Trigonometric and elliptic Ruijsenaars-Schneider systems on the complex projective space

Abstract

We present a direct construction of compact real forms of the trigonometric and elliptic n-particle Ruijsenaars-Schneider systems whose completed center-of-mass phase space is the complex projective space CPn-1 with the Fubini-Study symplectic structure. These systems are labelled by an integer p∈\1,…,n-1\ relative prime to n and a coupling parameter y varying in a certain punctured interval around pπ/n. Our work extends Ruijsenaars's pioneering study of compactifications that imposed the restriction 0<y<π/n, and also builds on an earlier derivation of more general compact trigonometric systems by Hamiltonian reduction.