Critical threshold for a two-species chemotaxis system with the energy critical exponent
Abstract
We consider a two-species chemotaxis model in d(d 3) featuring nonlinear porous medium-type diffusion and nonlocal attractive power-law interaction. Here, the nonlinear diffusion is chosen to be 1/m1+1/m2=(d+2)/d in such a way that the associated free energy is conformal invariant, and there are radially symmetric, non-increasing and non-compactly supported stationary solutions (Us(x),Vs(x)). We analyze the conditions on initial data (u0,v0) under which attractive forces dominate over diffusion, and further classify the global existence and finite time blow-up of dynamical solutions by virtue of these stationary solutions. Specifically, the solution (u,v)(x,t) exists globally in time if the initial data satisfy \|u0\|Lm1(d)<\|Us\|Lm1(d) and \|v0\|Lm2(d)<\|Vs\|Lm2(d). In contrast, there are blowing-up solutions when \|u0\|Lm1(d)>\|Us\|Lm1(d) and \|v0\|Lm2(d)>\|Vs\|Lm2(d).
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