Blowup for nonlinear wave equations describing boson stars

For a wide class of nonlinear parabolic equations of the form u y ⌬ u s t Ž . F u, ٌu , we prove the nonexistence of global solutions for large initial data. We also estimate the maximal existence time. To do so we use a method of comparison with suitable blowing up self-similar subsolutions. As a c

Exact traveling wave profiles are here obtained for a general reaction-diffusionconvection equation, a two-phase flow equation, a generalized Harry᎐Dym equa-Ž . tion, a generalized Korteweg᎐de Vries KdV equation, a modified mKdV equation, a branching network model equation, a Nagumo equation, and a

We first describe all positive bounded solutions of and (N -2)p ≤ N + 2. We then obtain for blowup solutions u(t) of ∂u ∂t = ∆u + u p uniform estimates at the blowup time and uniform space-time comparison with solutions of u = u p .

## Abstract We first establish the local well‐posedness for a new periodic nonlinearly dispersive wave equation. We then present a precise blowup scenario and several blowup results of strong solutions to the equation. The obtained blowup results on the equation improve considerably recent results

Vortex dynamics for the nonlinear wave equation is a typical model of the "particle and field" theories of classical physics. The formal derivation of the dynamical law was done by J. Neu. He also made an interesting connection between vortex dynamics and the Dirac theory of electrons. Here we give