# Blow up profiles for a reaction-diffusion equation with critical   weighted reaction

**Authors:** Razvan Gabriel Iagar (URJC), Ariel S\'anchez (URJC)

arXiv: 1906.00720 · 2024-02-02

## TL;DR

This paper classifies self-similar blow-up profiles for a reaction-diffusion equation with a weighted reaction term, revealing multiple profiles for small weights and non-existence for large weights, highlighting the weight's influence.

## Contribution

It provides a detailed classification of blow-up profiles for the weighted reaction-diffusion equation, showing existence of multiple profiles for small weights and their non-existence for large weights.

## Key findings

- Multiple self-similar profiles exist for small weights.
- No profiles with full-space support exist for any weight.
- Profiles with interface cease to exist when weight is large.

## Abstract

We classify the blow up self-similar profiles for the following reaction-diffusion equation with weighted reaction $$ u_t=(u^m)_{xx} + |x|^{\sigma}u^m, $$ posed for $(x,t)\in\real\times(0,T)$, with $m>1$ and $\sigma>0$. In strong contrast with the well-studied equation without the weight (that is $\sigma=0$), on the one hand we show that for $\sigma>0$ sufficiently small there exist \emph{multiple self-similar profiles with interface} at a finite point, more precisely, given any positive integer $k$, there exists $\delta_k>0$ such that for $\sigma\in(0,\delta_k)$, there are at least $k$ different blow up profiles with compact support and interface at a positive point. On the other hand, we also show that for $\sigma$ sufficiently large, the blow up self-similar profiles with interface \emph{cease to exist}. This unexpected balance between existence of multiple solutions and non-existence of any, when $\sigma>0$ increases, is due to the effect of the presence of the weight $|x|^{\sigma}$, whose influence is the main goal of our study. We also show that for any $\sigma>0$, there are no blow up profiles supported in the whole space, that is with $u(x,t)>0$ for any $x\in\real$ and $t\in(0,T)$.

## Full text

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## Figures

7 figures with captions in the complete paper: https://tomesphere.com/paper/1906.00720/full.md

## References

24 references — full list in the complete paper: https://tomesphere.com/paper/1906.00720/full.md

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Source: https://tomesphere.com/paper/1906.00720