Related papers: Zipping many-body quantum states: a scalable approach to diagonal entropy

Zipping many-body quantum states: a scalable approach to diagonal entropy

URL: http://arxiv.org/abs/2502.18898v1
Date: Wed, 26 Feb 2025 07:24:47 GMT
Title: Zipping many-body quantum states: a scalable approach to diagonal entropy
Authors: Yu-Hsueh Chen, Tarun Grover,
Abstract summary: We explore using the Lempel-Ziv lossless image compression algorithm as an efficient, scalable alternative to a brute-force tomographic approach.<n>We test this approach on several examples: one-dimensional quantum Ising model, and two-dimensional states that display conventional symmetry breaking.<n>We also analyze the singular part of the diagonal entropy density using renormalization group on a replicated action.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: The outcomes of projective measurements on a quantum many-body system in a chosen basis are inherently probabilistic. The Shannon entropy of this probability distribution (the "diagonal entropy") often reveals universal features, such as the existence of a quantum phase transition. A brute-force tomographic approach to estimating this entropy scales exponentially with the system size. Here, we explore using the Lempel-Ziv lossless image compression algorithm as an efficient, scalable alternative, readily implementable in a quantum gas microscope or programmable quantum devices. We test this approach on several examples: one-dimensional quantum Ising model, and two-dimensional states that display conventional symmetry breaking due to quantum fluctuations, or strong-to-weak symmetry-breaking due to local decoherence. We also employ the diagonal mixed state to put constraints on the phase boundaries of our models. In all examples, the compression method accurately recovers the entropy density while requiring at most polynomially many images. We also analyze the singular part of the diagonal entropy density using renormalization group on a replicated action. In the 1+1-D quantum Ising model, we find that it scales as $|t| \log|t|$, where $t$ is the deviation from the critical point, while in a 2+1-D state with amplitudes proportional to the Boltzmann weight of the 2D Ising model, it follows a $t^2 \log|t|$ scaling.

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