A finite model of two-dimensional ideal hydrodynamics

Abstract

A finite-dimensional su(N) Lie algebra equation is discussed that in the infinite N limit (giving the area preserving diffeomorphism group) tends to the two-dimensional, inviscid vorticity equation on the torus. The equation is numerically integrated, for various values of N, and the time evolution of an (interpolated) stream function is compared with that obtained from a simple mode truncation of the continuum equation. The time averaged vorticity moments and correlation functions are compared with canonical ensemble averages.

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