Global well-posedness and flat-hump-shaped stationary solutions for degenerate chemotaxis systems with threshold density

Abstract

In a smoothly bounded domain ⊂ RN (N∈ N), a no-flux initial-boundary value problem for the degenerate chemotaxis system with volume-filling effects, align* ut = ∇ · (D(u,v) ∇ u - h(u,v) ∇ v), vt = v + g(u,v), x∈ , \ t>0, align* is considered under the assumptions that D(1,s)=0 and that h(0,s)=h(1,s)=0. Here, initial data u0 and v0 have suitable regularity and satisfy 0 u0 1 and v0 0 with ∇ v0 · |∂ = 0. It is proved that there exists a global weak solution such that 0 u 1 and v 0. Moreover, when D(r,s) = D(r) for all r∈[0,1] and s∈[0,∞) and additional conditions on D, h and g are assumed, uniqueness of global weak solutions with the mass conservation law ∫ u(x,t) \, dx = ∫ u0(x) \, dx is shown. Also, a flat-hump-shaped stationary solution is constructed in the one-dimensional setting