A Strictly Single-Site DMRG Algorithm with Subspace Expansion
Abstract
We introduce a strictly single-site DMRG algorithm based on the subspace expansion of the Alternating Minimal Energy (AMEn) method. The proposed new MPS basis enrichment method is sufficient to avoid local minima during the optimisation, similarly to the density matrix perturbation method, but computationally cheaper. Each application of to in the central eigensolver is reduced in cost for a speed-up of , with the physical site dimension. Further speed-ups result from cheaper auxiliary calculations and an often greatly improved convergence behaviour. Runtime to convergence improves by up to a factor of 2.5 on the Fermi-Hubbard model compared to the previous single-site method and by up to a factor of 3.9 compared to two-site DMRG. The method is compatible with real-space parallelisation and non-abelian symmetries.
Cite
@article{arxiv.1501.05504,
title = {A Strictly Single-Site DMRG Algorithm with Subspace Expansion},
author = {Claudius Hubig and Ian P. McCulloch and Ulrich Schollwöck and F. Alexander Wolf},
journal= {arXiv preprint arXiv:1501.05504},
year = {2015}
}
Comments
9 pages, 6 figures; added comparison with two-site DMRG