Open AccessLimit distributions for KPZ growth models with spatially homogeneous random initial conditions
Author(s) -
Sunil Chhita,
Patrik L. Ferrari,
Herbert Spohn
Publication year - 2018
Publication title -
the annals of applied probability
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.878
H-Index - 86
eISSN - 2168-8737
pISSN - 1050-5164
DOI - 10.1214/17-aap1338
Subject(s) - mathematics , statistical physics , limit (mathematics) , connection (principal bundle) , vertex (graph theory) , mathematical analysis , homogeneous , geometry , combinatorics , physics , graph
For stationary KPZ growth in 1+1 dimensions, the height fluctuations are governed by the Baik–Rains distribution. Using the totally asymmetric single step growth model, alias TASEP, we investigate height fluctuations for a general class of spatially homogeneous random initial conditions. We prove that for TASEP there is a one-parameter family of limit distributions, labeled by the diffusion coefficient of the initial conditions. The distributions are defined through a variational formula. We use Monte Carlo simulations to obtain their numerical plots. Also discussed is the connection to the six-vertex model at its conical point.
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