# Uniform boundedness for weak solutions of quasilinear parabolic   equations

**Authors:** Karthik Adimurthi, Sukjung Hwang

arXiv: 1901.01693 · 2019-01-08

## TL;DR

This paper establishes uniform boundedness of weak solutions to a class of quasilinear parabolic equations modeled after the p-Laplace operator, covering the entire range of p without splitting into singular or degenerate cases.

## Contribution

It proves the boundedness of weak solutions for all p in rac{2N}{N+2}, \u00f7 rac{2N}{N+1} and rac{2N}{N+2},  without separate treatment of singular and degenerate regimes.

## Key findings

- Weak solutions are bounded for rac{2N}{N+2} < p < .
- Improved boundedness estimates are obtained for rac{2N}{N+1} < p < .
- The proof avoids blow-up exponents near p=2.

## Abstract

In this paper, we study the boundedness of weak solutions to quasilinear parabolic equations of the form \[u_t - \text{div} \mathcal{A}(x,t,\nabla u) = 0, \] where the nonlinearity $\mathcal{A}(x,t,\nabla u)$ is modelled after the well studied $p$-Laplace operator. The question of boundedness has received lot of attention over the past several decades with the existing literature showing that weak solutions in either $\frac{2N}{N+2}<p<2$, $p=2$ or $2<p$ are bounded. The proof is essentially split into three cases mainly because the estimates that have been obtained in the past always included an exponent of the form $\frac{1}{p-2}$ or $\frac{1}{2-p}$ which blows up as $p \rightarrow 2$. In this note, we prove the boundedness of weak solutions in the full range $\frac{2N}{N+2} < p < \infty$ without having to consider the singular and degenerate cases separately. Subsequently, in a slightly smaller regime of $\frac{2N}{N+1} < p < \infty$, we also prove an improved boundedness estimate.

## Full text

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## References

1 references — full list in the complete paper: https://tomesphere.com/paper/1901.01693/full.md

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Source: https://tomesphere.com/paper/1901.01693