We calculate the Mellin moments of the next-to-next-to-leading order coefficient functions for the Drell-Yan and Higgs production cross sections. The results can be expressed in terms of multiple finite harmonic sums of maximal weight w=4. Using algebraic and structural relations between harmonic sums one finds that besides the single harmonic sums only five basic sums and their derivatives w.r.t. the summation index contribute. This representation reduces the large complexity being present in x-space calculations and is well suited for fast numerical implementations
Mellin moments of parton density functions are obtained as integrals of the distribution over Bjorke...
The Drell-Yan process is considered as a case study to investigate two different aspects of perturba...
We derive semi-analytic expressions for the analytic continuation of the Mellin transforms of the he...
We calculate the Mellin moments of the next-to-next-to-leading order coefficient functions for the D...
We calculate the Mellin moments of next-to-next-to-leading order coefficient functions of the Drell-...
We derive the analytic continuation of the Mellin moments of deep inelastic structure functions at t...
We calculate the Mellin moments of the $O(\alpha_s^2)$ coefficient functions for the unpolarized and...
We calculate the Mellin moments of the O(α<SUB>s</SUB><SUP>2</SUP>) coefficient functions for the un...
A systematic study is performed on the finite harmonic sums up to level four. These sums form the ge...
We develop a method for computing Mellin moments of single inclusive cross sections such as Drell-Ya...
The analytic continuation of the Mellin transforms to complex values of N for the basic functions g_...
The analytic continuation of the Mellin transforms to complex values of N for the basic functions $g...
We extend the threshold resummation exponents G N in Mellin- N space to the fourth logarithmic (N 3 ...
We derive semi-analytic expressions for the analytic continuation of the mellin transforms of the he...
A systematic study is performed on the finite harmonic sums up to level four. These sums form the ge...
Mellin moments of parton density functions are obtained as integrals of the distribution over Bjorke...
The Drell-Yan process is considered as a case study to investigate two different aspects of perturba...
We derive semi-analytic expressions for the analytic continuation of the Mellin transforms of the he...
We calculate the Mellin moments of the next-to-next-to-leading order coefficient functions for the D...
We calculate the Mellin moments of next-to-next-to-leading order coefficient functions of the Drell-...
We derive the analytic continuation of the Mellin moments of deep inelastic structure functions at t...
We calculate the Mellin moments of the $O(\alpha_s^2)$ coefficient functions for the unpolarized and...
We calculate the Mellin moments of the O(α<SUB>s</SUB><SUP>2</SUP>) coefficient functions for the un...
A systematic study is performed on the finite harmonic sums up to level four. These sums form the ge...
We develop a method for computing Mellin moments of single inclusive cross sections such as Drell-Ya...
The analytic continuation of the Mellin transforms to complex values of N for the basic functions g_...
The analytic continuation of the Mellin transforms to complex values of N for the basic functions $g...
We extend the threshold resummation exponents G N in Mellin- N space to the fourth logarithmic (N 3 ...
We derive semi-analytic expressions for the analytic continuation of the mellin transforms of the he...
A systematic study is performed on the finite harmonic sums up to level four. These sums form the ge...
Mellin moments of parton density functions are obtained as integrals of the distribution over Bjorke...
The Drell-Yan process is considered as a case study to investigate two different aspects of perturba...
We derive semi-analytic expressions for the analytic continuation of the Mellin transforms of the he...