Explicit lower bound of blow--up time for an attraction--repulsion chemotaxis system

Abstract

In this paper we study classical solutions to the zero--flux attraction--repulsion chemotaxis--system equationProblemAbstract cases u t= u - ∇ · (u∇ v)+ ∇ · (u∇ w) & in × (0,t*), \\ 0= v+α u-β v & in × (0,t*),\\ 0= w+γ u-δ w & in × (0,t*),\\ cases equation where is a smooth and bounded domain of R2, t* is the blow--up time and α,β,γ,δ,, are positive real numbers. From the literature it is known that under a proper interplay between the above parameters and suitable smallness assumptions on the initial data u( x,0)=u0∈ C0(), system ProblemAbstract has a unique classical solution which becomes unbounded as t t*. The main result of this investigation is to provide an explicit lower bound for t* estimated in terms of ∫ u02 d x and attained by means of well--established techniques based on ordinary differential inequalities.