Existence and regularity for a p-Laplacian problem in ℝ
 N
 with singular, convective, and critical reaction

doi:10.1515/anona-2024-0033

DOI: 10.1515/anona-2024-0033 ISSN: 2191-950X

Existence and regularity for a p-Laplacian problem in ℝ^N with singular, convective, and critical reaction

Laura Baldelli, Umberto Guarnotta

Abstract

We prove an existence result for a p-Laplacian problem set in the whole Euclidean space and exhibiting a critical term perturbed by a singular, convective reaction. The approach used combines variational methods, truncation techniques, and concentration compactness arguments, together with set-valued analysis and fixed point theory. De Giorgi’s technique, a priori gradient estimates, and nonlinear regularity theory are employed to obtain local

C 1 , α

{C}^{1,\alpha }

regularity of solutions, as well as their pointwise decay at infinity. The result is new even in the non-singular case, also for the Laplacian.

Outline

Existence and regularity for a p-Laplacian problem in ℝ^N with singular, convective, and critical reaction

Abstract

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Existence and regularity for a p-Laplacian problem in ℝ N with singular, convective, and critical reaction

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Existence and regularity for a p-Laplacian problem in ℝ^N with singular, convective, and critical reaction