Fully solvable finite simplex lattices with open boundaries in arbitrary dimensions
Finite simplex lattice models are used in different branches of science, e.g., in condensed-matter physics, when studying frustrated magnetic systems and non-Hermitian localization phenomena; or in chemistry, when describing experiments with mixtures. An n-simplex represents the simplest possible polytope in n dimensions, e.g., a line segment, a triangle, anda tetrahedron in one, two, and three dimensions, respectively. In this work, we show that various fully solvable, in general non-Hermitian, n-simplex lattice models with open boundaries can be constructed from the high-order field-moments space of quadratic bosonic systems. Namely, we demonstrate that such n-simplex lattices can be formed by a dimensional reduction of highly degenerate iterated polytope chains in (k > n)-dimensions, which naturally emerge in the field-moments space. Our findings indicate that the field-moments space of bosonic systems provides a versatile platform for simulating real-space n-simplex lattices exhibiting non-Hermitian phenomena, and it yields valuable insights into the structure of many-body systems exhibiting similar complexity. Among a variety of practical applications, these simplex structures can offer a physical setting for implementing the discrete fractional Fourier transform, an indispensable tool for both quantum and classical signal processing.
WOS:001098159100002
2023-10-26
5
4
043092
REVIEWED
Funder | Grant Number |
Polish National Science Centre (NCN) | DEC- 2019/34/A/ST2/00081 |
Air Force Office of Scientific Research (AFOSR) Multidisciplinary University Research Initiative (MURI) Award on Programmable systems with non -Hermitian quantum dynamics | FA9550-21-1-0202 |
AFOSR Award | FA9550-18-1-0235 |
Nippon Telegraph and Telephone Corporation (NTT) | |
Japan Science and Technology Agency (JST) | JPMJMS2061 |
Asian Office of Aerospace Research and Development (AOARD) | FA2386-20-1- 4069 |
Foundational Questions Institute Fund (FQXi) | FQXi-IAF19-06 |