On the infinite dimension limit of invariant measures and solutions of Zeitlin's 2D Euler equations
Abstract
In this work we consider a finite dimensional approximation for the 2D Euler equations on the sphere, proposed by V. Zeitlin, and show their convergence towards a solution to Euler equations with marginals distributed as the enstrophy measure. The method relies on nontrivial computations on the structure constants of S2, that appear to be new. In the last section we discuss the problem of extending our results to Gibbsian measures associated with higher Casimirs.
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