Krylov complexity and orthogonal polynomials

Wolfgang Mück; Yi Yang

Nuclear Physics B (Nov 2022)

Krylov complexity and orthogonal polynomials

Wolfgang Mück,
Yi Yang

Affiliations

Wolfgang Mück: Dipartimento di Fisica “Ettore Pancini”, Università degli Studi di Napoli “Federico II”, Via Cintia, 80126 Napoli, Italy; Istituto Nazionale di Fisica Nucleare, Sezione di Napoli, Via Cintia, 80126 Napoli, Italy; Corresponding author at: Dipartimento di Fisica “Ettore Pancini”, Università degli Studi di Napoli “Federico II”, Via Cintia, 80126 Napoli, Italy.
Yi Yang: Department of Electrophysics, National Yang Ming Chiao Tung University, Hsinchu, Republic of China; Center for Theoretical and Computational Physics, National Yang Ming Chiao Tung University, Hsinchu, Republic of China; National Center for Theoretical Physics, Republic of China

Journal volume & issue: Vol. 984
p. 115948

Abstract

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Krylov complexity measures operator growth with respect to a basis, which is adapted to the Heisenberg time evolution. The construction of that basis relies on the Lanczos algorithm, also known as the recursion method. The mathematics of Krylov complexity can be described in terms of orthogonal polynomials. We provide a pedagogical introduction to the subject and work out analytically a number of examples involving the classical orthogonal polynomials, polynomials of the Hahn class, and the Tricomi-Carlitz polynomials.

Published in Nuclear Physics B

ISSN: 0550-3213 (Print); 1873-1562 (Online)
Publisher: Elsevier
Country of publisher: Netherlands
LCC subjects: Science: Physics: Nuclear and particle physics. Atomic energy. Radioactivity
Website: https://www.sciencedirect.com/journal/nuclear-physics-b

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