Quasilinear nonlocal elliptic problems with prescribed norm in the Lp-subcritical and Lp-critical growth

Abstract

It is established existence of solution with prescribed Lp norm for the following nonlocal elliptic problem: equation* \arraycc (-)sp u\ +\ V (x) |u|p-2u\ = λ |u|p - 2u + β|u|q-2u\ in\ RN, \|u\|pp = mp,\ u ∈ Ws, p(RN). array. equation* where s ∈ (0,1), sp < N, β > 0 and q ∈ (p, ps] where ps =p+ sp2/N. The main feature here is to consider Lp-subcritical and Lp-critical cases. Furthermore, we work with a huge class of potentials V taking into account periodic potentials, asymptotically periodic potentials, and coercive potentials. More precisely, we ensure the existence of a solution of the prescribed norm for the periodic and asymptotically periodic potential V in the Lp-subcritical regime. Furthermore, for the Lp critical case, our main problem admits also a solution with a prescribed norm for each β > 0 small enough.

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