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Main Authors: Husson, Jonathan, Mazzuca, Guido, Occelli, Alessandra
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.23164
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author Husson, Jonathan
Mazzuca, Guido
Occelli, Alessandra
author_facet Husson, Jonathan
Mazzuca, Guido
Occelli, Alessandra
contents In this paper, we study the asymptotic behaviour of plane partitions distributed according to a $q^{\text{Volume}}$-weighted Muttalib--Borodin ensemble and its associated discrete point process. We establish a Large Deviation Principle for the process, explicitly characterizing the rate function. A defining feature of our model is the emergence of a strict upper bound on the macroscopic particle density, which translates the asymptotic analysis into a non-trivial constrained minimization problem. Through a rigorous Riemann--Hilbert analysis, we derive exact, closed-form formulas for the limit shape of the partitions across all parameter regimes. To the best of our knowledge, this represents the first time a constrained Riemann--Hilbert problem has been formulated and analytically solved for a bi-orthogonal ensemble. Our analysis allows to track the system through a macroscopic phase transition, computing the minimizer in both the subcritical and supercritical regimes. As a byproduct of our analysis, we obtain an explicit expression for the arctic curve that separates the ``frozen'' and ``liquid'' regions of the limit shape. Furthermore, we reveal that the equilibrium measure exhibits a continuously varying exponent at the hard edge departing from the universal fixed exponents typically observed in classical random matrix theory.
format Preprint
id arxiv_https___arxiv_org_abs_2505_23164
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Discrete and Continuous Muttalib--Borodin Process: Large Deviations and Limit Shape Analysis
Husson, Jonathan
Mazzuca, Guido
Occelli, Alessandra
Probability
Mathematical Physics
Complex Variables
60F10, 34M50
In this paper, we study the asymptotic behaviour of plane partitions distributed according to a $q^{\text{Volume}}$-weighted Muttalib--Borodin ensemble and its associated discrete point process. We establish a Large Deviation Principle for the process, explicitly characterizing the rate function. A defining feature of our model is the emergence of a strict upper bound on the macroscopic particle density, which translates the asymptotic analysis into a non-trivial constrained minimization problem. Through a rigorous Riemann--Hilbert analysis, we derive exact, closed-form formulas for the limit shape of the partitions across all parameter regimes. To the best of our knowledge, this represents the first time a constrained Riemann--Hilbert problem has been formulated and analytically solved for a bi-orthogonal ensemble. Our analysis allows to track the system through a macroscopic phase transition, computing the minimizer in both the subcritical and supercritical regimes. As a byproduct of our analysis, we obtain an explicit expression for the arctic curve that separates the ``frozen'' and ``liquid'' regions of the limit shape. Furthermore, we reveal that the equilibrium measure exhibits a continuously varying exponent at the hard edge departing from the universal fixed exponents typically observed in classical random matrix theory.
title Discrete and Continuous Muttalib--Borodin Process: Large Deviations and Limit Shape Analysis
topic Probability
Mathematical Physics
Complex Variables
60F10, 34M50
url https://arxiv.org/abs/2505.23164