arXiv:2205.15785 Abstract | arXiv Analytics

arXiv:2205.15785 [math.PR]Abstract References Reviews Resources

Dynamical Loop Equation

Published 2022-05-31Version 1

We introduce dynamical versions of loop (or Dyson-Schwinger) equations for large families of two--dimensional interacting particle systems, including Dyson Brownian motion, Nonintersecting Bernoulli/Poisson random walks, $\beta$--corners processes, uniform and Jack-deformed measures on Gelfand-Tsetlin patterns, Macdonald processes, and $(q,\kappa)$-distributions on lozenge tilings. Under technical assumptions, we show that the dynamical loop equations lead to Gaussian field type fluctuations. As an application, we compute the limit shape for $(q,\kappa)$--distributions on lozenge tilings and prove that their height fluctuations converge to the Gaussian Free Field in an appropriate complex structure.

Comments: 92 pages, 10 figures

Categories: math.PR, math-ph, math.CO, math.MP

Keywords: dynamical loop equation, lozenge tilings, gaussian field type fluctuations, nonintersecting bernoulli/poisson random walks, dyson brownian motion

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