1c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan KamathMatrixXd A = MatrixXd::Random(6,6); 2c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathcout << "Here is a random 6x6 matrix, A:" << endl << A << endl << endl; 3c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath 4c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan KamathEigenSolver<MatrixXd> es(A); 5c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathcout << "The eigenvalues of A are:" << endl << es.eigenvalues() << endl; 6c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathcout << "The matrix of eigenvectors, V, is:" << endl << es.eigenvectors() << endl << endl; 7c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath 8c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathcomplex<double> lambda = es.eigenvalues()[0]; 9c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathcout << "Consider the first eigenvalue, lambda = " << lambda << endl; 10c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan KamathVectorXcd v = es.eigenvectors().col(0); 11c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathcout << "If v is the corresponding eigenvector, then lambda * v = " << endl << lambda * v << endl; 12c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathcout << "... and A * v = " << endl << A.cast<complex<double> >() * v << endl << endl; 13c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamath 14c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan KamathMatrixXcd D = es.eigenvalues().asDiagonal(); 15c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan KamathMatrixXcd V = es.eigenvectors(); 16c981c48f5bc9aefeffc0bcb0cc3934c2fae179ddNarayan Kamathcout << "Finally, V * D * V^(-1) = " << endl << V * D * V.inverse() << endl; 17