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Grid/lib/tensors/Tensor_exp.h

142 lines
4.4 KiB
C++

/*************************************************************************************
Grid physics library, www.github.com/paboyle/Grid
Source file: ./lib/tensors/Tensor_exp.h
Copyright (C) 2015
Author: neo <cossu@post.kek.jp>
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
the Free Software Foundation; either version 2 of the License, or
(at your option) any later version.
This program is distributed in the hope that it will be useful,
but WITHOUT ANY WARRANTY; without even the implied warranty of
MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
GNU General Public License for more details.
You should have received a copy of the GNU General Public License along
with this program; if not, write to the Free Software Foundation, Inc.,
51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA.
See the full license in the file "LICENSE" in the top level distribution directory
*************************************************************************************/
/* END LEGAL */
#ifndef GRID_MATH_EXP_H
#define GRID_MATH_EXP_H
#define DEFAULT_MAT_EXP 12
NAMESPACE_BEGIN(Grid);
///////////////////////////////////////////////
// Exponentiate function for scalar, vector, matrix
///////////////////////////////////////////////
template<class vtype> accelerator_inline iScalar<vtype> Exponentiate(const iScalar<vtype>&r, RealD alpha , Integer Nexp = DEFAULT_MAT_EXP)
{
iScalar<vtype> ret;
ret._internal = Exponentiate(r._internal, alpha, Nexp);
return ret;
}
template<class vtype, int N> accelerator_inline iVector<vtype, N> Exponentiate(const iVector<vtype,N>&r, RealD alpha , Integer Nexp = DEFAULT_MAT_EXP)
{
iVector<vtype, N> ret;
for (int i = 0; i < N; i++)
ret._internal[i] = Exponentiate(r._internal[i], alpha, Nexp);
return ret;
}
// Specialisation: Cayley-Hamilton exponential for SU(3)
template<class vtype, typename std::enable_if< GridTypeMapper<vtype>::TensorLevel == 0>::type * =nullptr>
accelerator_inline iMatrix<vtype,3> Exponentiate(const iMatrix<vtype,3> &arg, RealD alpha , Integer Nexp = DEFAULT_MAT_EXP )
{
// for SU(3) 2x faster than the std implementation using Nexp=12
// notice that it actually computes
// exp ( input matrix )
// the i sign is coming from outside
// input matrix is anti-hermitian NOT hermitian
typedef iMatrix<vtype,3> mat;
typedef iScalar<vtype> scalar;
mat unit(1.0);
const Complex one_over_three = 1.0 / 3.0;
const Complex one_over_two = 1.0 / 2.0;
scalar c0, c1, tmp, c0max, theta, u, w;
scalar xi0, u2, w2, cosw;
scalar fden, h0, h1, h2;
scalar e2iu, emiu, ixi0;
scalar f0, f1, f2;
scalar unity(1.0);
mat iQ2 = arg*arg*alpha*alpha;
mat iQ3 = arg*iQ2*alpha;
// sign in c0 from the conventions on the Ta
scalar imQ3, reQ2;
imQ3 = imag( trace(iQ3) );
reQ2 = real( trace(iQ2) );
c0 = -imQ3 * one_over_three;
c1 = -reQ2 * one_over_two;
// Cayley Hamilton checks to machine precision, tested
tmp = c1 * one_over_three;
c0max = 2.0 * pow(tmp, 1.5);
theta = acos(c0 / c0max) * one_over_three;
u = sqrt(tmp) * cos(theta);
w = sqrt(c1) * sin(theta);
xi0 = sin(w) / w;
u2 = u * u;
w2 = w * w;
cosw = cos(w);
ixi0 = timesI(xi0);
emiu = cos(u) - timesI(sin(u));
e2iu = cos(2.0 * u) + timesI(sin(2.0 * u));
h0 = e2iu * (u2 - w2) +
emiu * ((8.0 * u2 * cosw) + (2.0 * u * (3.0 * u2 + w2) * ixi0));
h1 = e2iu * (2.0 * u) - emiu * ((2.0 * u * cosw) - (3.0 * u2 - w2) * ixi0);
h2 = e2iu - emiu * (cosw + (3.0 * u) * ixi0);
fden = unity / (9.0 * u2 - w2); // reals
f0 = h0 * fden;
f1 = h1 * fden;
f2 = h2 * fden;
return (f0 * unit + timesMinusI(f1) * arg*alpha - f2 * iQ2);
}
// General exponential
template<class vtype,int N, typename std::enable_if< GridTypeMapper<vtype>::TensorLevel == 0 >::type * =nullptr>
accelerator_inline iMatrix<vtype,N> Exponentiate(const iMatrix<vtype,N> &arg, RealD alpha , Integer Nexp = DEFAULT_MAT_EXP )
{
// notice that it actually computes
// exp ( input matrix )
// the i sign is coming from outside
// input matrix is anti-hermitian NOT hermitian
typedef iMatrix<vtype,N> mat;
mat unit(1.0);
mat temp(unit);
for(int i=Nexp; i>=1;--i){
temp *= alpha/RealD(i);
temp = unit + temp*arg;
}
return temp;
}
NAMESPACE_END(Grid);
#endif