Stable Non-Gaussian Diffusive Profiles
Abstract
We prove two stability results for the scale invariant solutions of the nonlinear heat equation ∂t u= u - |u|p-1u with 1<p<1+2 n, n being the spatial dimension. The first result is that a small perturbation of a scale invariant solution vanishes as t→∞. The second result is global, with a positivity condition on the initial data.
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