English

Nonlocal nonlinear diffusion equations. Smoothing effects, Green functions, and functional inequalities

Analysis of PDEs 2023-02-03 v2

Abstract

We establish boundedness estimates for solutions of generalized porous medium equations of the form tu+(L)[um]=0in RN×(0,T), \partial_t u+(-\mathfrak{L})[u^m]=0\quad\quad\text{in $\mathbb{R}^N\times(0,T)$}, where m1m\geq1 and L-\mathfrak{L} is a linear, symmetric, and nonnegative operator. The wide class of operators we consider includes, but is not limited to, L\'evy operators. Our quantitative estimates take the form of precise L1L^1--LL^\infty-smoothing effects and absolute bounds, and their proofs are based on the interplay between a dual formulation of the problem and estimates on the Green function of L-\mathfrak{L} and ILI-\mathfrak{L}. In the linear case m=1m=1, it is well-known that the L1L^1--LL^\infty-smoothing effect, or ultracontractivity, is equivalent to Nash inequalities. This is also equivalent to heat kernel estimates, which imply the Green function estimates that represent a key ingredient in our techniques. We establish a similar scenario in the nonlinear setting m>1m>1. First, we can show that operators for which ultracontractivity holds, also provide L1L^1--LL^\infty-smoothing effects in the nonlinear case. The converse implication is not true in general. A counterexample is given by 00-order L\'evy operators like L=IJ-\mathfrak{L}=I-J\ast. They do not regularize when m=1m=1, but we show that surprisingly enough they do so when m>1m>1, due to the convex nonlinearity. This reveals a striking property of nonlinear equations: the nonlinearity allows for better regularizing properties, almost independently of the linear operator. Finally, we show that smoothing effects, both linear and nonlinear, imply families of inequalities of Gagliardo-Nirenberg-Sobolev type, and we explore equivalences both in the linear and nonlinear settings through the application of the Moser iteration.

Keywords

Cite

@article{arxiv.2205.06850,
  title  = {Nonlocal nonlinear diffusion equations. Smoothing effects, Green functions, and functional inequalities},
  author = {Matteo Bonforte and Jørgen Endal},
  journal= {arXiv preprint arXiv:2205.06850},
  year   = {2023}
}

Comments

73 pages, 5 figures. v2: Updated according to the referee's suggestions. To appear in "Journal of Functional Analysis"

R2 v1 2026-06-24T11:16:57.051Z