English

Sum rule for the twist four longitudinal structure function

High Energy Physics - Phenomenology 2009-10-30 v1

Abstract

We investigate the twist four longitudinal structure function FLτ=4F_{L}^{\tau=4} of deep inelastic scattering and show that the integral of FLτ=4x{F_{L}^{\tau=4} \over x} is related to the expectation value of the fermionic part of the light-front Hamiltonian density at fixed momentum transfer. We show that the new relation, in addition to providing physical intuition on FLτ=4F_{L}^{\tau=4}, relates the quadratic divergences of FLτ=4F_{L}^{\tau=4} to the quark mass correction in light-front QCD and hence provides a new pathway for the renormalization of the corresponding twist four operator. The mixing of quark and gluon operators in QCD naturally leads to a twist four longitudinal gluon structure function and to a new sum rule dxFLx=4M2Q2 \int dx {F_L \over x}= 4 {M^2 \over Q^2}, which is the first sum rule obtained for a twist four observable. The validity of the sum rule in a non-perturbative context is explicitly verified in two-dimensional QCD.

Keywords

Cite

@article{arxiv.hep-ph/9711298,
  title  = {Sum rule for the twist four longitudinal structure function},
  author = {A. Harindranath and Rajen Kundu and Asmita Mukherjee and James P. Vary},
  journal= {arXiv preprint arXiv:hep-ph/9711298},
  year   = {2009}
}

Comments

To appear in Physics Letters B