Nondispersive solutions to the mass critical half-wave equation in two dimensions
Abstract
We consider the half-wave equation with mass critical in two dimension eqnarray* cases iut=Du-|u|u,\,\,\, \\ u(0,x)=u0(x), cases eqnarray* First, we prove the existence of a family of traveling solitary waves. We then show the existence of finite-time blowup solutions with minimal mass \|u0\|2=\|Q\|2, where Q is the ground state solution of equation DQ+Q=Q2.
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