Publications

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Kristensen, S. (2016). Metric Diophantine approximation - from continued fractions to fractals. In J. Steuding (Ed.), Diophantine analysis: Course Notes from a Summer School (pp. 61-127). Birkhäuser Verlag. https://doi.org/10.1007/978-3-319-48817-2_2

Frahm, J., Neeb, K.-H. & Ólafsson, G. (2025). Nets of standard subspaces on non-compactly causal symmetric spaces. In M. Pevzner & H. Sekiguchi (Eds.), Symmetry in Geometry and Analysis: Festschrift in Honor of Toshiyuki Kobayashi (Vol. 2, pp. 115-195). Birkhäuser Verlag. https://doi.org/10.1007/978-981-97-7662-7_5

Istrati, N. & Otiman, A. (2025). On Some Properties of Hopf Manifolds. In Real and Complex Geometry: In Honour of Paul Gauduchon (pp. 201-218). Springer Science + Business Media. https://doi.org/10.1007/978-3-031-92297-8_9

Ørsted, B. & Vargas, J. A. (2025). Pseudo-dual Pairs and Branching of Discrete Series. In M. Pevzner & H. Sekiguchi (Eds.), Symmetry in Geometry and Analysis (Vol. 2, pp. 497-549). Birkhauser. https://doi.org/10.1007/978-981-97-7662-7_11

Frahm, J. & Labriet, Q. (2025). Restricting holomorphic discrete series representations to a compact dual pair. In M. Pevzner & H. Sekiguchi (Eds.), Symmetry in Analysis and Geometry: Festschrift in Honor of Toshiyuki Kobayashi (Vol. 2, pp. 95-113). Birkhäuser Verlag. https://doi.org/10.1007/978-981-97-7662-7_4

Güneysu, B., Matte, O. & Møller, J. S. (2014). Stochastic calculus and non-relativistic QED. In P. Exner, W. König & H. Niedhardt (Eds.), Mathematical Results in Quantum Mechanics: Proceedings of the QMATH12 Conference (pp. 315-323). World Scientific. https://doi.org/10.1142/9789814618144_0027

Baudoin, F. (2015). Stochastic Differential Equations Driven by Loops. In Progress in Probability (pp. 59-80). Birkhauser. https://doi.org/10.1007/978-3-319-13984-5_3

Baudoin, F. (2010). Stochastic processes. In International Encyclopedia of Education (pp. 451-452). Elsevier Ltd.. https://doi.org/10.1016/B978-0-08-044894-7.01369-5

Thomsen, K. (2019). The factor type of conservative KMS-weights on graph C∗-algebras. In Analysis and operator theory (pp. 379–394). Springer.

Swann, A. F. (2022). The nonlinear graviton and related constructions: Some Quaternionically Equivalent Einstein Metrics. In Further advances in twistor theory: Volume III: Curved twistor spaces (Vol. 3, pp. 45-48). CRC Press.

Kobak, P. Z. & Swann, A. F. (2022). The nonlinear graviton and related constructions: Exceptional Hyper-Kähler Reductions. In Further advances in twistor theory: Volume III: Curved twistor spaces (Vol. 3, pp. 81-84). CRC Press.

Swann, A. F. (2022). The nonlinear graviton and related constructions: Homogeneity of Twistor Spaces. In Further advances in twistor theory: Volume III: Curved twistor spaces (Vol. 3, pp. 50-53). CRC Press.

Ørsted, B. & Speh, B. (2025). Toward Gan-Gross-Prasad-Type Conjecture for Discrete Series Representations of Symmetric Spaces. In M. Pevzner & H. Sekiguchi (Eds.), Symmetry in Geometry and Analysis (Vol. 2, pp. 457-496). Birkhauser. https://doi.org/10.1007/978-981-97-7662-7_10

Kumar, S. & Thomsen, J. F. (2004). A new realization of the cohomology of Springer fibers. In S. G. Dani & G. Prasad (Eds.), Algebraic groups and arithmetic (pp. 119-125). Narosa Publishing House.

Jantzen, J. C. (2008). Character formulae from Hermann Weyl to the present. In K. Tent (Ed.), Groups and Analysis: The legacy of Hermann Weyl (pp. 232-270). Cambridge University Press.

Barndorff-Nielsen, O. E. & Thorbjørnsen, S. (2006). Classical and Free Infinite Divisibility and Lévy Processes. In O. E. Barndorff-Nielsen, U. Franz, R. Gohm, B. Kümmerer & S. Thorbjørnsen (Eds.), Quantum Independent Increment Processes II: structure of quantum Lévy processes, classical probability, and physics (pp. 33-160). Springer.

Gérard, C., Isozaki, H. & Skibsted, E. (1994). Commutator algebra and resolvent estimates. In K. Yajima (Ed.), Spectral and scattering theory and applications (pp. 69-82). Math. Soc. Japan.

Castro, S. B. S. D. & Plessis, A. D. (2005). Intrinsic complete transversals and the recognition of equivariant bifurcations. In F. Dumortier, H. Broer, J. Mawhin, A. Vanderbauwhede & S. V. Lunel (Eds.), Equadiff 2003 (pp. 458-464). World Scientific.

Plessis, A. D. (2006). Minimal Intransigent Hypersurfaces. In J.-P. Brasselet & M. A. Soares Ruas (Eds.), Real and Complex Singularities: São Carlos Workshop 2004 (pp. 299-310). Birkhäuser Verlag.

Jantzen, J. C. (2004). Nilpotent orbits in representation theory. In B. Ørsted & J.-P. Anker (Eds.), Lie Theory: Lie Algebras and Representations (pp. 1-211). Birkhäuser Verlag.

Thomsen, K., Kolyada, S. (Ed.), Manin, Y. (Ed.) & Ward, T. (Ed.) (2005). On the structure of beta shifts. In Algebraic and Topological Dynamics (pp. 321-332)

Jantzen, J. C. (2004). Representations of Lie algebras in positive characteristic. In T. Shoji, M. Kashiwara, N. Kawanaka, G. Luszig & K. Shinoda (Eds.), Representation Theory of Algebraic Groups and Quantum Groups (pp. 175-218). Math. Soc. Japan.

Thomsen, K. (2003). The defect of factor maps and finite equivalence of dynamical systems. In S. Bezuglyi & S. Kolyada (Eds.), Topics in dynamics and ergodic theory (pp. 190-225). Cambridge University Press.

Thomsen, K. & Manuilov, V. (2006). The group of unital C*-extensions. In B. Bojarski, A. Mishchenko & A. Weber (Eds.), C*-algebras and Elliptic Theory (pp. 151-156). Birkhäuser Verlag.

Plessis, A. D. (2006). Versality Properties of Projective Hypersurfaces. In J.-P. Brasselet & M. A. Soares Ruas (Eds.), Real and Complex Singularities: São Carlos Workshop 2004 (pp. 289-298). Birkhäuser Verlag.

Podolskij, M., Stelzer, R., Thorbjørnsen, S. & Veraart, A. (Eds.) (2016). The Fascination of Probability, Statistics and their Applications: In Honour of Ole E. Barndorff-Nielsen. Springer. https://doi.org/10.1007/978-3-319-25826-3

Anker, J.-P. & Ørsted, B. (Eds.) (2004). Lie theory: Lie algebras and representations. Birkhäuser Verlag. Progress in Mathematics Vol. 228

Anker, J.-P. & Ørsted, B. (Eds.) (2005). Lie theory: unitary representations and compactifications of symmetric spaces. Birkhäuser Verlag. Progress in Mathematics Vol. 229

Anker, J.-P. & Ørsted, B. (Eds.) (2005). Lie theory: harmonic analysis on symmetric spaces - general Plancherel theorems. Birkhäuser Verlag. Progress in Mathematics Vol. 230

Benkart, G., Jantzen, J. C., Lin, Z., Nakano, D. K. & Parshall, B. J. (Eds.) (2006). Representations of Algebraic Groups, Quantum Groups and Lie Algebras. American Mathematical Society. Contemporary Mathematics Vol. 413

Thomsen, K. (2024). An introduction to KMS weights. Springer. Lecture Notes in Mathematics Vol. 2362 https://doi.org/10.1007/978-3-031-75630-6

Matte, O. & Møller, J. S. (2018). Feynman-Kac formulas for the ultra-violet renormalized Nelson model. Société Mathématique de France. Asterisque https://doi.org/10.24033/ast.1054

Stetkær, H. (2013). Functional equations on groups. World Scientific. https://doi.org/10.1142/8830

Jantzen, J. C. & Schwermer, J. (2005). Algebra. Springer.

Jantzen, J. C. (2003). Representations of Algebraic Groups. (2. ed.) American Mathematical Society.

Kock, A. (2010). Synthetic geometry of manifolds. Cambridge University Press. Cambridge tracts in mathematics Vol. 180

Brion, M. & Jantzen, J. C. (Eds.) (2010). Algebraic groups. Oberwolfach Reports, 7(2), 1101-1163. https://doi.org/10.4171/OWR/2010/19

Brion, M., Jantzen, J. C. & Rouquier, R. (Eds.) (2007). Algebraic Groups. Oberwolfach Reports, (2), 1191–1242. https://doi.org/10.4171/OWR/2007/22

Lauritzen, N. & Thomsen, J. F. (2019). A Euclidean algorithm for integer matrices. The American Mathematical Monthly, 126(8), 699-699. https://doi.org/10.1080/00029890.2019.1626667

Nelson, P. D. (2022). Correction to: The spectral decomposition of | θ| ² Mathematische Zeitschrift, 301(2), 2227-2228. https://doi.org/10.1007/s00209-021-02936-y

Nelson, P. D. (2021). Correction to: The spectral decomposition of | θ| ² (Mathematische Zeitschrift, (2021), 298, 3-4, (1425-1447), 10.1007/s00209-020-02665-8). Mathematische Zeitschrift, 299(1-2), 1197. https://doi.org/10.1007/s00209-020-02668-5

Baudoin, F. & Nualart, D. (2005). Erratum: "Equivalence of Volterra processes" (Stochastic Process. Appl. (2003) vol. 107 (327-350) 10.1016/S0304-4149(03)00088-7). Stochastic Processes and Their Applications, 115(4), 701-703. https://doi.org/10.1016/j.spa.2004.11.002

Baudoin, F. (2021). Heat flow and sets of finite perimeter. Notices of the American Mathematical Society, 68(4), 582-583. https://doi.org/10.1090/noti2257

Baudoin, F. & Rizzi, L. (2025). Preface. Contemporary Mathematics, 809, vii.

Gyoja, A., Andersen, H. H., Ariki, S., Broué, M., De Concini, C., Jantzen, J. C., Nakajima, H. & Shoji, T. (Eds.) (2006). Special issue celebrating the 60th birthday of George Lusztig. Nagoya Mathematical Journal, 182.

Swann, A. F. (2011). Alekseevsky, D. V.; Cortés, V.; Galaev, A. S.; Leistner, T. Cones over pseudo-Riemannian manifolds and their holonomy. J. Reine Angew. Math. 635 (2009), 23--69. Mathematical Reviews, 2011b(53115), MR2572254.

Swann, A. F. (2011). Alekseevsky, D. V.; Cortés, V. Geometric construction of the r-map: from affine special real to special Kähler manifolds. Comm. Math. Phys. 291 (2009), no. 2, 579--590. Mathematical Reviews, 2011a(53070), MR2530173.

Swann, A. F. (2019). Ang, J. P., Driezen, Sibylle, Roček, Martin, Sevrin, Alexander. Generalized Kähler structures on group manifolds and T-duality. J. High Energy Phys. 2018, no. 5, 189, front matter+41 pp. MathSciNet, Article MR3814998. https://mathscinet.ams.org/mathscinet-getitem?mr=3814998

Ørsted, B. (2000). a review of: Holomorphy and convexity in Lie theory, by Karl-Hermann Neeb, de Gruyter. Bulletin of the AMS, 39(2), 287-291.

Swann, A. F. (2024). A. Soldatenkov, Deformation principle and André motives of projective hyperkähler manifolds, Int. Math. Res. Not. IMRN 2022, no. 21, 16814-16843. MathSciNet, Article MR4504908. https://mathscinet-ams-org.ez.statsbiblioteket.dk/mathscinet/article?mr=4504908

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Revised 06.01.2026

Lars Madsen