Infinitely many small solutions to an elliptic PDE of variable exponent with a singular nonlinearity

Abstract

We prove the existence of infinitely many nonnegative solutions to the following nonlocal elliptic partial differential equation involving singularities align (-)p(·)s u&=λ|u|γ(x)-1u+f(x,u)~in~, u&=0~in~RN, align where ⊂RN,\, N≥2 is a smooth, bounded domain, λ>0, s∈ (0,1), γ(x)∈(0,1) for all x∈, N>sp(x,y) for all (x,y)∈× and (-)p(·)s is the fractional p(·)-Laplacian operator with variable exponent. The nonlinear function f satisfies certain growth conditions. Moreover, we establish a uniform L∞() estimate of the solution(s) by the Moser iteration technique.