EVALUATION OF A CLASS OF THE LAPLACE OPERATOR DETERMINANTS CONNECTED WITH QUANTUM GEOMETRY OF P-BRANES

We evaluate the determinants of Laplacians acting in real line bundles over the manifolds T(p-1) x H-2/GAMMA, T = S1, H-2/GAMMA is a compact Riemannian surface of genus g > 1. Such determinants may be important in building quantum geometry of closed p-branes. The evaluation is based on the Selberg trace formula for compact Riemannian surfaces.