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Main Authors: Baker, Thomas E., Seif, Negar
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2409.02362
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author Baker, Thomas E.
Seif, Negar
author_facet Baker, Thomas E.
Seif, Negar
contents We consider a set of density matrices. All of which are written in the same orbital basis, but the orbital basis size is less than the total Hilbert space size. We ask how each density matrix is related to each of the others by establishing a norm between density matrices based on the truncation error in a partial trace for a small set of orbitals. We find that states with large energy differences must have large differences in their density matrices. Small energy differences are divided into two groups, one where two density matrices have small differences and another where they are very different, as is the case of symmetry. We extend these ideas to a bundle of matrix product states and show that bond dimension of the wavefunction ansatz for two states with large energy differences are larger. Meanwhile, low energy differences can have nearly the same bond dimensions for similar states.
format Preprint
id arxiv_https___arxiv_org_abs_2409_02362
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Bundled matrix product states represent low-energy excitations faithfully
Baker, Thomas E.
Seif, Negar
Quantum Physics
We consider a set of density matrices. All of which are written in the same orbital basis, but the orbital basis size is less than the total Hilbert space size. We ask how each density matrix is related to each of the others by establishing a norm between density matrices based on the truncation error in a partial trace for a small set of orbitals. We find that states with large energy differences must have large differences in their density matrices. Small energy differences are divided into two groups, one where two density matrices have small differences and another where they are very different, as is the case of symmetry. We extend these ideas to a bundle of matrix product states and show that bond dimension of the wavefunction ansatz for two states with large energy differences are larger. Meanwhile, low energy differences can have nearly the same bond dimensions for similar states.
title Bundled matrix product states represent low-energy excitations faithfully
topic Quantum Physics
url https://arxiv.org/abs/2409.02362