Equivariant finite energy proper minimal surfaces in CH2

Abstract

Given a noncompact Riemann surface 0\,=\, P, where P is a finite subset of a compact connected Riemann surface , and a reductive representation \,:\,π1(0)\,\, PU(2,1), we prove that any finite--energy --equivariant conformal minimal immersion is proper around every cusp if and only if the peripheral holonomy of is parabolic. Assuming parabolic peripheral holonomy, we give an explicit parametrization of complete finite--energy immersions in the mixed case in terms of tame parabolic PU(2,1)--Higgs bundles with nilpotent residues and satisfying concrete parabolic slope inequalities. We also discuss complete ends and construct explicit families of equivariant proper CH2 n--noids on CP1 P for |P|\,\, 5.