Effective mass of the Fröhlich Polaron and the Landau-Pekar-Spohn conjecture (2307.13058v2)

Abstract: We prove that there is a constant $\overline C\in (0,\infty)$ such that the effective mass $m(\alpha)$ of the Fr\"ohlich Polaron satisfies $m(\alpha) \geq \overline C \alpha^4$, which is sharp according to a long-standing prediction of Landau-Pekar [19] from 1948 and of Spohn [35] from 1987. The method of proof, which demonstrates how the $\alpha^4$ divergence rate of $m(\alpha)$ appears in a natural way, is based on analyzing the Gaussian representation of the Polaron measure and that of the associated tilted Poisson point process developed in [25], together with an explicit identification of local interval process in the strong coupling limit $\alpha\to\infty$ in terms of functionals of the {\it Pekar variational formula}.}