A-priori bounds for a quasilinear problem in critical dimension

TL;DR

This paper proves uniform bounds for solutions of a quasilinear PDE with exponential growth nonlinearities in a critical dimension, extending previous results to a broader class of nonlinearities.

Contribution

It generalizes existing a-priori bounds for quasilinear problems to include nonhomogeneous nonlinearities with exponential growth.

Findings

Established uniform a-priori bounds for solutions in critical dimension

Extended bounds to nonlinearities with exponential growth

Completed and enlarged previous theoretical results

Abstract

We establish uniform a-priori bounds for solutions of the quasilinear problem $-\Delta_Nu=f(u)$ in $\Omega$, with $u=0$ on $\partial\Omega$, where $\Omega\subset\mathbb{R}^N$ is a bounded smooth and convex domain, and $f$ is a positive superlinear and subcritical function in the sense of the Trudinger-Moser inequality. The typical growth of $f$ is thus exponential. Finally, a generalization of the result for nonhomogeneous nonlinearities is given. Using a blow-up approach, this paper completes the results in [Damascelli-Pardo, Nonlinear Anal. Real World Appl. 41 (2018)] and [Lorca-Ruf-Ubilla, J. Differential Equations 246 no. 5 (2009)], enlarging the class of nonlinearities for which the uniform a-priori bound applies.