On the -limit of weighted fractional energies
Abstract
Given p∈[1,∞) and a bounded open set ⊂ Rd with Lipschitz boundary, we study the -convergence of the weighted fractional seminorm \[ [u]s,p,fp = ∫ Rd ∫ Rd |u(x)- u(y)|p\|x-y\|d+sp\,f(x)\,f(y)\,d x\,d y \] as s1- for u∈ Lp(), where u=u on and u=0 on Rd. Assuming that (fs)s∈(0,1)⊂ L∞( Rd;[0,∞)) and f∈Lipb( Rd;(0,∞)) are such that fs f in L∞( Rd) as s1-, we show that (1-s)[u]s,p,fs -converges to the Dirichlet p-energy weighted by f2. In the case p=2, we also prove the convergence of the corresponding gradient flows.
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