Multiple positive solutions to a perturbed Gelfand problem involving mixed local-nonlocal operators and singular nonlinearity

Abstract

We investigate a perturbed Gelfand problem involving a mixed local-nonlocal p-Laplacian operator with singular nonlinearity: equation* aligned -p u + (-p)s u = λ f(u)uβ\ in \ u >0\ in \ ,\ u =0\ in \ RN aligned equation* where ⊂ RN is a smooth bounded domain, λ > 0 is a parameter, 0≤ β <1 and f is a non-decreasing C1-function with f(0)>0. Using the method of sub- and supersolutions, we present a novel multiplicity result and, in specific cases, we also prove a three-solution theorem using Amann's fixed point theorem. Our construction of sub-supersolutions avoids the conventional reliance on ODE techniques and Green's function estimates, thereby making it more adaptable to the nonlinear and nonlocal framework. Additionally, we establish a Hopf-type Strong Comparison Principle for the linear operator with singular nonlinearity, marking the first result of its kind for mixed local-nonlocal operators. This result is crucial in deriving a third solution and holds broader mathematical significance.

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