NSR measures on hyperelliptic locus and non-renormalization of 1,2,3-point functions
arXiv:0805.0011 · doi:10.1016/j.physletb.2008.05.002
Abstract
We demonstrate (under a modest assumption) that the sums over spin-structures of the simplest combinations of fermionic correlators (Szego kernels) and DHP/CDG/Grushevsky NSR measures vanish at least on the hyperelliptic loci in the moduli space of Riemann surfaces -- despite the violation of the theta_e^4 hypothesis at g>2. This provides an additional important support to validity of these measures and is also a step towards a proof of the non-renormalization theorems in the NSR approach.
8 pages