The non-first-order-factorizable contributions to the three-loop single-mass operator matrix elements $A_{Qg}^{(3)}$ and $\Delta A_{Qg}^{(3)}$

Ablinger, Jakob; Schönwald, K.; Behring, A.; Freitas, Abilio de; Schneider, Carsten; Blümlein, Johannes; von Manteuffel, A.

doi:10.1016/j.physletb.2024.138713

Journal Article

PUBDB-2024-01880

The non-first-order-factorizable contributions to the three-loop single-mass operator matrix elements $A_{Qg}^{(3)}$ and $\Delta A_{Qg}^{(3)}$

Ablinger, J. ; Behring, A. ; Blümlein, J. (Corresponding author)DESY* ; Freitas, A. d.Extern*DESY* ; von Manteuffel, A.Extern* ; Schneider, C.Extern* ; Schönwald, K.

2024
North-Holland Publ. Amsterdam

Physics letters / B 854, 138713 (2024) [10.1016/j.physletb.2024.138713]

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Please use a persistent id in citations: doi:10.1016/j.physletb.2024.138713 doi:10.3204/PUBDB-2024-01880

Report No.: CERN-TH-2024-30; DESY-24-027; DO-TH 23/15; RISC Report series 24-02; ZU-TH 13/24; arXiv:2403.00513

Abstract: The non-first-order-factorizable contributions (The terms 'first-order-factorizable contributions' and 'non-first-order-factorizable contributions' have been introduced and discussed in Refs. \cite{Behring:2023rlq,Ablinger:2023ahe}. They describe the factorization behaviour of the difference- or differential equations for a subset of master integrals of a given problem.) to the unpolarized and polarized massive operator matrix elements to three-loop order, $A_{Qg}^{(3)}$ and $\Delta A_{Qg}^{(3)}$, are calculated in the single-mass case. For the $_2F_1$-related master integrals of the problem, we use a semi-analytic method based on series expansions and utilize the first-order differential equations for the master integrals which does not need a special basis of the master integrals. Due to the singularity structure of this basis a part of the integrals has to be computed to $O(\varepsilon^5)$ in the dimensional parameter. The solutions have to be matched at a series of thresholds and pseudo-thresholds in the region of the Bjorken variable $x \in ]0,\infty[$ using highly precise series expansions to obtain the imaginary part of the physical amplitude for $x \in ]0,1]$ at a high relative accuracy. We compare the present results both with previous analytic results, the results for fixed Mellin moments, and a prediction in the small-$x$ region. We also derive expansions in the region of small and large values of $x$. With this paper, all three-loop single-mass unpolarized and polarized operator matrix elements are calculated.

Keyword(s): master integral ; differential equations ; factorization ; Bjorken ; singularity ; structure

Classification:

ddc:530

Contributing Institute(s):

Zeuthen Particle PhysicsTheory (Z_ZPPT)

Research Program(s):

611 - Fundamental Particles and Forces (POF4-611) (POF4-611)

Experiment(s):

HERA: ZEUS

Appears in the scientific report 2024

Database coverage:
Medline

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