17faaa9f3f0df9d23790277834d426c3d992ac3baCarlos HernandezGeneralizedEigenSolver<MatrixXf> ges; 27faaa9f3f0df9d23790277834d426c3d992ac3baCarlos HernandezMatrixXf A = MatrixXf::Random(4,4); 37faaa9f3f0df9d23790277834d426c3d992ac3baCarlos HernandezMatrixXf B = MatrixXf::Random(4,4); 47faaa9f3f0df9d23790277834d426c3d992ac3baCarlos Hernandezges.compute(A, B); 57faaa9f3f0df9d23790277834d426c3d992ac3baCarlos Hernandezcout << "The (complex) numerators of the generalzied eigenvalues are: " << ges.alphas().transpose() << endl; 67faaa9f3f0df9d23790277834d426c3d992ac3baCarlos Hernandezcout << "The (real) denominatore of the generalzied eigenvalues are: " << ges.betas().transpose() << endl; 77faaa9f3f0df9d23790277834d426c3d992ac3baCarlos Hernandezcout << "The (complex) generalzied eigenvalues are (alphas./beta): " << ges.eigenvalues().transpose() << endl; 8