[{"issue":"2","publication_identifier":{"issn":["0025-584X","1522-2616"]},"publication_status":"published","page":"456-479","intvolume":" 299","citation":{"bibtex":"@article{Olbrich_Palmirotta_2026, title={Solvability of invariant systems of differential equations on H2$\\mathbb {H}^2$ and beyond}, volume={299}, DOI={10.1002/mana.70100}, number={2}, journal={Mathematische Nachrichten}, publisher={Wiley}, author={Olbrich, Martin and Palmirotta, Guendalina}, year={2026}, pages={456–479} }","mla":"Olbrich, Martin, and Guendalina Palmirotta. “Solvability of Invariant Systems of Differential Equations on H2$\\mathbb {H}^2$ and Beyond.” Mathematische Nachrichten, vol. 299, no. 2, Wiley, 2026, pp. 456–79, doi:10.1002/mana.70100.","short":"M. Olbrich, G. Palmirotta, Mathematische Nachrichten 299 (2026) 456–479.","apa":"Olbrich, M., & Palmirotta, G. (2026). Solvability of invariant systems of differential equations on H2$\\mathbb {H}^2$ and beyond. Mathematische Nachrichten, 299(2), 456–479. https://doi.org/10.1002/mana.70100","ama":"Olbrich M, Palmirotta G. Solvability of invariant systems of differential equations on H2$\\mathbb {H}^2$ and beyond. Mathematische Nachrichten. 2026;299(2):456-479. doi:10.1002/mana.70100","chicago":"Olbrich, Martin, and Guendalina Palmirotta. “Solvability of Invariant Systems of Differential Equations on H2$\\mathbb {H}^2$ and Beyond.” Mathematische Nachrichten 299, no. 2 (2026): 456–79. https://doi.org/10.1002/mana.70100.","ieee":"M. Olbrich and G. Palmirotta, “Solvability of invariant systems of differential equations on H2$\\mathbb {H}^2$ and beyond,” Mathematische Nachrichten, vol. 299, no. 2, pp. 456–479, 2026, doi: 10.1002/mana.70100."},"year":"2026","volume":299,"date_created":"2026-02-20T19:56:33Z","author":[{"first_name":"Martin","last_name":"Olbrich","full_name":"Olbrich, Martin"},{"first_name":"Guendalina","last_name":"Palmirotta","id":"109467","full_name":"Palmirotta, Guendalina"}],"publisher":"Wiley","date_updated":"2026-02-20T20:01:56Z","doi":"10.1002/mana.70100","title":"Solvability of invariant systems of differential equations on H2$\\mathbb {H}^2$ and beyond","publication":"Mathematische Nachrichten","type":"journal_article","status":"public","abstract":[{"lang":"eng","text":"Abstract\r\n We show how the Fourier transform for distributional sections of vector bundles over symmetric spaces of non‐compact type can be used for questions of solvability of systems of invariant differential equations in analogy to Hörmander's proof of the Ehrenpreis–Malgrange theorem. We get complete solvability for the hyperbolic plane and partial results for products and the hyperbolic 3‐space ."}],"department":[{"_id":"548"}],"user_id":"109467","_id":"64569","language":[{"iso":"eng"}]},{"type":"journal_article","status":"public","department":[{"_id":"10"},{"_id":"548"}],"user_id":"109467","_id":"57580","project":[{"name":"TRR 358 - B02: TRR 358 - Spektraltheorie in höherem Rang und unendlichem Volumen (Teilprojekt B02)","_id":"356"}],"related_material":{"link":[{"url":"https://www.sciencedirect.com/science/article/pii/S0022039625010927?via%3Dihub","relation":"confirmation"}]},"publication_status":"published","citation":{"short":"G. Palmirotta, Y. Sire, J.-P. Anker, Journal of Differential Equations (2026).","mla":"Palmirotta, Guendalina, et al. “The Schrödinger Equation with Fractional Laplacian on Hyperbolic Spaces and Homogeneous Trees.” Journal of Differential Equations, Elsevier, 2026, doi:10.1016/j.jde.2025.114065.","bibtex":"@article{Palmirotta_Sire_Anker_2026, title={The Schrödinger equation with fractional Laplacian on hyperbolic spaces and homogeneous trees}, DOI={10.1016/j.jde.2025.114065}, journal={Journal of Differential Equations}, publisher={Elsevier}, author={Palmirotta, Guendalina and Sire, Yannick and Anker, Jean-Philippe}, year={2026} }","ama":"Palmirotta G, Sire Y, Anker J-P. The Schrödinger equation with fractional Laplacian on hyperbolic spaces and homogeneous trees. Journal of Differential Equations. Published online 2026. doi:10.1016/j.jde.2025.114065","apa":"Palmirotta, G., Sire, Y., & Anker, J.-P. (2026). The Schrödinger equation with fractional Laplacian on hyperbolic spaces and homogeneous trees. Journal of Differential Equations. https://doi.org/10.1016/j.jde.2025.114065","ieee":"G. Palmirotta, Y. Sire, and J.-P. Anker, “The Schrödinger equation with fractional Laplacian on hyperbolic spaces and homogeneous trees,” Journal of Differential Equations, 2026, doi: 10.1016/j.jde.2025.114065.","chicago":"Palmirotta, Guendalina, Yannick Sire, and Jean-Philippe Anker. “The Schrödinger Equation with Fractional Laplacian on Hyperbolic Spaces and Homogeneous Trees.” Journal of Differential Equations, 2026. https://doi.org/10.1016/j.jde.2025.114065."},"author":[{"id":"109467","full_name":"Palmirotta, Guendalina","last_name":"Palmirotta","first_name":"Guendalina"},{"full_name":"Sire, Yannick","last_name":"Sire","first_name":"Yannick"},{"full_name":"Anker, Jean-Philippe","last_name":"Anker","first_name":"Jean-Philippe"}],"oa":"1","date_updated":"2026-03-30T12:03:37Z","doi":"10.1016/j.jde.2025.114065","main_file_link":[{"open_access":"1","url":"https://doi.org/10.1016/j.jde.2025.114065"}],"publication":"Journal of Differential Equations","abstract":[{"lang":"eng","text":"We investigate dispersive and Strichartz estimates for the Schrödinger equation involving the fractional Laplacian in real hyperbolic spaces and their discrete analogues, homogeneous trees. Due to the Knapp phenomenon, the Strichartz estimates on Euclidean spaces for the fractional Laplacian exhibit loss of derivatives. A similar phenomenon appears on real hyperbolic spaces. However, such a loss disappears on homogeneous trees, due to the triviality of the estimates for small times."}],"external_id":{"arxiv":["2412.00780"]},"language":[{"iso":"eng"}],"keyword":["Schrödinger equation","Fractional Laplacian","Dispersive estimates","Strichartz estimates","Real hyperbolic spaces","Homogeneous trees"],"year":"2026","date_created":"2024-12-04T16:21:38Z","publisher":"Elsevier","title":"The Schrödinger equation with fractional Laplacian on hyperbolic spaces and homogeneous trees"},{"citation":{"ama":"Arends C, Palmirotta G. Patterson-Sullivan distributions of finite regular graphs. arXiv:260309779. Published online 2026.","chicago":"Arends, Christian, and Guendalina Palmirotta. “Patterson-Sullivan Distributions of Finite Regular Graphs.” ArXiv:2603.09779, 2026.","ieee":"C. Arends and G. Palmirotta, “Patterson-Sullivan distributions of finite regular graphs,” arXiv:2603.09779. 2026.","apa":"Arends, C., & Palmirotta, G. (2026). Patterson-Sullivan distributions of finite regular graphs. In arXiv:2603.09779.","mla":"Arends, Christian, and Guendalina Palmirotta. “Patterson-Sullivan Distributions of Finite Regular Graphs.” ArXiv:2603.09779, 2026.","bibtex":"@article{Arends_Palmirotta_2026, title={Patterson-Sullivan distributions of finite regular graphs}, journal={arXiv:2603.09779}, author={Arends, Christian and Palmirotta, Guendalina}, year={2026} }","short":"C. Arends, G. Palmirotta, ArXiv:2603.09779 (2026)."},"page":"38","year":"2026","main_file_link":[{"open_access":"1","url":"https://arxiv.org/abs/2603.09779"}],"title":"Patterson-Sullivan distributions of finite regular graphs","date_created":"2026-03-30T11:56:04Z","author":[{"full_name":"Arends, Christian","last_name":"Arends","first_name":"Christian"},{"last_name":"Palmirotta","full_name":"Palmirotta, Guendalina","id":"109467","first_name":"Guendalina"}],"oa":"1","date_updated":"2026-03-30T12:02:56Z","status":"public","abstract":[{"text":"On finite regular graphs, we construct Patterson-Sullivan distributions associated with eigenfunctions of the discrete Laplace operator via their boundary values on the phase space. These distributions are closely related to Wigner distributions defined via a pseudo-differential calculus on graphs, which appear naturally in the study of quantum chaos. Using a pairing formula, we prove that Patterson-Sullivan distributions are also related to invariant Ruelle distributions arising from the transfer operator of the geodesic flow on the shift space. Both relationships provide discrete analogues of results for compact hyperbolic surfaces obtained by Anantharaman-Zelditch and by Guillarmou-Hilgert-Weich.","lang":"eng"}],"type":"preprint","publication":"arXiv:2603.09779","language":[{"iso":"eng"}],"user_id":"109467","department":[{"_id":"548"},{"_id":"10"},{"_id":"34"}],"project":[{"name":"TRR 358; TP B04: Geodätische Flüsse und Weyl Kammer Flüsse auf affinen Gebäuden","_id":"358"}],"_id":"65232","external_id":{"arxiv":["2603.09779"]}},{"publication":"arXiv:2411.19782","type":"preprint","abstract":[{"lang":"eng","text":"We prove that the Patterson-Sullivan and Wigner distributions on the unit\r\nsphere bundle of a convex-cocompact hyperbolic surface are asymptotically\r\nidentical. This generalizes results in the compact case by\r\nAnantharaman-Zelditch and Hansen-Hilgert-Schr\\\"oder."}],"status":"public","external_id":{"arxiv":["2411.19782"]},"_id":"58873","project":[{"name":"TRR 358; TP B02: Spektraltheorie in höherem Rang und unendlichem Volumen","_id":"356"}],"department":[{"_id":"548"}],"user_id":"109467","language":[{"iso":"eng"}],"year":"2024","citation":{"apa":"Delarue, B., & Palmirotta, G. (2024). Patterson-Sullivan and Wigner distributions of convex-cocompact hyperbolic surfaces. In arXiv:2411.19782.","mla":"Delarue, Benjamin, and Guendalina Palmirotta. “Patterson-Sullivan and Wigner Distributions of Convex-Cocompact Hyperbolic Surfaces.” ArXiv:2411.19782, 2024.","short":"B. Delarue, G. Palmirotta, ArXiv:2411.19782 (2024).","bibtex":"@article{Delarue_Palmirotta_2024, title={Patterson-Sullivan and Wigner distributions of convex-cocompact hyperbolic surfaces}, journal={arXiv:2411.19782}, author={Delarue, Benjamin and Palmirotta, Guendalina}, year={2024} }","ieee":"B. Delarue and G. Palmirotta, “Patterson-Sullivan and Wigner distributions of convex-cocompact hyperbolic surfaces,” arXiv:2411.19782. 2024.","chicago":"Delarue, Benjamin, and Guendalina Palmirotta. “Patterson-Sullivan and Wigner Distributions of Convex-Cocompact Hyperbolic Surfaces.” ArXiv:2411.19782, 2024.","ama":"Delarue B, Palmirotta G. Patterson-Sullivan and Wigner distributions of convex-cocompact hyperbolic surfaces. arXiv:241119782. Published online 2024."},"date_updated":"2026-03-30T12:01:12Z","author":[{"first_name":"Benjamin","last_name":"Delarue","id":"70575","full_name":"Delarue, Benjamin"},{"full_name":"Palmirotta, Guendalina","id":"109467","last_name":"Palmirotta","first_name":"Guendalina"}],"date_created":"2025-02-28T10:32:30Z","title":"Patterson-Sullivan and Wigner distributions of convex-cocompact hyperbolic surfaces"},{"publication":"Annals of Global Analysis and Geometry","type":"journal_article","status":"public","department":[{"_id":"10"},{"_id":"548"}],"user_id":"109467","_id":"64570","language":[{"iso":"eng"}],"extern":"1","article_number":"9","issue":"1","publication_identifier":{"issn":["0232-704X","1572-9060"]},"publication_status":"published","intvolume":" 63","citation":{"ieee":"M. Olbrich and G. Palmirotta, “Delorme’s intertwining conditions for sections of homogeneous vector bundles on two- and three-dimensional hyperbolic spaces,” Annals of Global Analysis and Geometry, vol. 63, no. 1, Art. no. 9, 2022, doi: 10.1007/s10455-022-09882-w.","chicago":"Olbrich, Martin, and Guendalina Palmirotta. “Delorme’s Intertwining Conditions for Sections of Homogeneous Vector Bundles on Two- and Three-Dimensional Hyperbolic Spaces.” Annals of Global Analysis and Geometry 63, no. 1 (2022). https://doi.org/10.1007/s10455-022-09882-w.","ama":"Olbrich M, Palmirotta G. Delorme’s intertwining conditions for sections of homogeneous vector bundles on two- and three-dimensional hyperbolic spaces. Annals of Global Analysis and Geometry. 2022;63(1). doi:10.1007/s10455-022-09882-w","apa":"Olbrich, M., & Palmirotta, G. (2022). Delorme’s intertwining conditions for sections of homogeneous vector bundles on two- and three-dimensional hyperbolic spaces. Annals of Global Analysis and Geometry, 63(1), Article 9. https://doi.org/10.1007/s10455-022-09882-w","mla":"Olbrich, Martin, and Guendalina Palmirotta. “Delorme’s Intertwining Conditions for Sections of Homogeneous Vector Bundles on Two- and Three-Dimensional Hyperbolic Spaces.” Annals of Global Analysis and Geometry, vol. 63, no. 1, 9, Springer Science and Business Media LLC, 2022, doi:10.1007/s10455-022-09882-w.","short":"M. Olbrich, G. Palmirotta, Annals of Global Analysis and Geometry 63 (2022).","bibtex":"@article{Olbrich_Palmirotta_2022, title={Delorme’s intertwining conditions for sections of homogeneous vector bundles on two- and three-dimensional hyperbolic spaces}, volume={63}, DOI={10.1007/s10455-022-09882-w}, number={19}, journal={Annals of Global Analysis and Geometry}, publisher={Springer Science and Business Media LLC}, author={Olbrich, Martin and Palmirotta, Guendalina}, year={2022} }"},"year":"2022","volume":63,"date_created":"2026-02-20T20:02:50Z","author":[{"first_name":"Martin","last_name":"Olbrich","full_name":"Olbrich, Martin"},{"last_name":"Palmirotta","id":"109467","full_name":"Palmirotta, Guendalina","first_name":"Guendalina"}],"publisher":"Springer Science and Business Media LLC","date_updated":"2026-02-20T20:03:38Z","doi":"10.1007/s10455-022-09882-w","title":"Delorme’s intertwining conditions for sections of homogeneous vector bundles on two- and three-dimensional hyperbolic spaces"},{"year":"2022","issue":"2","title":"A topological Paley-Wiener-Schwartz Theorem for sections of homogeneous vector bundles on $G/K$","publisher":"Heldermann Verlag","date_created":"2026-02-20T20:04:49Z","abstract":[{"text":"We study the Fourier transform for compactly supported distributional sections of complex homogeneous vector bundles on symmetric spaces of non-compact type $X = G/K$. We prove a characterisation of their range. In fact, from Delorme's Paley-Wiener theorem for compactly supported smooth functions on a real reductive group of Harish-Chandra class, we deduce topological Paley-Wiener and Paley-Wiener-Schwartz theorems for sections.","lang":"eng"}],"publication":"Journal of Lie theory","language":[{"iso":"eng"}],"external_id":{"arxiv":["2202.06905"]},"page":"53--384","intvolume":" 34","citation":{"short":"M. Olbrich, G. Palmirotta, Journal of Lie Theory 34 (2022) 53--384.","bibtex":"@article{Olbrich_Palmirotta_2022, title={A topological Paley-Wiener-Schwartz Theorem for sections of homogeneous vector bundles on $G/K$}, volume={34}, number={2}, journal={Journal of Lie theory}, publisher={Heldermann Verlag}, author={Olbrich, Martin and Palmirotta, Guendalina}, year={2022}, pages={53--384} }","mla":"Olbrich, Martin, and Guendalina Palmirotta. “A Topological Paley-Wiener-Schwartz Theorem for Sections of Homogeneous Vector Bundles on $G/K$.” Journal of Lie Theory, vol. 34, no. 2, Heldermann Verlag, 2022, pp. 53--384.","apa":"Olbrich, M., & Palmirotta, G. (2022). A topological Paley-Wiener-Schwartz Theorem for sections of homogeneous vector bundles on $G/K$. Journal of Lie Theory, 34(2), 53--384.","ieee":"M. Olbrich and G. Palmirotta, “A topological Paley-Wiener-Schwartz Theorem for sections of homogeneous vector bundles on $G/K$,” Journal of Lie theory, vol. 34, no. 2, pp. 53--384, 2022.","chicago":"Olbrich, Martin, and Guendalina Palmirotta. “A Topological Paley-Wiener-Schwartz Theorem for Sections of Homogeneous Vector Bundles on $G/K$.” Journal of Lie Theory 34, no. 2 (2022): 53--384.","ama":"Olbrich M, Palmirotta G. A topological Paley-Wiener-Schwartz Theorem for sections of homogeneous vector bundles on $G/K$. Journal of Lie theory. 2022;34(2):53--384."},"publication_status":"published","date_updated":"2026-02-20T20:07:31Z","volume":34,"author":[{"first_name":"Martin","last_name":"Olbrich","full_name":"Olbrich, Martin"},{"last_name":"Palmirotta","id":"109467","full_name":"Palmirotta, Guendalina","first_name":"Guendalina"}],"status":"public","type":"journal_article","extern":"1","_id":"64571","department":[{"_id":"10"},{"_id":"548"}],"user_id":"109467"}]