A classification of R-Fuchsian subgroups of Picard modular groups

Abstract

Given an imaginary quadratic extension K of Q, we classify the maximal nonelementary subgroups of the Picard modular group PU(1,2; OK) preserving a totally real totally geodesic plane in the complex hyperbolic plane H2 C. We prove that these maximal R-Fuchsian subgroups are arithmetic, and describe the quaternion algebras from which they arise. For instance, if the radius of the corresponding R-circle lies in N-\0\, then the stabilizer arises from the quaternion algebra (\!arrayc \,,\, |DK|\\ Qarray \!). We thus prove the existence of infinitely many orbits of K-arithmetic R-circles in the hypersphere of P2( C).