Critical fluctuations of last passage percolation with thick boundaries

TL;DR

This paper proves a conjecture about the limit fluctuations in exponential last passage percolation with thick boundaries, explicitly characterizing the distribution and connecting it to the KPZ fixed point and Baik--Rains distribution.

Contribution

It confirms the predicted limit distribution in a critical regime of LPP with thick boundaries and provides an explicit Fredholm determinant representation.

Findings

Proves the conjecture about the limit distribution in the critical regime.

Derives an explicit variational formula for the KPZ fixed point with new initial conditions.

Introduces a novel generalization of the Baik--Rains distribution.

Abstract

We consider the exponential last passage percolation (LPP) with thick two-sided boundary that consists of a few inhomogeneous columns and rows. Ben Arous and Corwin previously studied the limit fluctuations in this model except in a critical regime, for which they predicted that the limit distribution exists and depends only on the most dominant columns and rows. In this article, we prove their conjecture and identify the limit distribution explicitly in terms of a Fredholm determinant of a $2 \times 2$ matrix kernel. This result leads in particular to an explicit variational formula for the one-point marginal of the KPZ fixed point for a new class of initial conditions. Our limit distribution is also a novel generalization of and provides a new numerically efficient representation for the Baik--Rains distribution.