Random harmonic maps into spheres

Abstract

Let S be a punctured Riemann surface with Euler characteristic (S)<0. For any unitary representation : π1(S) U(N), we introduce its renormalized energy and its harmonic representatives, which are equivariant harmonic maps from the universal cover of S to the unit sphere in CN. Our main result is that if a sequence of unitary representations j strongly converges, then their renormalized energies converge to π4|(S)| and the shape of their harmonic representatives converges to a unique rescaled hyperbolic metric. Combining this statement with examples of strongly converging representations provided by random matrix theory, we derive the following applications. (1) If π1(S) is a free group, then for a random : π1(S) U(N), the shape of its harmonic representatives concentrates around a rescaled hyperbolic metric with high probability as N ∞. (2) For any closed hyperbolic surface, a finite covering admits a harmonic immersion into some Euclidean unit sphere, which is almost isometric after rescaling. (3) There are closed, branched, minimal surfaces Sj in some Euclidean unit spheres such that Sj Benjamini-Schramm converges to a rescaled hyperbolic plane as j ∞, and the Gaussian curvature Kj of Sj satisfies j ∞ 1Area(Sj)∫Sj |Kj+8|=0.