mirror of
https://github.com/triqs/dft_tools
synced 2024-12-26 22:33:48 +01:00
4af1afbdaf
- For users : only change is : H5::H5File in apps. to be replaced by triqs::h5::file, same API. - using only the C API because : - it is cleaner, better documented, more examples. - it is the native hdf5 interface. - simplify the installation e.g. on mac. Indeed, hdf5 is usually installed without C++ interface, which is optional. E.g. EPD et al., brew by default. Also the infamous mpi+ hdf5_cpp bug, for which we have no clean solution. - clean the notion of parent of a group. Not needed, better iterate function in C LT API. - modified doc : no need for C++ bindings any more. - modified cmake to avoid requiring CPP bindings.
96 lines
3.3 KiB
C++
96 lines
3.3 KiB
C++
#define TRIQS_ARRAYS_ENFORCE_BOUNDCHECK
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#include <triqs/gfs.hpp>
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using namespace triqs::gfs;
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using namespace triqs::arrays;
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namespace h5 = triqs::h5;
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#define TEST(X) std::cout << BOOST_PP_STRINGIZE((X)) << " ---> "<< (X) <<std::endl<<std::endl;
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#include <triqs/gfs/local/fourier_real.hpp>
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double lorentzian(double w, double a){
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return 2*a / (w*w + a*a) ;
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};
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std::complex<double> lorentzian_inverse(double t, double a){
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return std::exp(-a*std::abs(t)) ;
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};
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double theta(double x){
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return x>0 ? 1.0 : ( x<0 ? 0.0 : 0.5 ) ;
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};
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int main() {
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double precision=10e-10;
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h5::file file("fourier_real_time.h5",H5F_ACC_TRUNC);
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std::complex<double> I(0,1);
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//Test on the tail: GF in frequency that is a lorentzian, with its singularity, TF and TF^-1.
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double wmax=10;
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int Nw=1001;
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auto Gw1 = gf<refreq> {{-wmax, wmax, Nw,full_bins}, {1,1}};
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double a = Gw1.mesh().delta() * sqrt( Gw1.mesh().size() );
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for(auto const & w:Gw1.mesh()) Gw1[w]=lorentzian(w,a);
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Gw1.singularity()(2)=triqs::arrays::matrix<double>{{2.0*a}};
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h5_write(file,"Gw1",Gw1); // the original lorentzian
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auto Gt1 = make_gf_from_inverse_fourier(Gw1);
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h5_write(file,"Gt1",Gt1); // the lorentzian TF : lorentzian_inverse
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// verification that TF(TF^-1)=Id
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auto Gw1b = make_gf_from_fourier(Gt1);
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for(auto const & w:Gw1b.mesh()){
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Gw1b[w]-=Gw1[w];
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if ( std::abs(Gw1b[w](0,0)) > precision) TRIQS_RUNTIME_ERROR<<" fourier_real_time error : w="<<w<<" ,G1="<<std::abs(Gw1b[w](0,0))<<"\n";
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}
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h5_write(file,"Gw1b",Gw1b); // must be 0
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// verification that TF is the lorentzian_inverse function
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for(auto const & t:Gt1.mesh()){
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Gt1[t]-=lorentzian_inverse(t,a);
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if ( std::abs(Gt1[t](0,0)) > precision) TRIQS_RUNTIME_ERROR<<" fourier_real_time error : t="<<t<<" ,G1="<<std::abs(Gt1[t](0,0))<<"\n";
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}
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h5_write(file,"Gt1b",Gt1); // must be 0
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//Test on the tail: GF in time that is a decreasing exponential
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double tmax=10.;
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int Nt=501;
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auto Gt2 = gf<retime> {{-tmax, tmax, Nt}, {1,1}};
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a = 2*acos(-1.) / ( Gt2.mesh().delta() *sqrt( Gt2.mesh().size() ) );
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for(auto const & t:Gt2.mesh()) Gt2[t] = 0.5 *I * ( lorentzian_inverse(-t,a)*theta(-t)-lorentzian_inverse(t,a)*theta(t) );
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//for(auto const & t:Gt2.mesh()) Gt2[t] = 0.5_j * ( lorentzian_inverse(-t,a)*theta(-t)-lorentzian_inverse(t,a)*theta(t) );
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Gt2.singularity()(1)=triqs::arrays::matrix<double>{{1.0}};
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h5_write(file,"Gt2",Gt2);
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auto Gw2 = make_gf_from_fourier(Gt2);
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h5_write(file,"Gw2",Gw2);
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for(auto const & w:Gw2.mesh()){
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Gw2[w]-= 0.5/(w+a*I)+0.5/(w-a*I);
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//Gw2[w]-= 0.5/(w+a*1_j)+0.5/(w-a*1_j);
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if ( std::abs(Gw2[w](0,0)) > precision) TRIQS_RUNTIME_ERROR<<" fourier_real_time error : w="<<w<<" ,G2="<<std::abs(Gw2[w](0,0))<<"\n";
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}
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h5_write(file,"Gw2b",Gw2);
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//Test : GF in time is a simple trigonometric function, the result is a sum of Dirac functions
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tmax=4*acos(-1.);
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auto Gt3 = gf<retime> {{-tmax, tmax, Nt}, {1,1}};
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for(auto const & t:Gt3.mesh()) Gt3[t] = 1.0 * std::cos(10*t) + 0.25*std::sin(4*t) + 0.5 * I*std::sin(8*t+0.3*acos(-1.)) ;
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//for(auto const & t:Gt3.mesh()) Gt3[t] = 1.0 * std::cos(10*t) + 0.25*std::sin(4*t) + 0.5_j*std::sin(8*t+0.3*acos(-1.)) ;
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h5_write(file,"Gt3",Gt3);
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auto Gw3 = make_gf_from_fourier(Gt3);
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h5_write(file,"Gw3",Gw3);
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}
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