Toric non-archimedean μ-entropy and thermodynamical structure

Abstract

We study non-archimedean μ-entropy for toric variety as a further exploration of μK-stability. We show the existence of optimizer of toric non-archimedean μλ-entropy for λ ∈ R and the uniqueness for λ 0. For the proof of existence, we establish a Rellich type compactness result for convex functions on simple polytope. We also reveal a thermodynamical structure on toric non-archimedean μ-entropy. This observation allows us to interpret the enigmatic parameter T = - λ2π as temperature and non-archimedean μ-entropy as entropy of an infinite dimensional composite system.