Local and global minimizers for a variational energy involving a fractional norm

Abstract

We study existence, unicity and other geometric properties of the minimizers of the energy functional \|u\|2Hs()+∫ W(u)\,dx, where \|u\|Hs() denotes the total contribution from in the Hs norm of u and W is a double-well potential. We also deal with the solutions of the related fractional elliptic Allen-Cahn equation on the entire space Rn. The results collected here will also be useful for forthcoming papers, where the second and the third author will study the -convergence and the density estimates for level sets of minimizers.