Period polynomials for Picard modular forms

Abstract

The relations satisfied by period polynomials associated to modular forms yield a way to count dimensions of spaces of cusp forms. After showing how these relations arise from those on the mapping class group PSL(2, Z) of the moduli space M0,4 of genus 0 curves with 4 marked points, the author goes on to define period polynomials associated to Picard modular forms. Relations on these Picard period polynomials are then determined, and via an embedding of a monodromy representation of the moduli space M0,5 of genus 0 curves with 5 marked points in PU(2,1 ; Z[]) (where denotes a third root of unity), they are related to the geometry of M0,5.