# A Condition for Blow-up solutions to Discrete $p$-Laplacian Parabolic   Equations under the mixed boundary conditions on Networks

**Authors:** Soon-Yeong Chung, Min-Jun Choi, Jaeho Hwang

arXiv: 1901.03075 · 2019-11-26

## TL;DR

This paper establishes a new condition under which solutions to discrete p-Laplacian parabolic equations on networks blow up, extending previous results and providing sharper criteria for finite-time singularity formation.

## Contribution

The paper introduces a generalized condition (C_p) that improves existing criteria for blow-up solutions in discrete p-Laplacian parabolic equations on networks.

## Key findings

- Derived blow-up conditions under (C_p)
- Extended blow-up results to mixed boundary conditions
- Provided sharper criteria than previous conditions

## Abstract

The purpose of this paper is to investigate a condition   \begin{equation*}   (C_{p}) \hspace{1cm} \alpha \int_{0}^{u}f(s)ds \leq uf(u)+\beta u^{p}+\gamma,\,\,u>0   \end{equation*}   for some $\alpha>2$, $\gamma>0$, and $0\leq\beta\leq\frac{\left(\alpha-p\right)\lambda_{p,0}}{p}$, where $p>1$ and $\lambda_{p,0}$ is the first eigenvalue of the discrete $p$-Laplacian $\Delta_{p,\omega}$. Using the above condition, we obtain blow-up solutions to discrete $p$-Laplacian parabolic equations   \begin{equation*}   \begin{cases}   u_{t}\left(x,t\right)=\Delta_{p,\omega}u\left(x,t\right)+f(u(x,t)), & \left(x,t\right)\in S\times\left(0,+\infty\right),   \mu(z)\frac{\partial u}{\partial_{p} n}(x,t)+\sigma(z)|u(x,t)|^{p-2}u(x,t)=0, & \left(x,t\right)\in\partial S\times\left[0,+\infty\right),   u\left(x,0\right)=u_{0}\geq0(nontrivial), & x\in S,   \end{cases}   \end{equation*}   on a discrete network $S$, where $\frac{\partial u}{\partial_{p}n}$ denotes the discrete $p$-normal derivative. Here, $\mu$ and $\sigma$ are nonnegative functions on the boundary $\partial S$ of $S$, with $\mu(z)+\sigma(z)>0$, $z\in \partial S$. In fact, it will be seen that the condition $(C_{p})$, the generalized version of the condition $(C)$, improves the conditions known so far.

## Full text

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## References

26 references — full list in the complete paper: https://tomesphere.com/paper/1901.03075/full.md

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Source: https://tomesphere.com/paper/1901.03075