The Coupled Hitchin-He Equations: Integrable Deformations and Rigidity of the Moduli Space

Abstract

We introduce the parameter-geometrization to the Hitchin system, a paradigm embedding deformation parameters into geometry via the coupled Hitchin-He equations on a surface with boundary. A boundary term couples a second Higgs field , recovering the classical system at α=0. We prove a unique, smooth solution branch exists near α=0 (Theorem A). The system is integrable, admitting a Lax pair (Theorem B). Crucially, the moduli space Mα is analytically isomorphic to M0 for small |α|, preserving the Hitchin fibration -- revealing a deep rigidity where all moduli are controlled by the primary Higgs field (Theorem C). Using the nonlinear embedding technique that casts the deformed system into the form of a classical Higgs bundle system, whose integrability and geometry are well-understood, we extends the framework to compact K\"ahler manifolds (Theorem D).