# Asymptotic behavior of solutions of a k-Hessian evolution equation

**Authors:** Justino S\'anchez

arXiv: 1812.03207 · 2018-12-11

## TL;DR

This paper investigates the long-term behavior of solutions to the $k$-Hessian evolution equation, constructing special solutions that describe asymptotics and introducing new self-similar solutions called $k$-Barenblatt solutions.

## Contribution

It develops a detailed analysis of the asymptotic behavior of solutions and introduces a new class of explicit, radially symmetric self-similar solutions for the $k$-Hessian evolution equation.

## Key findings

- Long-time solutions are described by a separable special solution.
- Introduces $k$-Barenblatt solutions with properties similar to classical Barenblatt solutions.
- Provides explicit self-similar solutions on the entire space.

## Abstract

We study the long-time behavior of solutions of the $k$-Hessian evolution equation $u_t=S_{k}(D^2 u)$, posed on a bounded domain of the $n$-dimensional space with homogeneous boundary conditions. To this end, we construct a separable solution and we show that the long-time behavior of $u$ is precisely described by this special solution. Further, we initiate the study of that dynamic phenomenon on the entire space, providing a new class of explicit and radially symmetric self-similar solutions that we call $k$-Barenblatt solutions. These solutions present some common properties as those of well-known Barenblatt solutions for the porous media equation and the $p$-Laplacian equation. It is known that self-similar solutions are important in describing the intermediate asymptotic behavior of general solutions.

## Full text

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## References

25 references — full list in the complete paper: https://tomesphere.com/paper/1812.03207/full.md

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Source: https://tomesphere.com/paper/1812.03207