Multiplicity of solutions to a class of degenerate elliptic equations in both sub-critical and critical cases

Abstract

Given a smooth, bounded domain Ω⊂RN, we establish the existence of two non-trivial, non-negative solutions to the semilinear degenerate elliptic equation align* . arrayl -Δλu=μg(z)|u|r-1u+h(z)|u|s-1u \;in\; Ω u∈ H1,λ0(Ω) array\ align* where Δλ=Δx+|x|2λΔy denotes the Grushin Laplacian Operator, z=(x,y)∈Ω, N=n+m;\, n,\, m≥ 1, λ>0, 0≤ r<1<s<2*λ-1 and μ is a positive parameter. The functions g and h may change sign and 2*λ=2QQ-2 is the critical Sobolev exponent associated with the homogeneous dimension Q=n+(1+λ)m of Δλ. In the critical case s=2*λ-1, we further show that the problem admits at least two non-trivial, non-negative solutions under the additional assumptions g≥ 0 and h 1.