Power-law asymptotics of fractional Lp polar projection bodies

Abstract

The notion of s--fractional Lp polar projection bodies, recently introduced by Haddad and Ludwig (Math.\ Ann.\ 388:1091--1115, 2024), provides a bridge between fractional Sobolev theory and convex geometry. In this manuscript, we study the limit of their Minkowski gauges under two natural asymptotic regimes: \\ *3em (a) first sending p ∞ and then s 1-; \\ *3em (b) first sending s 1- and then p ∞. \\ Our main result shows that these two limiting processes commute. As a consequence, we derive precise asymptotic behavior for the associated volumes and dual mixed volumes, thereby linking the (fractional) Lp polar projection bodies to the newly introduced (fractional) L∞ polar projection bodies. These results further yield new geometric inequalities, including endpoint Lipschitz/H\"older isoperimetric--type and variants of P\'olya--Szego inequalities in the L∞ setting.