A Bourgain-Brezis-Mironescu result for fractional thin films

Abstract

We consider the limit of squared Hs-Gagliardo seminorms on thin domains of the form =ω×(0,) in Rd. When is fixed, multiplying by 1-s such seminorms have been proved to converge as s 1- to a dimensional constant cd times the Dirichlet integral on by Bourgain, Brezis and Mironescu. In its turn such Dirichlet integrals divided by converge as 0 to a dimensionally reduced Dirichlet integral on ω. We prove that if we let simultaneously 0 and s 1 then these squared seminorms still converge to the same dimensionally reduced limit when multiplied by (1-s) 2s-3, independently of the relative converge speed of s and . This coefficient combines the geometrical scaling -1 and the fact that relevant interactions for the Hs-Gagliardo seminorms are those at scale . We also study the usual membrane scaling, obtained by multiplying by (1-s)-1, which highlighs the critical scaling 1-s||-1, and the limit when 0 at fixed s.