Branched Cauchy-Riemann Structures on Once-Punctured Torus Bundles

Abstract

Unlike in hyperbolic geometry, the monodromy ideal triangulation of a hyperbolic once-punctured torus bundle Mf has no natural geometric realisation in Cauchy-Riemann (CR) space. By introducing a new type of 3--cell, we construct a different cell decomposition Df of Mf that is always realisable in CR space. As a consequence, we show that every hyperbolic once-punctured torus bundle admits a branched CR structure, whose branch locus is the set of edges of Df. Furthermore, we explicitly compute the ramification order around each component of the branch locus and analyse the corresponding holonomy representations.