| Abstract: | 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 invariants is relaxed to a family of inequalities on all convex enstrophy integrals. This relaxation is justified by constructing the continuum model from a sequence of lattice models defined by Gibbs measures whose invariants are derived from the exact vorticity dynamics, not a spectral truncation or spatial discretization of it. The key idea is that the enstrophy integrals can be partially lost to vorticity fluctuations on a range of scales smaller than the lattice microscale, while energy is retained in the larger scales. A consequence of this relaxation is that many of the convex enstrophy constraints can be inactive in equilibrium, leading to a simplification of the mean‐field equation for the coherent state. Specific examples of these simplified theories are established for vortex patch dynamics. In particular, a universal relation between mean vorticity and stream function is obtained in the dilute limit of the vortex patch theory, which is different from the sinh relation predicted by the Montgomery‐Joyce theory of point vortices. © 1999 John Wiley & Sons, Inc. |
