Asymptotics for minimizers of a Donaldson functional and mean curvature 1-immersions of surfaces into hyperbolic 3-manifolds
Abstract
It has been shown in by Huang-Lucia-Tarantello [17] that, for given c <1, the moduli space of constant mean curvature (CMC) c-immersions of a closed orientable surface of genus g ≥ 2 into a hyperbolic 3-manifold can be parametrized by elements of the tangent bundle of the corresponding Teichm\"uller space. This is attained by showing the unique solvability of the Gauss-Codazzi equations governing (CMC) c-immersions. The corresponding unique solution is identified as the global minimum (and only critical point) of the Donaldson functional Dt (introduced in [11]) given in (1.3) with t=1-c2. When c ≥ 1 (i.e. t≤ 0), so far nothing is known about the existence of analogous (CMC) c-immersions. Indeed, for t≤ 0 the functional Dt may no longer be bounded from below and evident non-existence situations do occur. Already the case c =1 (i.e. t=0) appears rather involved and actually (CMC) 1-immersions can be attained only as "limits" of (CMC) c-immersions for c 1-. To handle this situation, here we analyse the asymptotic behaviour of minimizers of Dt as t 0+. We use an accurate asymptotic analysis to describe possible blow-up phenomena. In this way, we can relate the existence of (CMC) 1-immersions to the Kodaira map. As a consequence, we obtain the first existence and uniqueness result about (CMC) 1-immersions of surfaces of genus g=2 into hyperbolic 3-manifolds.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.