Generalized Random Energy Model at Complex Temperatures

Abstract

Motivated by the Lee--Yang approach to phase transitions, we study the partition function of the Generalized Random Energy Model (GREM) at complex inverse temperature β. We compute the limiting log-partition function and describe the fluctuations of the partition function. For the GREM with d levels, in total, there are 12 (d+1)(d+2) phases, each of which can symbolically be encoded as Gd1Fd2Ed3 with d1,d2,d3∈N0 such that d1+d2+d3=d. In phase Gd1Fd2Ed3, the first d1 levels (counting from the root of the GREM tree) are in the glassy phase (G), the next d2 levels are dominated by fluctuations (F), and the last d3 levels are dominated by the expectation (E). Only the phases of the form Gd1Ed3 intersect the real β axis. We describe the limiting distribution of the zeros of the partition function in the complex β plane (= Fisher zeros). It turns out that the complex zeros densely touch the positive real axis at d points at which the GREM is known to undergo phase transitions. Our results confirm rigorously and considerably extend the replica-method predictions from the physics literature.