Well-posedness and Gevrey Analyticity of the Generalized Keller-Segel System in Critical Besov Spaces

Abstract

In this paper, we study the Cauchy problem for the generalized Keller-Segel system with the cell diffusion being ruled by fractional diffusion: equation* cases ∂tu+αu-∇·(u∇ )=0 &in\ \ Rn×(0,∞), - =u &in\ \ Rn×(0,∞), u(x,0)=u0(x), \ \ &in\ \ Rn. cases equation* In the case that 1<α≤ 2, we prove local well-posedness for any initial data and global well-posedness for small initial data in critical Besov spaces B-α+npp,q(Rn) with 1≤ p<∞, 1≤ q≤ ∞, and analyticity of solutions for initial data u0∈ B-α+npp,q(Rn) with 1< p<∞, 1≤ q≤ ∞. Moreover, the global existence and analyticity of solutions with small initial data in critical Besov spaces B-α∞,1(Rn) is also established. In the limit case that α=1, we prove global well-posedness for small initial data in critical Besov spaces B-1+npp,1(Rn) with 1≤ p<∞ and B-1∞,1(Rn), and show analyticity of solutions for small initial data in B-1+npp,1(Rn) with 1<p<∞ and B-1∞,1(Rn), respectively.