Global Analysis of the Gray-Scott Model with Fractional-Classical Diffusion
Abstract
We analyze the Gray-Scott reaction--diffusion system on Ω⊂Rn (n 1) with mixed diffusion combining local and nonlocal operators. Using semigroup methods and duality estimates, we prove global existence of component-wise nonnegative solutions and establish uniform-in-time bounds. Numerical simulations illustrate pattern formation and highlight qualitative differences between the purely local and mixed-diffusion models.
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