On the Fujita Phenomenon for a Forced Spatio-Temporal Fractional Diffusion Equation
Abstract
We investigate the Cauchy problem for a semilinear spatio--temporal fractional diffusion equation with a time-dependent forcing term: \[ ∂tα u + (-)s u = |u|p + tσ\,w(x), (t,x) ∈ (0,∞) × RN, \] where α,s∈ (0,1), σ > -α, and w is a given continuous function. Here ∂tα denotes the Caputo fractional derivative. Our main results are threefold. First, we establish local-in-time existence of mild solutions and prove finite-time blow-up in the subcritical regime, under the positivity condition \[ ∫RN w(x)\,dx > 0. \] Second, in the supercritical case -α < σ < 0, we prove the global existence of solutions for sufficiently small initial data and forcing term, and we identify the corresponding critical exponent as \[ pF=Nα-2sσNα-2s(α+σ). \] Finally, within this supercritical range, we obtain a more robust global existence result under weaker assumptions that require only local smallness and controlled growth of the data. To the best of our knowledge, a sharp Fujita-type threshold for fully spatio-temporal fractional diffusion equations with time-growing external forcing has not been previously established.
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