Asymptotic behavior of solutions of a time-space fractional diffusive Volterra equation
Abstract
In this paper, we study the time-space fractional differential equation of the Volterra type: align* Dα0 t (u) +(-N)σu &= u(1+au-bu2)-au∫0t K(t-s) u(·) \, ds, align* where a,b>0 are given constants, α,σ ∈ (0,1), equipped with a homogeneous Neumann's boundary condition and a positive initial data. The boundedness and uniform continuity of the solution on the entire R+ are established. Moreover, the asymptotic behavior of the positive solution is investigated.
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