Maximal free energy of the log-gamma polymer

Abstract

We prove a phase transition for the law of large numbers and fluctuations of FN, the maximum of the free energy of the log-gamma directed polymer with parameter θ, maximized over all possible starting and ending points in an N× N square. In particular, we find an explicit critical value θc=2-1(0)>0 ( is the digamma function) such that: 1. For θ<θc, FN+2(θ/2)N has order N1/3 GUE Tracy-Widom fluctuations. 2. For θ=θc, FN= (N1/3( N)2/3). 3. For θ>θc, FN=( N). Using a connection between the log-gamma polymer and a certain random operator on the honeycomb lattice, recently found by Kotowski and Vir\'ag (Commun. Math. Phys. 370, 2019), we deduce a similar phase transition for the asymptotic behavior of the smallest positive eigenvalue of the aforementioned random operator.