Statistically equilibrium two-dimensional vortices

The equilibrium statistics of the Euler equations in two dimensions are studied, and a new continuum model of coherent, or organized, states is proposed. This model is defined by a maximum entropy principle similar to that governing the Miller-Robert model except that the family of global vorticity

The dynamics of dipolar vortex solutions to the two-dimensional Euler equations is studied. A new type of nonlinear dipole is found and its dynamics in a slightly viscous system is compared with the dynamics of the Lamb dipole. The evolution of dipolar structures from an initial turbulent patch is i

We provade, for a gaven vortex configuration, a general approach to the soluUon of the Lawrence-Domach model m the London approximation including Josephson couphng between the layers at the linear level Then, the scheme is used to investigate some properties of vortex-antlvortex pairs which are rele