Closing the gap: Maz'ya-Shaposhnikova and asymptotics of fractional perimeters

Abstract

We prove a generalization of the Maz'ya-Shaposhnikova formula in the case p=2 for functions that may not belong to L2(Rd) and, thus, might not vanish at infinity. By introducing a notion of mass at infinity, we explicitly characterize the limit as s0+ of Gagliardo seminorms localized on a bounded Lipschitz domain . By `localized', we mean here that we account only for interactions involving at least one point in . The identified limiting functional provides a unifying framework to link the classical Maz'ya-Shaposhnikova formula and the asymptotics of nonlocal perimeters. On the one hand, it reduces to the classical L2 norm for functions that are globally integrable on Rd. On the other hand, it recovers the pointwise limit of s-fractional perimeters when evaluated on characteristic functions of sets. We further show that the same functional encodes the asymptotic behavior of Gagliardo seminorms in the sense of Gamma-convergence with respect to the weak-L2 topology. Finally, we provide an extension to the setting of metric measure spaces.