From generalized Poincaré to Poincaré-Sobolev inequalities via self-improving methods

Abstract

We establish several improvements to the main results of [PR19] and [CP21], refining the seminal self-improving method for generalized Poincaré inequalities from [FPW98, MP98]. These results, together with various related applications, stem from a general self-improving property for functions satisfying the local inequality 1|Q|∫Q |f(x)-fQ|\,dx a(Q) for all cubes Q⊂Rn. The functional a is assumed to obey a specific discrete geometric summability condition. By restricting our focus to axis-parallel cubes in Rn, this geometric setting allows us to obtain sharper estimates than those available in more general metric measure spaces.