Analytic continuation of the Mellin moments of deep inelastic structure   functions

A.V. Kotikov (Dubna; JINR); V.N. Velizhanin (St. Petersburg; INP)

arXiv:hep-ph/0501274·hep-ph·May 23, 2007·47 cites

Analytic continuation of the Mellin moments of deep inelastic structure functions

A.V. Kotikov (Dubna, JINR), V.N. Velizhanin (St. Petersburg, INP)

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TL;DR

This paper develops a method for analytically continuing Mellin moments of deep inelastic structure functions at NNLO accuracy, aiding precise theoretical predictions in quantum chromodynamics.

Contribution

It provides the first detailed derivation of the analytic continuation of Mellin moments at NNLO, improving the theoretical tools for analyzing deep inelastic scattering data.

Findings

01

Enables more accurate theoretical calculations of structure functions.

02

Facilitates comparison between theory and experimental data.

03

Advances the mathematical techniques used in QCD analyses.

Abstract

We derive the analytic continuation of the Mellin moments of deep inelastic structure functions at the next-to-next-to-leading order accuracy.

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Taxonomy

TopicsMathematical functions and polynomials · Advanced Mathematical Identities · Advanced Numerical Analysis Techniques