A distributional approach to fractional Sobolev spaces and fractional variation: asymptotics I

Abstract

We continue the study of the space BVα(Rn) of functions with bounded fractional variation in Rn of order α∈(0,1) introduced in arXiv:1809.08575, by dealing with the asymptotic behaviour of the fractional operators involved. After some technical improvements of certain results of our previous work, we prove that the fractional α-variation converges to the standard De Giorgi's variation both pointwise and in the -limit sense as α1-. We also prove that the fractional β-variation converges to the fractional α-variation both pointwise and in the -limit sense as βα- for any given α∈(0,1).