Sharp conditions for the BBM formula and asymptotics of heat content-type energies

Abstract

Given p∈[1,∞), we provide sufficient and necessary conditions on the non-negative measurable kernels (t)t∈(0,1) ensuring convergence of the associated Bourgain-Brezis-Mironescu (BBM) energies (Ft,p)t∈(0,1) to a variant of the p-Dirichlet energy on RN as t0+ both in the pointwise and in the -sense. We also devise sufficient conditions on (t)t∈(0,1) yielding local compactness in Lp( RN) of sequences with bounded BBM energy. Moreover, we give sufficient conditions on (t)t∈(0,1) implying pointwise and -convergence and compactness of (Ft,p)t∈(0,1) when the limit p-energy is of non-local type. Finally, we apply our results to provide asymptotic formulas in the pointwise and -sense for heat content-type energies both in the local and non-local settings.

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