Abstract
We mainly consider the following degenerate (p>2) parabolic equationut−Δpu=λum+μ|∇u|q with homogeneous Dirichlet boundary condition in a bounded domain Ω⊂RN. Before studying the properties of the solutions of this equation, we first establish the local-in-time existence of its weak solutions. Then, in different ranges of reaction exponents, we give the complete classification of blowup results including L∞ blowup and gradient blowup. Moreover, under the subcritical condition of q≤p−1, m≤p−1, we can also prove that the solution is global in time.
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