论文信息 - Interior gradient blow-up in a semilinear parabolic equation

Interior gradient blow-up in a semilinear parabolic equation

We present a one dimensional semilinear parabolic equation for which the spatial derivative of solutions becomes unbounded in finite time while the solutions themselves remain bounded. In our example the derivative blows up in the interior of the space interval rather than at the boundary, as in earlier examples. In the case of monotone solutions we show that gradient blow-up occurs at a single point, and we study the shape of the singularity. Our argument for gradient blow-up also provides a pair of “naive viscosity suband supersolutions” which violate the comparison principle.

Marek Fila | Johannes Lankeit

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