Small order asymptotics for nonlinear fractional problems
Analysis of PDEs
2022-01-11 v2
Abstract
We study the limiting behavior of solutions to boundary value nonlinear problems involving the fractional Laplacian of order when the parameter tends to zero. In particular, we show that least-energy solutions converge (up to a subsequence) to a nontrivial nonnegative least-energy solution of a limiting problem in terms of the logarithmic Laplacian, i.e., the pseudodifferential operator with Fourier symbol . These results are motivated by some applications of nonlocal models where a small value for the parameter yields the optimal choice. Our approach is based on variational methods, uniform energy-derived estimates, and the use of a new logarithmic-type Sobolev inequality.
Cite
@article{arxiv.2108.00448,
title = {Small order asymptotics for nonlinear fractional problems},
author = {Víctor Hernández-Santamaría and Alberto Saldaña},
journal= {arXiv preprint arXiv:2108.00448},
year = {2022}
}
Comments
Revised version, 27 pages