Related papers: Spread Complexity and Topological Transitions in the Kitaev Chain

Spread Complexity and Topological Transitions in the Kitaev Chain

URL: http://arxiv.org/abs/2208.06311v2
Date: Wed, 31 Aug 2022 14:19:34 GMT
Title: Spread Complexity and Topological Transitions in the Kitaev Chain
Authors: Pawel Caputa, Nitin Gupta, S. Shajidul Haque, Sinong Liu, Jeff Murugan, Hendrik J.R. Van Zyl
Abstract summary: We use a 1-dimensional p-wave superconductor as a prototype of a system displaying a topological phase transition. The Hamiltonian of the Kitaev chain manifests two gapped phases of matter with fermion parity symmetry. We show that Krylov-complexity is able to distinguish between the two and provides a diagnostic of the quantum critical point that separates them.
Score: 1.4973636284231042
License: http://creativecommons.org/licenses/by/4.0/
Abstract: A number of recent works have argued that quantum complexity, a well-known concept in computer science that has re-emerged recently in the context of the physics of black holes, may be used as an efficient probe of novel phenomena such as quantum chaos and even quantum phase transitions. In this article, we provide further support for the latter, using a 1-dimensional p-wave superconductor - the Kitaev chain - as a prototype of a system displaying a topological phase transition. The Hamiltonian of the Kitaev chain manifests two gapped phases of matter with fermion parity symmetry; a trivial strongly-coupled phase and a topologically non-trivial, weakly-coupled phase with Majorana zero-modes. We show that Krylov-complexity (or, more precisely, the associated spread-complexity) is able to distinguish between the two and provides a diagnostic of the quantum critical point that separates them. We also comment on some possible ambiguity in the existing literature on the sensitivity of different measures of complexity to topological phase transitions.

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