Polynomiality of off-forward distribution functions in the chiral quark soliton model
arXiv:hep-ph/0207336 · doi:10.1016/S0375-9474(02)01218-6
Abstract
Mellin moments of off-forward distribution functions are, at t = 0, even polynomials of the skewedness parameter xi. It is proven that the unpolarized off-forward distribution functions in the chiral quark soliton model satisfy this so called polynomiality property. The proof is an important contribution to the demonstration that the description of off-forward distribution functions in the model is consistent.
4 pages, latex, no figures. Presented at the European Workshop on the QCD Structure of the Nucleon (QCD-N'02), Ferrara, Italy, 3-6 April 2002. To appear in Nucl. Phys. A