Related papers: Multicriticality in stochastic dynamics protected by self-duality

Multicriticality in stochastic dynamics protected by self-duality

URL: http://arxiv.org/abs/2504.01258v1
Date: Wed, 02 Apr 2025 00:10:57 GMT
Title: Multicriticality in stochastic dynamics protected by self-duality
Authors: Konstantinos Sfairopoulos, Luke Causer, Juan P. Garrahan,
Abstract summary: We study the large dynamical deviations (LD) of a class of one-dimensional kinetically constrained models.<n>We consider four representative models in detail: the domain-wall (DW) Fredrickson-Andersen (FA), the DW East, the ZZZ-FA, and the XOR-FA models.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We study the dynamical large deviations (LD) of a class of one-dimensional kinetically constrained models whose (tilted) generators can be mapped into themselves via duality transformations. We consider four representative models in detail: the domain-wall (DW) Fredrickson-Andersen (FA), the DW East, the ZZZ-FA, and the XOR-FA models. Using numerical tensor networks, we build the LD phase diagrams of these models in terms of the softness of the constraint and the counting field conjugate to the dynamical activity. In all cases, we find distinct dynamical phases separated by phase transitions along the self-dual lines, revealing the presence of multi-critical points that delimit first-order from continuous active-inactive transitions. We discuss connections to supersymmetry and possible extensions to higher spin and space dimensions.

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