Finite-time blowup for a complex Ginzburg-Landau equation with linear driving
Abstract
In this paper, we consider the complex Ginzburg--Landau equation ut = eiθ [ u + |u|α u] + γ u on RN , where α >0, γ ∈ and -π /2<θ <π /2. By convexity arguments we prove that, under certain conditions on α ,θ ,γ , a class of solutions with negative initial energy blows up in finite time.
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