# On the behavior of solutions of quasilinear elliptic inequalities near a   boundary point

**Authors:** A. A. Kon'kov

arXiv: 1904.03394 · 2019-04-09

## TL;DR

This paper investigates the behavior of solutions to a class of quasilinear elliptic inequalities near boundary points, providing estimates that depend on the domain's geometry and imply boundary regularity conditions.

## Contribution

It offers new estimates for solutions of elliptic inequalities near boundary points, linking solution behavior to domain geometry and boundary regularity.

## Key findings

- Derived estimates depend on domain geometry
- Established boundary regularity conditions
- Provided conditions for solution behavior near boundary

## Abstract

Assume that $p > 1$ and $p - 1 \le \alpha \le p$ are real numbers and $\Omega$ is a non-empty open subset of ${\mathbb R}^n$, $n \ge 2$. We consider the inequality $$   {\rm div} \, A (x, D u)   +   b (x) |D u|^\alpha   \ge   0, $$ where $D = (\partial / \partial x_1, \ldots, \partial / \partial x_n)$ is the gradient operator and $A : \Omega \times {\mathbb R}^n \to {\mathbb R}^n$ and $b : \Omega \to [0, \infty)$ are some functions with $$   C_1   |\xi|^p   \le   \xi   A (x, \xi),   \quad   |A (x, \xi)|   \le   C_2   |\xi|^{p-1},   \quad   C_1, C_2 = const > 0, $$ for almost all $x \in \Omega$ and for all $\xi \in {\mathbb R}^n$. For solutions of this inequality we obtain estimates depending on the geometry of $\Omega$. In particular, these estimates imply regularity conditions of a boundary point.

## Full text

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## References

9 references — full list in the complete paper: https://tomesphere.com/paper/1904.03394/full.md

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Source: https://tomesphere.com/paper/1904.03394