Global bifurcation analysis of mean field equations and the Onsager microcanonical description of two-dimensional turbulence

TL;DR

This paper analyzes the global behavior of solutions to the mean field equation related to two-dimensional turbulence, completing longstanding results on the entropy's convexity and solution branches crossing critical parameters.

Contribution

It provides new sufficient conditions for solution existence on starshaped domains and describes the global bifurcation structure of solutions, advancing understanding of the mean field equation and turbulence modeling.

Findings

Full unbounded interval of strict convexity of the Entropy.

Complete description of the global branch of solutions crossing critical parameter 8π.

Resolution of longstanding open problems in the analysis of mean field equations.

Abstract

On strictly starshaped domains of second kind we find natural sufficient conditions which allow the solution of two long standing open problems closely related to the mean field equation $\prl$ below. On one side we catch the global behaviour of the Entropy for the mean field Microcanonical Variational Principle ((MVP) for short) arising in the Onsager description of two-dimensional turbulence. This is the completion of well known results first established in Caglioti et al. Comm.Math.Phys. (1995). Among other things we find a full unbounded interval of strict convexity of the Entropy. On the other side, to achieve this goal, we have to provide a detailed qualitative description of the global branch of solutions of $\prl$ emanating from $\lm=0$ and crossing $\lm=8\pi$. This is the completion of well known results first established in Suzuki A.I.H.P. (1992) and Chang et al. New Stud. Adv. Math. (2003) for $\lm\leq 8\pi$, and it has an independent mathematical interest, since global branches of semilinear elliptic equations, with very few well known exceptions, are poorly understood. The (MVP) suggests the right variable (which is the energy) to be used to obtain a global parametrization of solutions of $\prl$. A crucial spectral simplification is obtained by using the fact that, by definition, solutions of the (MVP) maximize the entropy at fixed energy and total vorticity.