# A complete characterization of the blow-up solutions to discrete   $p$-Laplacian parabolic equations with $q$-reaction under the mixed boundary   conditions

**Authors:** Jaeho Hwang

arXiv: 1901.03038 · 2019-01-11

## TL;DR

This paper fully characterizes the conditions under which solutions to discrete p-Laplacian parabolic equations with q-reaction blow up, vanish, or exist globally, including blow-up rates, under mixed boundary conditions.

## Contribution

It provides a complete characterization of solution behaviors for discrete p-Laplacian equations with q-reaction, including blow-up criteria, rates, and numerical illustrations.

## Key findings

- Conditions for solution blow-up, vanishing, or global existence.
- Explicit blow-up rates when solutions blow up.
- Numerical examples confirming theoretical results.

## Abstract

In this paper, we consider discrete $p$-Laplacian parabolic equations with $q$-reaction term under the mixed boundary condition and the initial condition as follows: \begin{equation*} \begin{cases} u_{t}\left(x,t\right) = \Delta_{p,\omega} u\left(x,t\right) +\lambda \left\vert u\left(x,t\right) \right\vert^{q-1} u\left(x,t\right), &\left(x,t\right) \in S \times \left(0,\infty\right), \\ \mu(z)\frac{\partial u}{\partial_{p} n}(z)+\sigma(z)\vert u(z)\vert^{p-2}u(z)=0, &\left(x,t\right) \in \partial S \times \left[0,\infty\right), \\ u\left(x,0\right) = u_{0}(x) \geq 0, &x \in \overline{S}. \end{cases} \end{equation*} where $p>1$, $q>0$, $\lambda>0$ and $\mu,\sigma$ are nonnegative functions on the boundary $\partial S$ of a network $S$, with $\mu(z)+\sigma(z)>0$, $z\in\partial S$. Here, $\Delta_{p,\omega}$ and $\frac{\partial \phi}{\partial_{p} n}$ denote the discrete $p$-Laplace operator and the $p$-normal derivative, respectively. The parameters $p>1$ and $q>0$ are completely characterized to see when the solution blows up, vanishes, or exists globally. Indeed, the blow-up rates when blow-up does occur are derived. Also, we give some numerical illustrations which explain the main results.

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## Figures

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## References

14 references — full list in the complete paper: https://tomesphere.com/paper/1901.03038/full.md

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Source: https://tomesphere.com/paper/1901.03038