Radial quasilinear elliptic problems with singular or vanishing potentials

TL;DR

This paper extends previous work on radial quasilinear elliptic equations with singular or vanishing potentials, establishing existence of solutions using variational methods and analyzing embedding compactness for a broader range of nonlinearities.

Contribution

It introduces new hypotheses on the potential functions and broadens the range of nonlinear exponents for which existence results are proven.

Findings

Existence of nonnegative solutions under new conditions.

Broader range of nonlinear exponents $q_1, q_2$ for solution existence.

Enhanced understanding of embedding compactness in singular/vanishing potential settings.

Abstract

In this paper we continue the work that we began in arXiv:1912.07537. Given $1<p<N$, two measurable functions $V\left(r \right)\geq 0$ and $K\left(r\right)> 0$, and a continuous function $A(r) >0\ (r>0)$, we consider the quasilinear elliptic equation \[ -\mathrm{div}\left(A(|x| )|\nabla u|^{p-2} \nabla u\right) +V\left( \left| x\right| \right) |u|^{p-2}u= K(|x|) f(u) \quad \text{in }\mathbb{R}^{N}, \] where all the potentials $A,V,K$ may be singular or vanishing, at the origin or at infinity. We find existence of nonnegative solutions by the application of variational methods, for which we need to study the compactness of the embedding of a suitable function space $X$ into the sum of Lebesgue spaces $L_{K}^{q_{1}}+L_{K}^{q_{2}}$. The nonlinearity has a double-power super $p$-linear behavior, as $f(t)= \min \left\{ t^{q_1 -1}, t^{q_2 -1} \right\}$ with $q_1,q_2>p$ (recovering the power case if $q_1=q_2$). With respect to \cite{AVK_I}, in the present paper we assume some more hypotheses on $V$, and we are able to enlarge the set of values $q_1 , q_2$ for which we get existence results.