Univ.-Prof. Dr. Carsten Schneider
Johannes Kepler University Linz
RISC - Research Institute for Symbolic Computation
Carsten.Schneider@risc.jku.at (Tel: +43 732 2468 9966)

Publications

Note: Further information can be found, e.g., on MathSciNet, Google Scholar, ResearchGate, zbMath, Web of Science, Scopus, Inspire, or ORCID.



Type: [any] [Papers] [Theses] [Technical Reports] [Other
Year: [any] [2024] [2023] [2022] [2021] [2020] [2019] [2018] [2017] [2016] [2015] [earlier

1. J. Ablinger, A. Behring, J. Bluemlein, A. De Freitas, A. von Manteuffel, C. Schneider, K. Schoenwald. The non-first-order-factorizable contributions to the three-loop single-mass operator matrix elements $A_{Qg}^{(3)}$ and $Delta A_{Qg}^{(3)}$. Technical report no. 24-02 in RISC Report Series, Research Institute for Symbolic Computation (RISC), Johannes Kepler University Linz, Austria. March 2024. arXiv:2403.00513 [[hep-ph]. [url] [pdf] [pdf] [covercore.tex] [prepend_cover.log] [bib]
2. P. Paule, C. Schneider. Creative Telescoping for Hypergeometric Double Sums. Technical report no. 24-01 in RISC Report Series, Research Institute for Symbolic Computation (RISC), Johannes Kepler University Linz, Austria. January 2024. arXiv:2401.16314 [cs.SC]. [url] [pdf] [pdf] [covercore.tex] [prepend_cover.log] [bib]
3. J. Blümlein, A. De Freitas, C. Schneider, K. Schönwald. The Three Loop Two-Mass Contribution to the Gluon Vacuum Polarization. Cornell University. Technical report no. arXiv:1710.04500 [hep-ph], 2017. [url] [bib]
4. C. Schneider. Finding Telescopers with Minimal Depth for Indefinite Nested Sum and Product Expressions (Extended Version). J. Kepler University Linz. Technical report no. 2005-08, 2005. SFB-Report. [ps] [pdf] [bib]
5. C. Schneider. Symbolic Summation with Single-Nested Sum Extensions (Extended Version). J. Kepler University, Linz. Technical report no. 2004-7, 2004. Published in Proc. ISSAC'04. SFB-Report. [ps] [pdf] [bib]
6. G.E. Andrews, P. Paule, C. Schneider. Plane Partition VI: Stembridge's TSPP Theorem -- A detailed algorithmic proof. Technical report no. 04-08 in RISC Report Series, Research Institute for Symbolic Computation (RISC), Johannes Kepler University Linz, Austria. May 2004. [pdf] [ps] [bib]
7. C. Schneider. A Unique Representation of Solutions of Parameterized Linear Difference Equations in ${\Pi}{\Sigma}$-Fields. Technical report no. 02-06 in RISC Report Series, Research Institute for Symbolic Computation (RISC), Johannes Kepler University Linz, Austria. July 2002. [ps] [bib]