Spreading speeds of a parabolic-parabolic chemotaxis model with logistic source on RN

Abstract

The current paper is concerned with the spreading speeds of the following parabolic-parabolic chemotaxis model with logistic source on RN, equation cases ut= u-∇· ( u∇ v) + u(a-bu), x∈RN, vt= v -λ v+μ u, x∈ RN. cases(1) equation where , \ a,\ b,\ λ,\ μ are positive constants. Assume b>Nμ4. Among others, it is proved that 2a is the spreading speed of the global classical solutions of (1) with nonempty compactly supported initial functions, that is, t∞|x|≥ ctu(x,t;u0,v0)=0 ∀\,\, c>2a and t∞∈f|x|≤ ctu(x,t;u0,v0)>0 ∀\,\, 0<c<2a. where (u(x,t;u0,v0), v(x,t;u0,v0)) is the unique global classical solution of (1) with u(x,0;u0,v0)=u0, v(x,0;u0,v0)=v0, and supp(u0), supp(v0) are nonempty and compact. It is well known that 2a is the spreading speed of the following Fisher-KPP equation, ut= u+u(a-bu), ∀\,\ x∈RN. Hence, if b>Nμ4, the chemotaxis neither speeds up nor slows down the spatial spreading in the Fisher-KPP equation.