Revisiting the blow-up criterion and the maximal existence time for solutions of the parabolic-elliptic Keller-Segel system in 2d-Euclidean space

TL;DR

This paper refines the understanding of blow-up phenomena and maximal existence times for the 2D parabolic-elliptic Keller-Segel system, including new criteria and bounds based on initial data properties.

Contribution

It extends blow-up criteria to broader initial conditions and provides sharper upper bounds for the maximal existence time of solutions.

Findings

Blow-up occurs for supercritical mass M > 8pi under new initial conditions.

Derived improved upper bounds for the maximal existence time of solutions.

Constructed explicit blow-up solutions for given initial data with finite second moment.

Abstract

In this paper, we revisit the blow-up criteria for the simplest parabolic-elliptic (PKS) system in the 2D Euclidean space, including a consumption term. In the supercritical mass case M > 8pi, and under an additional global assumption on the second moment (or variance) of the initial data, we establish blow-up results for a broader class of initial conditions than those traditionally considered. We also derive improved upper bounds for the maximal existence time of (PKS) solutions on the plane. These time estimates are obtained through a sharp analysis of a one-parameter differential inequality governing the evolution of the second moment of the (PKS) system. As a consequence, for any given non-negative (non-zero) initial datum n1 with finite second moment, we construct blow-up solutions of the (PKS) system.