The tension equation with holomorphic coefficients, harmonic mappings and rigidity

Abstract

The tension equation for a mapping f: C C is the nonlinear second order equation \[ f +(f) fz f z = 0\] Solutions are "harmonic" mappings. Here we give a complete description of the solution space of mappings of degree 1 to this equation when is entire. Each solution is a quasiconformal surjection and when the set of normalised solutions is endowed with the Teichm\"uller metric, the solution space is isometric to the hyperbolic plane. More generally, for harmonic mappings f: (,) between domains in C, with (w)|dw| defining a flat metric we stablish a very strong maximum principle for the distortion - up to multiplicative factor eiv, v real and harmonic, the Beltrami coefficient of f-1 is quasiregular - and thus open and discrete when nonconstant. This follows from the remarkable fact that the Beltrami coefficient of the inverse of a harmonic mapping itself satisfies a nonlinear homogeneous Beltrami equation.