Fully anisotropic elliptic problems with minimally integrable data
Abstract
We investigate nonlinear elliptic Dirichlet problems whose growth is driven by a general anisotropic -function, which is not necessarily of power type and need not satisfy the nor the -condition. Fully anisotropic, non-reflexive Orlicz-Sobolev spaces provide a natural functional framework associated with these problems. Minimal integrability assumptions are detected on the datum on the right-hand side of the equation ensuring existence and uniqueness of weak solutions. When merely integrable, or even measure, data are allowed, existence of suitably further generalized solutions - in the approximable sense - is established. Their maximal regularity in Marcinkiewicz-type spaces is exhibited as well. Uniqueness of approximable solutions is also proved in case of -data.
Cite
@article{arxiv.1903.00751,
title = {Fully anisotropic elliptic problems with minimally integrable data},
author = {Angela Alberico and Iwona Chlebicka and Andrea Cianchi and Anna Zatorska-Goldstein},
journal= {arXiv preprint arXiv:1903.00751},
year = {2019}
}