_Complex [label="ach(C)"];
// Sinus
Sin_Real [label="sin(R)"];
Sin_Complex [label="sin(C)"];
Sin_Hyperbolic_Real [label="sh(R)"];
Sin_Hyperbolic_Complex [label="sh(C)"];
// ArcSinus
ASin_Real [label="asin(R)"];
ASin_Complex [label="asin(C)"];
ASin_Hyperbolic_Real [label="ash(R)"];
ASin_Hyperbolic_Complex [label="ash(C)"];
// Tangeante
Tan_Real [label="tan(R)"];
Tan_Complex [label="tan(C)", comment="wtan"];
Tan_Hyperbolic_Real [label="tanh(R)"];
Tan_Hyperbolic_Complex [label="tanh(C)"];
// ArcTangeante
ATan_Real [label="atan(R)"];
ATan_Complex [label="atan(C)", comment="watan"];
ATan_Hyperbolic_Real [label="atanh(R)"];
ATan_Hyperbolic_Complex [label="atanh(C)"];
// ArcTaneante2
ATan2_Real [label="atan2(R)"];
// Exponentielle
Exp_Real [label="exp(R)"];
Exp_Complex [label="exp(C)"];
// Log
Log_Real [label="log(R)"];
Log_Positive_Real [label="log(R+)"];
Log_Negative_Real [label="log(R-)"];
Log_Complex [label="log(C)"];
// Log1p
Log1p_Real [label="log1p(R)"];
// Racine Carrée
Sqrt_Real [label="sqrt(R)"];
Sqrt_Positive_Real [label="sqrt(R+)"];
Sqrt_Negative_Real [label="sqrt(R-)"];
Sqrt_Complex [label="sqrt(C)", comment="wsqrt"];
// Partie Imaginaire
Imag_Complex [label="imag(C)"];
// Valeur Absolue
Abs_Real [label="abs(R)", comment="|R|"];
// Signe
Sign_Real [label="sign(R)"];
// Pythagore
Pythag_Real [label="pythag(R)"];
//
// -*- Functions call links -*-
//
subgraph clusterLAPACK {
style=filled;
color=lightsteelblue;
label="LAPACK";
// -*- DLAMCH -*-
Dlamch_E_Call -> LAPACK_Call;
Dlamch_U_Call -> LAPACK_Call;
Dlamch_O_Call -> LAPACK_Call;
}
// -*- COS -*-
//
// cos(a+ib) = cos(a).ch(b) - i.sin(a).sh(b)
Cos_Complex -> {
Cos_Real
Sin_Real
Cos_Hyperbolic_Real
Sin_Hyperbolic_Real
};
// Call a cosinus function in F77 math lib
Cos_Real -> F77_Call;
// -*- ACOS -*-
//
// acos(a+ib) = see $SCIHOME/modules/elementaries_functions/src/fortran/wacos.f
ACos_Complex -> {
Dlamch_O_Call
Dlamch_E_Call
Dlamch_U_Call
Sqrt_Real
Abs_Real
ACos_Real
ATan_Real
Log1p_Real
Log_Real
Sign_Real
};
// Call an inverse cosine function in F77 math lib
ACos_Real -> F77_Call;
// -*- COSH -*-
//
// ch(z) = cos(i.z)
Cos_Hyperbolic_Complex -> {
Cos_Complex
};
// ch(x) = 1/2 . exp(|x|) + exp(-|x|)
Cos_Hyperbolic_Real -> {
Exp_Real
Abs_Real
};
// -*- ACOSH -*-
//
// acosh(z) = sign(-imag(acos(z)) i acos(z)
ACos_Hyperbolic_Complex -> {
Imag_Complex
ACos_Complex
};
// acosh(z) = sign(-imag(acos(z)) i acos(
ACos_Hyperbolic_Real -> {
Imag_Complex
ACos_Complex
Min_Real
};
// -*- SIN -*-
//
// sin(a+ib) = sin(a).ch(b) + i.cos(a).sh(b)
Sin_Complex -> {
Cos_Real
Sin_Real
Cos_Hyperbolic_Real
Sin_Hyperbolic_Real
};
// Call a sinus function in F77 math lib
Sin_Real -> F77_Call;
// -*- ASIN -*-
//
// asin(a+ib) = see $SCIHOME/modules/elementaries_functions/src/fortran/wasin.f
ASin_Complex -> {
Dlamch_O_Call
Dlamch_U_Call
Dlamch_E_Call
Abs_Real
Sqrt_Real
ASin_Real
ATan_Real
Log1p_Real
Log_Real
Sign_Real
};
// Call an inverse sine function in F77 math lib
ASin_Real -> F77_Call;
// -*- SINH -*-
//
// sh(z) = -i.sin(i.z)
Sin_Hyperbolic_Complex -> {
Sin_Complex
};
// sh(x) = imag(sin(i.x))
Sin_Hyperbolic_Real -> {
Sin_Complex
Imag_Complex
};
// -*- ASINH -*-
//
// asinh(z) = -i asin(i z)
ASin_Hyperbolic_Complex -> {
ASin_Complex
};
// asinh(z) = -i asin(i z)
ASin_Hyperbolic_Real -> {
ASin_Complex
Imag_Complex
};
// -*- TAN -*-
//
// tan(a+ib) = x_r + i.x_i
//
// x_r= 1/2 sin(2.a) / d
//
// x_i = | sh(2.b) / 2.d si |b| <= L
// | sign(a)
//
// d = cos(a)^2 + sh(b)^2
//
// L = 1 + log(2 / sqrt(dlamch('e')))
Tan_Complex -> {
Cos_Real
Sin_Hyperbolic_Real
Log_Real
Sqrt_Real
Dlamch_E_Call
Abs_Real
Sign_Real
};
// Call a tangeante function in F77 math lib
Tan_Real -> F77_Call;
//
// -*- ATAN -*-
//
ATan_Complex -> {
Dlamch_O_Call
ATan_Real
Abs_Real
Sign_Real
Log_Real
ATan2_Real
};
// Call an inverse tangeant function in F77 math lib
ATan_Real -> F77_Call;
// -*- TANH -*-
//
// tanh(z) = -i.tan(i.z)
Tan_Hyperbolic_Complex -> {
Tan_Complex
};
// tanh(x) = imag(tan(i.x))
Tan_Hyperbolic_Real -> {
Tan_Complex
Imag_Complex
};
// -*- ATANH -*-
//
// atanh(z) = i atan(-i z)
ATan_Hyperbolic_Complex -> {
ATan_Complex
};
// atanh(x) = -imag(atan(i.x)) | i.atan(-i.x)
ATan_Hyperbolic_Real -> {
ATan_Complex
Imag_Complex
};
// -*- LOG -*-
//
// log(a+ib) = x_r + i.x_i
//
// Constantes :
// L_inf = sqrt(dlamch('U'))
// L_sup = sqrt(R_max / 2)
// R_max = dlamch('O')
// t = pythag(|a|,|b|)
// r = |b|/|a|
//
// x_i = atan2(b, a)
//
// x_r = | 1/2 logp1((|a|-1)(|a|+1) + |b|^2) si 1/2 <= |a| <= sqrt(2)
// | 1/2 log(|a|^2 + |b|^2) si L_inf < |b| && |a| < L_sup
// | |a| si |a| > R_max
// | log(t) si t <= R_max
// | log(|a|) + 1/2 logp1(r^2) sinon
Log_Complex -> {
Sqrt_Real
Dlamch_U_Call
Dlamch_O_Call
Pythag_Real
Log1p_Real
Log_Real
Abs_Real
Pythag_Real
ATan2_Real
};
// Separate positive and negative case
Log_Real -> {
Log_Positive_Real
Log_Negative_Real
};
// Call another log function, treat it as complex
Log_Negative_Real -> Log_Complex;
// Call a log function in F77 math lib
Log_Positive_Real -> F77_Call;
// Call a log1p function in F77 math lib
Log1p_Real -> F77_Call;
// -*- SQRT -*-
//
// sqrt(a+ib) = x_r + i.x_i
//
// Constantes :
// Rmax = dlamch('O')
// BRmin = 2.dlamch('U')
// t = sqrt(2.|a| + pythag(a,b))
//
// (1) a = 0
//~~~~~~~~~~~~
// x_r = | sqrt(|b| / 2) si |b| <= BRmin
// | sqrt(|b|).sqrt(1/2)
//
// x_i = sign(b).x_r
//
// (2) |a| >= BRmax && |b| >= BRmax
//~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
// - Si t > Rmax
// a = a / 16
// b = b / 16
// t = sqrt(2.|a| + pythag(a,b))
// x_r = | 2.t si a >= 0
// | 4.|b| / t
// x_i = | 4.b / t si a >= 0
// | 2.sign(b).t
//
// - Sinon
//
// x_r = | t / 2 si a >= 0
// | |b| / t
//
// x_i = | b / t si a >= 0
// | sign(b) / 2.t
//
// (3) Tous les cas pourris
//~~~~~~~~~~~~~~~~~~~~~~~~~~
//
// x_r = | a + b si a is NaN && b is NaN
// | |b| si |b| > Rmax
// | 0 si a < -Rmax
// | a
//
// x_i = | a + b si a is NaN && b is NaN
// | b si |b| > Rmax
// | sign(b).|a| si a < -Rmax
// | 0
//
Sqrt_Complex -> {
Abs_Real
Sqrt_Real
Sign_Real
Pythag_Real
Dlamch_U_Call
Dlamch_O_Call
};
// Separate positive and negative case
Sqrt_Real -> {
Sqrt_Positive_Real
Sqrt_Negative_Real
};
// Call another sqrt function, treat it as complex
Sqrt_Negative_Real -> Sqrt_Complex;
// Call a sqrt function in F77 math lib
Sqrt_Positive_Real -> F77_Call;
// -*- PYTHAG -*-
//
// pythag(a,b) = sqrt(a^2 + b^2)
//
//
Pythag_Real -> {
Sqrt_Real
Dlamch_O_Call
};
// -*- SIGN -*-
//
// Call a sign function in F77 math lib
Sign_Real -> F77_Call;
// -*- ABS -*-
//
// Call a abs function in F77 math lib
Abs_Real -> F77_Call;
// -*- EXP -*-
//
// exp(a+i.b) = exp(a).cos(b) + i.exp(a)sin(b)
Exp_Complex -> {
Exp_Real
Cos_Real
Sin_Real
};
// Call a exp function in F77 math lib
Exp_Real -> F77_Call;
// -*- ATAN2 -*-
//
// Call atan2 function in C math lib
ATan2_Real -> C_Call;
// -*- IMAG -*-
//
// Call a imag function in F77 math lib
Imag_Complex -> F77_Call;
}
|
