Integral iterations for harmonic maps
Abstract
We study minimal harmonic maps g: C SO(3) SL(3,R), parameterized by polynomial cubic differentials P in the plane. The asymptotic structure of such a g is determined by a convex polygon Y(P) in RP2. We give a conjectural method for determining Y(P) by solving a fixed-point problem for a certain integral operator. The technology of spectral networks and BPS state counts is a key input to the formulation of this fixed-point problem. We work out two families of examples in detail.
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