The semilinear Euler-Poisson-Darboux equation: a case of wave with critical dissipation

Abstract

In this paper we study the existence of global-in-time energy solutions to the Cauchy problem for the Euler-Poisson-Darboux equation, with a power nonlinearity: utt-uxx + μt\,ut = |u|p \,, t>t0, \ x∈R\,. Here either t0=0 (singular problem) or t0>0 (regular problem). This model represents a wave equation with critical dissipation, in the sense that the possibility to have global small data solutions depend not only on the power p, but also on the parameter μ. We prove that, assuming small initial data in L1 and in the energy space, global-in-time energy solutions exist for p>pc =\p0(1+μ),3\, for any μ>0, where p0(k) is the critical exponent for the semilinear wave equation without dissipation in space dimension k, conjectured by W.A. Strauss, and 3 is the critical exponent obtained by H. Fujita for semilinear heat equations. We also collect some global-in-time existence result of small data solutions for the multidimensional EPD equation utt- u + μt\,ut = |u|p \,, t>t0, \ x∈Rn\,, with powers p greater than Fujita exponent and sufficiently large μ.