@**article**{RISC6333,author = {J. Blümlein and A. De Freitas and M. Saragnese and K. Schönwald and C. Schneider},

title = {{The Logarithmic Contributions to the Polarized $O(alpha_s^3)$ Asymptotic Massive Wilson Coefficients and Operator Matrix Elements in Deeply Inelastic Scattering}},

language = {english},

abstract = {We compute the logarithmic contributions to the polarized massive Wilson coefficients for
deep-inelastic scattering in the asymptotic region $Q^2gg m^2$ to 3-loop order in the fixed-
flavor number scheme and present the corresponding expressions for the polarized massive
operator matrix elements needed in the variable flavor number scheme. The calculation
is performed in the Larin scheme. For the massive operator matrix elements $A_{qq,Q}^{(3),PS}$ and $A_{qg,Q}^{(3),S}$
the complete results are presented. The expressions are given in Mellin-$N$ space and
in momentum fraction $z$-space.},

journal = {Physical Review D},

volume = {104},

number = {3},

pages = {1--73},

isbn_issn = {ISSN 2470-0029},

year = {2021},

note = {arXiv:2105.09572 [hep-ph]},

refereed = {yes},

keywords = {logarithmic contributions to the polarized massive Wilson coefficients, symbolic summation, harmonic sums, harmonic polylogarithm},

length = {73},

url = {https://doi.org/10.1103/PhysRevD.104.034030 }

}