Sharp embeddings and existence results for Logarithmic p-Laplacian equations with critical growth
Abstract
In this paper, we derive a new p-Logarithmic Sobolev inequality and optimal continuous and compact embeddings into Orlicz-type spaces of the function space associated with the logarithmic p-Laplacian. As an application of these results, we study a class of Dirichlet boundary value problems involving the logarithmic p-Laplacian and critical growth nonlinearities perturbed with superlinear-subcritical growth terms. By employing the method of the Nehari manifold, we prove the existence of a nontrivial weak solution. Lastly, we conduct an asymptotic analysis of a weighted nonlocal, nonlinear problem governed by the fractional p-Laplacian with superlinear or sublinear type non-linearity, demonstrating the convergence of least energy solutions to a non-trivial, non-negative least energy solution of a Brezis-Nirenberg type or logistic-type problem, respectively, involving the logarithmic p-Laplacian as the fractional parameter s 0+. The findings in this work serve as a nonlinear analogue of the results reported in Angeles-Saldana, Arora-Giacomoni-Vaishnavi, Santamaria-Saldana, thereby extending their scope to a broader variational framework.
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