Non-Local to Local Eigenbasis Permutations of Pauli Product Diagonal Operators

Abstract

This paper investigates the feasibility of mapping non-local, sparse, diagonal forms of quantum Hamiltonians to local forms via eigenbasis permutations. We prove that such a mapping is not always possible, definitively refuting the "Quasiparticle Locality Conjecture." This refutation is achieved by establishing a lower bound, denoted Gm, on the number of non-zero terms in a localized diagonal form. Remarkably, Gm reaches cosmologically large values, comparable to the entropy of the observable universe for certain localities m. While this theoretically guarantees the conjecture's falsity, the immense scale of Gm motivates us to explore the implications for practically sized systems through a probabilistic approach. We construct a set of random, non-local, sparse, diagonal forms and hypothesize their probability of finding a local representation. Our hypothesize suggests a sharp transition in this probability, linked to the Hamiltonian's sparsity relative to the Bekenstein-Hawking entropy of neutron stars to black holes transition. This observation hints at a potential connection between Hamiltonian sparsity, localizability, critical phenomena warranting further investigation into their interplay in both theoretical and astrophysical contexts.

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