Dimension reduction of fractional Sobolev seminorms on thin domains
Abstract
We study the asymptotic behaviour of Gagliardo seminorms in Hs defined on thin films =ω×(0,). The first relevant order is 1-2s, at which the corresponding limit captures the vertical fractional oscillations through one-dimensional sections. The second relevant order produces dimension-reduction regimes that undergo a qualitative transition at the critical exponent s=12. For s<12, the dominant contribution is driven by interactions at finite planar distance, and the dimension-reduction scale is 2. In this regime, the limit is a lower-dimensional fractional energy with an effective gain of 12 in the differentiability index. At the critical exponent s=1/2, the dimension-reduction scale is 2||, and the limit is local, with dominant interactions at scales between and 1, producing a Dirichlet-type limit on ω. For s>12, the dominant contribution is instead driven by interactions at distances of order , the dimension-reduction scale is 3-2s, and the second-order -limit is still local. We also study the case s=s 1-, showing a Bourgain--Brezis--Mironescu-type result.
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