On threshold resummation of singlet structure and fragmentation functions

Abstract

The large-x behavior of the physical evolution kernels appearing in the second order evolution equations of the singlet F2 structure function and of the Fphi structure function in phi-exchange DIS is investigated. The validity of a leading logarithmic threshold resummation, analogous to the one prevailing for the non-singlet physical kernels, is established, allowing to recover the predictions of Soar et al. for the double-logarithmic contributions (lni(1-x), i=4,5,6) to the four loop splitting function P(3)qg(x) and P(3)gq(x). Threshold resummation at the next-to-leading logarithmic level is found however to break down in the three loop kernels, except in the "supersymmetric" case CA=CF. Assuming a full threshold resummation does hold in this case also beyond three loop gives some information on the leading and next-to-leading single-logarithmic contributions (lni(1-x), i=2,3) to P(3)qg(x) and P(3)gq(x). Similar results are obtained for singlet fragmentation functions in e+e- annihilation up to two loop, where a large-x Gribov-Lipatov relation in the physical kernels is pointed out. Assuming this relation also holds at three loop, one gets predictions for all large-x logarithmic contributions to the three loop timelike splitting function P(2)Tgq(x), which are related to similar terms in P(2)qg(x).