Local compactness and nonvanishing for weakly singular nonlocal quadratic forms

Abstract

In this work we study a class of nonlocal quadratic forms given by \[ Ej(u,v)=12∫RN∫RN(u(x)-u(y))(v(x)-v(y))j(x-y)\ dxdy, \] where j:RN[0,∞] is a measurable even function with \1,|·|2\j∈ L1(RN). Assuming merely j L1(RN), we show local compactness of the embedding Dj(RN) L2(RN), where Dj(RN) denotes the space of functions u∈ L2(RN) with Ej(u,u)<∞. Using this local compactness, we establish an alternative which allows to distinguish vanishing and nonvanishing of bounded sequences in Dj(RN). As an application, we show the existence of maximizers for a class of integral functionals defined on the unit sphere in Dj(RN). Our main results extend to cylindrical unbounded sets of the type = U × Rk, where U ⊂ RN-k is open and bounded. Finally, we note that a Poincar\'e inequality associated with Ej holds for unbounded domains of this type, thereby extending previously known results for bounded domains.