Mathematics for structure functions
- 31 October 2000
- journal article
- Published by Elsevier in Nuclear Physics B - Proceedings Supplements
- Vol. 89 (1-3) , 131-136
- https://doi.org/10.1016/s0920-5632(00)00834-3
Abstract
No abstract availableKeywords
All Related Versions
This publication has 10 references indexed in Scilit:
- Calculation of electroproduction to NNLO and precision determination of αsNuclear Physics B, 1999
- HARMONIC SUMS, MELLIN TRANSFORMS AND INTEGRALSInternational Journal of Modern Physics A, 1999
- Order-αs2 QCD corrections to the deep inelastic proton structure functions F2 and FLNuclear Physics B, 1992
- Contribution of the second order gluonic Wilson coefficient to the deep inelastic structure functionPhysics Letters B, 1991
- Order α2S contributions to the deep inelastic Wilson coefficientPhysics Letters B, 1991
- Total αs correction to the deep-inelastic scattering cross-sections ratio R = σL/σT in QCDNuclear Physics B, 1988
- Behaviour at x = 0, 1, sum rules and parametrizations for structure functions beyond the leading orderNuclear Physics B, 1981
- Second-order contributions to the structure functions in deep inelastic scattering (III). The singlet caseNuclear Physics B, 1980
- Second-order contributions to the structure functions in deep inelastic scattering (I). Theoretical calculationsNuclear Physics B, 1979
- Reliable Perturbative Results for Strong Interactions?Physical Review Letters, 1973