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We present a probabilistic approach which proves blow-up of solutions of the Fujita equation w/ t = - (-) ^ /2w + w^1+ in the critical dimension d= /. By using the Feynman-Kac representation twice, we construct a subsolution which locally grows to infinity as t. In this way, we cover results proved earlier by analytic methods. Our method also applies to extend a blow-up result for systems proved for the Laplacian case by Escobedo and Levine (1995) to the case of -Laplacians with possibly different parameters.
Birkner et al. (Mon,) studied this question.