Complete harmonic metrics and subharmonic functions on the unit disc

Abstract

Let X be a Riemann surface, KX → X the canonical bundle, and TX→ X the dual bundle of the canonical bundle. For each integer r ≥ 2, each q ∈ H0(KXr), and each choice of the square root KX1/2 of the canonical bundle, we obtain a Higgs bundle (Kr,(q)), which is called a cyclic Higgs bundle. A diagonal harmonic metric h = (h1, …, hr) on a cyclic Higgs bundle yields r-1-Hermitian metrics H1, …, Hr-1 on TX, while h1, hr, and q yield a degenerate Hermitian metric Hr on TX. A diagonal harmonic metric is said to be complete if the K\"ahler metrics induced by H1,…, Hr-1 are all complete. Li-Mochizuki established a theorem stating that on any Riemann surface X and any q that is non-zero unless X is hyperbolic, there exists a unique complete harmonic metric h on (Kr,(q)) with a fixed determinant. The holomorphic section q induces a subharmonic weight function φq=1r|q|2 on KX, and a diagonal harmonic metric depends solely on this weight function φq. In this paper, we extend the uniqueness part of the theorem of Li-Mochizuki to any subharmonic weight function whose exponential is C2 outside a compact subset K ⊂eq X. We also show that on the unit disc, a complete Hermitian metric associated with always exists. Furthermore, on the unit disc, when can be monotonically approximated by a family of weight functions (ε)0 < ε < 1, where each ε is smooth and defined on a disc Dε= \z ∈ C |z| < 1 - ε\, we show that the corresponding family of complete metrics (hε)0 < ε < 1 converges monotonically to a complete metric h associated with as ε 0.