Related papers: Balls and Walls: A Compact Unary Coding for Bosonic States

Balls and Walls: A Compact Unary Coding for Bosonic States

URL: http://arxiv.org/abs/2109.07508v1
Date: Wed, 15 Sep 2021 18:14:08 GMT
Title: Balls and Walls: A Compact Unary Coding for Bosonic States
Authors: Hatem Barghathi, Caleb Usadi, Micah Beck, Adrian Del Maestro
Abstract summary: We introduce unary coding of bosonic occupation states based on the famous "balls and walls" counting for the number of configurations of $N$ indistinguishable particles on $L$ distinguishable sites. Each state is represented by an integer with a human readable bit that has a compositional structure allowing for the efficient application of operators that locally modify the number of bosons.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We introduce a unary coding of bosonic occupation states based on the famous "balls and walls" counting for the number of configurations of $N$ indistinguishable particles on $L$ distinguishable sites. Each state is represented by an integer with a human readable bit string that has a compositional structure allowing for the efficient application of operators that locally modify the number of bosons. By exploiting translational and inversion symmetries, we identify a speedup factor of order $L$ over current methods when generating the basis states of bosonic lattice models. The unary coding is applied to a one-dimensional Bose-Hubbard Hamiltonian with up to $L=N=20$, and the time needed to generate the ground state block is reduced to a fraction of the diagonalization time. For the ground state symmetry resolved entanglement, we demonstrate that variational approaches restricting the local bosonic Hilbert space could result in an error that scales with system size.

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