Efficient variational diagonalization of fully many-body localized Hamiltonians
arXiv:1506.07179 · doi:10.1103/PhysRevB.94.041116
Abstract
We introduce a unitary matrix-product operator (UMPO) based variational method that approximately finds all the eigenstates of fully many-body localized (fMBL) one-dimensional Hamiltonians. The computational cost of the variational optimization scales linearly with system size for a fixed bond dimension of the UMPO ansatz. We demonstrate the usefulness of our approach by considering the Heisenberg chain in a strongly disordered magnetic field for which we compare the approximation to exact diagonalization results.
6 pages, 4 figures