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Grid/lib/qcd/utils/SUnAdjoint.h

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#ifndef QCD_UTIL_SUNADJOINT_H
#define QCD_UTIL_SUNADJOINT_H
////////////////////////////////////////////////////////////////////////
//
// * Adjoint representation generators
//
// * Normalisation for the fundamental generators:
// trace ta tb = 1/2 delta_ab = T_F delta_ab
// T_F = 1/2 for SU(N) groups
//
//
// base for NxN hermitian traceless matrices
// normalized to 1:
//
// (e_Adj)^a = t^a / sqrt(T_F)
//
// then the real, antisymmetric generators for the adjoint representations
// are computed ( shortcut: e^a == (e_Adj)^a )
//
// (iT_adj)^d_ba = i tr[e^a t^d e^b - t^d e^a e^b]
//
////////////////////////////////////////////////////////////////////////
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NAMESPACE_BEGIN(Grid);
template <int ncolour>
class SU_Adjoint : public SU<ncolour> {
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public:
static const int Dimension = ncolour * ncolour - 1;
template <typename vtype>
using iSUnAdjointMatrix =
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iScalar<iScalar<iMatrix<vtype, Dimension > > >;
// Actually the adjoint matrices are real...
// Consider this overhead... FIXME
typedef iSUnAdjointMatrix<Complex> AMatrix;
typedef iSUnAdjointMatrix<ComplexF> AMatrixF;
typedef iSUnAdjointMatrix<ComplexD> AMatrixD;
typedef iSUnAdjointMatrix<vComplex> vAMatrix;
typedef iSUnAdjointMatrix<vComplexF> vAMatrixF;
typedef iSUnAdjointMatrix<vComplexD> vAMatrixD;
typedef Lattice<vAMatrix> LatticeAdjMatrix;
typedef Lattice<vAMatrixF> LatticeAdjMatrixF;
typedef Lattice<vAMatrixD> LatticeAdjMatrixD;
typedef Lattice<iVector<iScalar<iMatrix<vComplex, Dimension> >, Nd> >
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LatticeAdjField;
typedef Lattice<iVector<iScalar<iMatrix<vComplexF, Dimension> >, Nd> >
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LatticeAdjFieldF;
typedef Lattice<iVector<iScalar<iMatrix<vComplexD, Dimension> >, Nd> >
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LatticeAdjFieldD;
template <class cplx>
static void generator(int Index, iSUnAdjointMatrix<cplx> &iAdjTa) {
// returns i(T_Adj)^index necessary for the projectors
// see definitions above
iAdjTa = zero;
Vector<typename SU<ncolour>::template iSUnMatrix<cplx> > ta(ncolour * ncolour - 1);
typename SU<ncolour>::template iSUnMatrix<cplx> tmp;
// FIXME not very efficient to get all the generators everytime
for (int a = 0; a < Dimension; a++) SU<ncolour>::generator(a, ta[a]);
for (int a = 0; a < Dimension; a++) {
tmp = ta[a] * ta[Index] - ta[Index] * ta[a];
for (int b = 0; b < (ncolour * ncolour - 1); b++) {
typename SU<ncolour>::template iSUnMatrix<cplx> tmp1 =
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2.0 * tmp * ta[b]; // 2.0 from the normalization
Complex iTr = TensorRemove(timesI(trace(tmp1)));
//iAdjTa()()(b, a) = iTr;
iAdjTa()()(a, b) = iTr;
}
}
}
static void printGenerators(void) {
for (int gen = 0; gen < Dimension; gen++) {
AMatrix ta;
generator(gen, ta);
std::cout << GridLogMessage << "Nc = " << ncolour << " t_" << gen
<< std::endl;
std::cout << GridLogMessage << ta << std::endl;
}
}
static void testGenerators(void) {
AMatrix adjTa;
std::cout << GridLogMessage << "Adjoint - Checking if real" << std::endl;
for (int a = 0; a < Dimension; a++) {
generator(a, adjTa);
std::cout << GridLogMessage << a << std::endl;
assert(norm2(adjTa - conjugate(adjTa)) < 1.0e-6);
}
std::cout << GridLogMessage << std::endl;
std::cout << GridLogMessage << "Adjoint - Checking if antisymmetric"
<< std::endl;
for (int a = 0; a < Dimension; a++) {
generator(a, adjTa);
std::cout << GridLogMessage << a << std::endl;
assert(norm2(adjTa + transpose(adjTa)) < 1.0e-6);
}
std::cout << GridLogMessage << std::endl;
}
static void AdjointLieAlgebraMatrix(
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const typename SU<ncolour>::LatticeAlgebraVector &h,
LatticeAdjMatrix &out, Real scale = 1.0) {
conformable(h, out);
GridBase *grid = out._grid;
LatticeAdjMatrix la(grid);
AMatrix iTa;
out = zero;
for (int a = 0; a < Dimension; a++) {
generator(a, iTa);
la = peekColour(h, a) * iTa;
out += la;
}
out *= scale;
}
// Projects the algebra components a lattice matrix (of dimension ncol*ncol -1 )
static void projectOnAlgebra(typename SU<ncolour>::LatticeAlgebraVector &h_out, const LatticeAdjMatrix &in, Real scale = 1.0) {
conformable(h_out, in);
h_out = zero;
AMatrix iTa;
Real coefficient = - 1.0/(ncolour) * scale;// 1/Nc for the normalization of the trace in the adj rep
for (int a = 0; a < Dimension; a++) {
generator(a, iTa);
auto tmp = real(trace(iTa * in)) * coefficient;
pokeColour(h_out, tmp, a);
}
}
// a projector that keeps the generators stored to avoid the overhead of recomputing them
static void projector(typename SU<ncolour>::LatticeAlgebraVector &h_out, const LatticeAdjMatrix &in, Real scale = 1.0) {
conformable(h_out, in);
static std::vector<AMatrix> iTa(Dimension); // to store the generators
h_out = zero;
static bool precalculated = false;
if (!precalculated){
precalculated = true;
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for (int a = 0; a < Dimension; a++) generator(a, iTa[a]);
}
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Real coefficient = -1.0 / (ncolour) * scale; // 1/Nc for the normalization of
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// the trace in the adj rep
for (int a = 0; a < Dimension; a++) {
auto tmp = real(trace(iTa[a] * in)) * coefficient;
pokeColour(h_out, tmp, a);
}
}
};
// Some useful type names
typedef SU_Adjoint<2> SU2Adjoint;
typedef SU_Adjoint<3> SU3Adjoint;
typedef SU_Adjoint<4> SU4Adjoint;
typedef SU_Adjoint<5> SU5Adjoint;
typedef SU_Adjoint<Nc> AdjointMatrices;
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NAMESPACE_END(Grid);
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#endif