Ground state and nodal solutions for fractional Orlicz problems with lack of regularity and without the Ambrosetti-Rabinowitz condition

Abstract

We consider a non-local Shr\"odinger problem driven by the fractional Orlicz g-Laplace operator as follows equationPP (-g)αu+g(u)=K(x)f(x,u),\ \ in\ Rd,P equation where d≥ 3,\ (-g)α is the fractional Orlicz g-Laplace operator, f:Rd×R→ R is a measurable function and K is a positive continuous function. Employing the Nehari manifold method and without assuming the well-known Ambrosetti-Rabinowitz and differentiability conditions on the non-linear term f, we prove that the problem PP has a ground state of fixed sign and a nodal (or sign-changing) solutions.