Density estimates for a nonlocal variational model via the Sobolev inequality
Abstract
We consider the minimizers of the energy \|u\|Hs()2+∫ W(u)\,dx, with s ∈ (0,1/2), where \|u\|Hs() denotes the total contribution from in the Hs norm of u, and W is a double-well potential. By using a fractional Sobolev inequality, we give a new proof of the fact that the sublevel sets of a minimizer u in a large ball BR occupy a volume comparable with the volume of BR.
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