Universally non-diverging Gr\"uneisen parameter at critical points

Abstract

According to Boltzmann-Gibbs (BG) statistical mechanics, the thermodynamic response, such as the isothermal susceptibility, at critical points (CPs) presents a divergent-like behavior. An appropriate parameter to probe both classical and quantum CPs is the so-called Gr\"uneisen ratio . Motivated by the results reported in Phys. Rev. B 108, L140403 (2023), we extend the quantum version of to the non-additive q-entropy Sq. Our findings indicate that using Sq at the unique value of q restoring the extensivity of the entropy, is universally non-diverging at CPs. We unprecedentedly introduce in terms of Sq, being BG recovered for q → 1. We thus solve a long-standing problem related to the illusory diverging susceptibilities at CPs.