A fractional attraction-repulsion chemotaxis system with generalized logistic source and nonlinear productions
Abstract
This paper studies a fractional attraction-repulsion system with generalized logistic source and nonlinear productions: equation* \ aligned &ut = -(-)α u - 1 ∇ · (u ∇ v) + 2 ∇ · (u ∇ w) + au - buγ, &x ∈ RN, \, t > 0, \\ &0 = v - λ1 v + μ1 uk, &x ∈ RN, \, t > 0, \\ &0 = w - λ2 w + μ2 uk, &x ∈ RN, \, t > 0. aligned . equation* We first establish the global boundedness of classical solutions with nonnegative bounded and uniformly continuous initial data in two different cases: γ ≥ k + 1 and γ < k + 1, respectively. Next, we show the asymptotic behavior of the global solutions for both cases γ = k + 1 and γ ≠ k + 1. Finally, we obtain the spreading speed of solutions. In particular, when γ = k + 1, the upper bound of the spreading speed increases monotonically with k. If the condition of balanced attraction-repulsion intensities is further specified, the spreading speed will be equal to aN + 2α.
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