Factorization of Jet Mass Distribution in the small R limit

Abstract

We derive a factorization theorem for the jet mass distribution with a given pTJ for the inclusive production, where pTJ is a large jet transverse momentum. Considering the small jet radius limit (R 1) we factorize the scattering cross section into a partonic cross section, the fragmentation function to a jet, and the jet mass distribution function. The decoupled jet mass distributions for quark and gluon jets are well-normalized and scale invariant. And they can be extracted from the ratio of two scattering cross sections such as dσ/(dpTJdMJ2) and dσ/dpTJ. When MJ pTJ R, the perturbative series expansion for the jet mass distributions works well. As the jet mass becomes small, the large logarithms of MJ / (pTJ R) appear, and they can be systematically resummed through more refined factorization theorem for the jet mass distribution.