Abstract
In this paper we consider a new integrable equation (the Degasperis–Procesi equation) derived recently by Degasperis and Procesi (1999) [3]. Analogous to the Camassa–Holm equation, this new equation admits blow-up phenomenon and infinite propagation speed. First, we give a proof for the blow-up criterion established by Zhou (2004) in [12]. Then, infinite propagation speed for the Degasperis–Procesi equation is proved in the following sense: the corresponding solution u(x,t) with compactly supported initial datum u0(x) does not have compact x-support any longer in its lifespan. Moreover, we show that for any fixed time t>0 in its lifespan, the corresponding solution u(x,t) behaves as: u(x,t)=L(t)e−x for x≫1, and u(x,t)=l(t)ex for x≪−1, with a strictly increasing function L(t)>0 and a strictly decreasing function l(t)<0 respectively.
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