# Parabolic equations with natural growth approximated by nonlocal   equations

**Authors:** Tommaso Leonori, Alexis Molino, Sergio Segura de Le\'on

arXiv: 1703.00252 · 2019-12-30

## TL;DR

This paper investigates solutions to nonlocal parabolic equations with natural growth, establishing existence, uniqueness, and asymptotic behavior, and demonstrating convergence to the KPZ equation under kernel rescaling.

## Contribution

It introduces a novel analysis of nonlocal equations with natural growth terms and proves convergence to the KPZ equation as the kernel scales.

## Key findings

- Existence and uniqueness of solutions are established.
- Comparison principle and asymptotic behavior are analyzed.
- Solutions converge to the KPZ equation under kernel rescaling.

## Abstract

In this paper we study several aspects related with solutions of nonlocal problems whose prototype is $$ u_t =\displaystyle \int_{\mathbb{R}^N} J(x-y) \big( u(y,t) -u(x,t) \big) \mathcal G\big( u(y,t) -u(x,t) \big) dy \qquad \mbox{ in } \, \Omega \times (0,T)\,, $$ being $ u (x,t)=0 \mbox{ in } (\mathbb{R}^N\setminus \Omega )\times (0,T)\,$ and $ u(x,0)=u_0 (x) \mbox{ in } \Omega$. We take, as the most important instance, $\mathcal G (s) \sim 1+ \frac{\mu}{2} \frac{s}{1+\mu^2 s^2 }$ with $\mu\in \mathbb{R}$ as well as $u_0 \in L^1 (\Omega)$, $J$ is a smooth symmetric function with compact support and $\Omega$ is either a bounded smooth subset of $\mathbb{R}^N$, with nonlocal Dirichlet boundary condition, or $\mathbb{R}^N$ itself.   The results deal with existence, uniqueness, comparison principle and asymptotic behavior. Moreover we prove that if the kernel rescales in a suitable way, the unique solution of the above problem converges to a solution of the deterministic Kardar-Parisi-Zhang equation.

## Full text

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## References

18 references — full list in the complete paper: https://tomesphere.com/paper/1703.00252/full.md

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Source: https://tomesphere.com/paper/1703.00252