[{"project":[{"_id":"357","name":"TRR 358: Ganzzahlige Strukturen in Geometrie und Darstellungstheorie"}],"_id":"65073","external_id":{"arxiv":["2603.11232"]},"user_id":"100325","language":[{"iso":"eng"}],"type":"preprint","publication":"2603.11232","abstract":[{"lang":"eng","text":"We study the large-time behavior of the continuous-time heat kernel and of solutions to the heat equation on homogeneous trees. First, we derive sharp asymptotic formulas for the heat kernel as $t\\to\\infty$. Second, using them, we show that solutions with initial data in weighted $\\ell^1$ classes, asymptotically factorize in $\\ell^p$ norms, $p\\in[1,\\infty]$, as the product of the heat kernel, times a $p$-mass function, dependent on the initial condition and $p$. The $p$-mass function is described in terms of boundary averages associated with Busemann functions for $p<2$, while for $p\\ge 2$, it is expressed through convolution with the ground spherical function. For comparison, the case of the integers shows that a single constant mass determines the asymptotics of solutions to the heat equation for all $p$, emphasizing the influence of the graph geometry on heat diffusion."}],"status":"public","date_updated":"2026-03-20T17:55:30Z","author":[{"first_name":"Efthymia","last_name":"Papageorgiou","full_name":"Papageorgiou, Efthymia","id":"100325"}],"date_created":"2026-03-20T17:55:24Z","title":"Long-time asymptotics for the heat kernel and for heat equation solutions on homogeneous trees","year":"2026","citation":{"ama":"Papageorgiou E. Long-time asymptotics for the heat kernel and for heat equation solutions on homogeneous trees. 260311232. Published online 2026.","ieee":"E. Papageorgiou, “Long-time asymptotics for the heat kernel and for heat equation solutions on homogeneous trees,” 2603.11232. 2026.","chicago":"Papageorgiou, Efthymia. “Long-Time Asymptotics for the Heat Kernel and for Heat Equation Solutions on Homogeneous Trees.” 2603.11232, 2026.","apa":"Papageorgiou, E. (2026). Long-time asymptotics for the heat kernel and for heat equation solutions on homogeneous trees. In 2603.11232.","short":"E. Papageorgiou, 2603.11232 (2026).","mla":"Papageorgiou, Efthymia. “Long-Time Asymptotics for the Heat Kernel and for Heat Equation Solutions on Homogeneous Trees.” 2603.11232, 2026.","bibtex":"@article{Papageorgiou_2026, title={Long-time asymptotics for the heat kernel and for heat equation solutions on homogeneous trees}, journal={2603.11232}, author={Papageorgiou, Efthymia}, year={2026} }"}},{"publisher":"Springer Science and Business Media LLC","date_created":"2024-04-17T13:18:30Z","title":"Asymptotic behavior of solutions to the extension problem for the fractional Laplacian on noncompact symmetric spaces","issue":"2","year":"2024","keyword":["Mathematics (miscellaneous)"],"language":[{"iso":"eng"}],"publication":"Journal of Evolution Equations","abstract":[{"lang":"eng","text":"AbstractThis work deals with the extension problem for the fractional Laplacian on Riemannian symmetric spaces G/K of noncompact type and of general rank, which gives rise to a family of convolution operators, including the Poisson operator. More precisely, motivated by Euclidean results for the Poisson semigroup, we study the long-time asymptotic behavior of solutions to the extension problem for $$L^1$$\r\n \r\n L\r\n 1\r\n \r\n initial data. In the case of the Laplace–Beltrami operator, we show that if the initial data are bi-K-invariant, then the solution to the extension problem behaves asymptotically as the mass times the fundamental solution, but this convergence may break down in the non-bi-K-invariant case. In the second part, we investigate the long-time asymptotic behavior of the extension problem associated with the so-called distinguished Laplacian on G/K. In this case, we observe phenomena which are similar to the Euclidean setting for the Poisson semigroup, such as $$L^1$$\r\n \r\n L\r\n 1\r\n \r\n asymptotic convergence without the assumption of bi-K-invariance."}],"date_updated":"2024-04-17T13:20:29Z","author":[{"full_name":"Papageorgiou, Efthymia","id":"100325","last_name":"Papageorgiou","first_name":"Efthymia"}],"volume":24,"doi":"10.1007/s00028-024-00959-6","publication_status":"published","publication_identifier":{"issn":["1424-3199","1424-3202"]},"citation":{"bibtex":"@article{Papageorgiou_2024, title={Asymptotic behavior of solutions to the extension problem for the fractional Laplacian on noncompact symmetric spaces}, volume={24}, DOI={10.1007/s00028-024-00959-6}, number={234}, journal={Journal of Evolution Equations}, publisher={Springer Science and Business Media LLC}, author={Papageorgiou, Efthymia}, year={2024} }","mla":"Papageorgiou, Efthymia. “Asymptotic Behavior of Solutions to the Extension Problem for the Fractional Laplacian on Noncompact Symmetric Spaces.” Journal of Evolution Equations, vol. 24, no. 2, 34, Springer Science and Business Media LLC, 2024, doi:10.1007/s00028-024-00959-6.","short":"E. Papageorgiou, Journal of Evolution Equations 24 (2024).","apa":"Papageorgiou, E. (2024). Asymptotic behavior of solutions to the extension problem for the fractional Laplacian on noncompact symmetric spaces. Journal of Evolution Equations, 24(2), Article 34. https://doi.org/10.1007/s00028-024-00959-6","ama":"Papageorgiou E. Asymptotic behavior of solutions to the extension problem for the fractional Laplacian on noncompact symmetric spaces. Journal of Evolution Equations. 2024;24(2). doi:10.1007/s00028-024-00959-6","chicago":"Papageorgiou, Efthymia. “Asymptotic Behavior of Solutions to the Extension Problem for the Fractional Laplacian on Noncompact Symmetric Spaces.” Journal of Evolution Equations 24, no. 2 (2024). https://doi.org/10.1007/s00028-024-00959-6.","ieee":"E. Papageorgiou, “Asymptotic behavior of solutions to the extension problem for the fractional Laplacian on noncompact symmetric spaces,” Journal of Evolution Equations, vol. 24, no. 2, Art. no. 34, 2024, doi: 10.1007/s00028-024-00959-6."},"intvolume":" 24","_id":"53542","user_id":"100325","department":[{"_id":"555"}],"article_number":"34","type":"journal_article","status":"public"},{"date_updated":"2024-04-17T13:14:23Z","publisher":"Springer International Publishing","author":[{"first_name":"Alexander","full_name":"Grigor'yan, Alexander","last_name":"Grigor'yan"},{"first_name":"Efthymia","full_name":"Papageorgiou, Efthymia","id":"100325","last_name":"Papageorgiou"},{"full_name":"Zhang, Hong-Wei","last_name":"Zhang","first_name":"Hong-Wei"}],"date_created":"2024-04-17T13:11:15Z","title":"Asymptotic Behavior of the Heat Semigroup on Certain Riemannian Manifolds","doi":"10.1007/978-3-031-37800-3","publication_identifier":{"isbn":["9783031377990","9783031378003"],"issn":["2296-5009","2296-5017"]},"publication_status":"published","place":"Cham","year":"2023","citation":{"apa":"Grigor’yan, A., Papageorgiou, E., & Zhang, H.-W. (2023). Asymptotic Behavior of the Heat Semigroup on Certain Riemannian Manifolds. In P. Alonso Ruiz, M. Hinz, K. A. Okoudjou, L. G. Rogers, & A. Teplyaev (Eds.), From Classical Analysis to Analysis on Fractals. A Tribute to Robert Strichartz, Volume 1. Springer International Publishing. https://doi.org/10.1007/978-3-031-37800-3","mla":"Grigor’yan, Alexander, et al. “Asymptotic Behavior of the Heat Semigroup on Certain Riemannian Manifolds.” From Classical Analysis to Analysis on Fractals. A Tribute to Robert Strichartz, Volume 1, edited by Patricia Alonso Ruiz et al., Springer International Publishing, 2023, doi:10.1007/978-3-031-37800-3.","bibtex":"@inbook{Grigor’yan_Papageorgiou_Zhang_2023, place={Cham}, title={Asymptotic Behavior of the Heat Semigroup on Certain Riemannian Manifolds}, DOI={10.1007/978-3-031-37800-3}, booktitle={From Classical Analysis to Analysis on Fractals. A Tribute to Robert Strichartz, Volume 1}, publisher={Springer International Publishing}, author={Grigor’yan, Alexander and Papageorgiou, Efthymia and Zhang, Hong-Wei}, editor={Alonso Ruiz, Patricia and Hinz, Michael and Okoudjou, Kasso A. and Rogers, Luke G. and Teplyaev, Alexander}, year={2023} }","short":"A. Grigor’yan, E. Papageorgiou, H.-W. Zhang, in: P. Alonso Ruiz, M. Hinz, K.A. Okoudjou, L.G. Rogers, A. Teplyaev (Eds.), From Classical Analysis to Analysis on Fractals. A Tribute to Robert Strichartz, Volume 1, Springer International Publishing, Cham, 2023.","chicago":"Grigor’yan, Alexander, Efthymia Papageorgiou, and Hong-Wei Zhang. “Asymptotic Behavior of the Heat Semigroup on Certain Riemannian Manifolds.” In From Classical Analysis to Analysis on Fractals. A Tribute to Robert Strichartz, Volume 1, edited by Patricia Alonso Ruiz, Michael Hinz, Kasso A. Okoudjou, Luke G. Rogers, and Alexander Teplyaev. Cham: Springer International Publishing, 2023. https://doi.org/10.1007/978-3-031-37800-3.","ieee":"A. Grigor’yan, E. Papageorgiou, and H.-W. Zhang, “Asymptotic Behavior of the Heat Semigroup on Certain Riemannian Manifolds,” in From Classical Analysis to Analysis on Fractals. A Tribute to Robert Strichartz, Volume 1, P. Alonso Ruiz, M. Hinz, K. A. Okoudjou, L. G. Rogers, and A. Teplyaev, Eds. Cham: Springer International Publishing, 2023.","ama":"Grigor’yan A, Papageorgiou E, Zhang H-W. Asymptotic Behavior of the Heat Semigroup on Certain Riemannian Manifolds. In: Alonso Ruiz P, Hinz M, Okoudjou KA, Rogers LG, Teplyaev A, eds. From Classical Analysis to Analysis on Fractals. A Tribute to Robert Strichartz, Volume 1. Springer International Publishing; 2023. doi:10.1007/978-3-031-37800-3"},"_id":"53537","user_id":"100325","language":[{"iso":"eng"}],"publication":"From Classical Analysis to Analysis on Fractals. A Tribute to Robert Strichartz, Volume 1","type":"book_chapter","editor":[{"last_name":"Alonso Ruiz","full_name":"Alonso Ruiz, Patricia","first_name":"Patricia"},{"last_name":"Hinz","full_name":"Hinz, Michael","first_name":"Michael"},{"first_name":"Kasso A.","last_name":"Okoudjou","full_name":"Okoudjou, Kasso A."},{"first_name":"Luke G.","last_name":"Rogers","full_name":"Rogers, Luke G."},{"first_name":"Alexander","last_name":"Teplyaev","full_name":"Teplyaev, Alexander"}],"status":"public"},{"language":[{"iso":"eng"}],"keyword":["Analysis"],"user_id":"100325","department":[{"_id":"555"}],"_id":"53540","status":"public","abstract":[{"text":"AbstractThis note is concerned with two families of operators related to the fractional Laplacian, the first arising from the Caffarelli-Silvestre extension problem and the second from the fractional heat equation. They both include the Poisson semigroup. We show that on a complete, connected, and non-compact Riemannian manifold of non-negative Ricci curvature, in both cases, the solution with $$L^1$$\r\n \r\n L\r\n 1\r\n \r\n initial data behaves asymptotically as the mass times the fundamental solution. Similar long-time convergence results remain valid on more general manifolds satisfying the Li-Yau two-sided estimate of the heat kernel. The situation changes drastically on hyperbolic space, and more generally on rank one non-compact symmetric spaces: we show that for the Poisson semigroup, the convergence to the Poisson kernel fails -but remains true under the additional assumption of radial initial data.","lang":"eng"}],"type":"journal_article","publication":"Potential Analysis","doi":"10.1007/s11118-023-10109-1","title":"Large-Time Behavior of Two Families of Operators Related to the Fractional Laplacian on Certain Riemannian Manifolds","author":[{"first_name":"Efthymia","last_name":"Papageorgiou","id":"100325","full_name":"Papageorgiou, Efthymia"}],"date_created":"2024-04-17T13:17:37Z","publisher":"Springer Science and Business Media LLC","date_updated":"2024-04-17T13:19:59Z","citation":{"ieee":"E. Papageorgiou, “Large-Time Behavior of Two Families of Operators Related to the Fractional Laplacian on Certain Riemannian Manifolds,” Potential Analysis, 2023, doi: 10.1007/s11118-023-10109-1.","chicago":"Papageorgiou, Efthymia. “Large-Time Behavior of Two Families of Operators Related to the Fractional Laplacian on Certain Riemannian Manifolds.” Potential Analysis, 2023. https://doi.org/10.1007/s11118-023-10109-1.","ama":"Papageorgiou E. Large-Time Behavior of Two Families of Operators Related to the Fractional Laplacian on Certain Riemannian Manifolds. Potential Analysis. Published online 2023. doi:10.1007/s11118-023-10109-1","bibtex":"@article{Papageorgiou_2023, title={Large-Time Behavior of Two Families of Operators Related to the Fractional Laplacian on Certain Riemannian Manifolds}, DOI={10.1007/s11118-023-10109-1}, journal={Potential Analysis}, publisher={Springer Science and Business Media LLC}, author={Papageorgiou, Efthymia}, year={2023} }","short":"E. Papageorgiou, Potential Analysis (2023).","mla":"Papageorgiou, Efthymia. “Large-Time Behavior of Two Families of Operators Related to the Fractional Laplacian on Certain Riemannian Manifolds.” Potential Analysis, Springer Science and Business Media LLC, 2023, doi:10.1007/s11118-023-10109-1.","apa":"Papageorgiou, E. (2023). Large-Time Behavior of Two Families of Operators Related to the Fractional Laplacian on Certain Riemannian Manifolds. Potential Analysis. https://doi.org/10.1007/s11118-023-10109-1"},"year":"2023","publication_status":"published","publication_identifier":{"issn":["0926-2601","1572-929X"]}},{"publisher":"Springer Science and Business Media LLC","date_updated":"2024-04-17T13:17:10Z","author":[{"full_name":"Papageorgiou, Efthymia","id":"100325","last_name":"Papageorgiou","first_name":"Efthymia"}],"date_created":"2024-04-17T13:16:39Z","title":"Asymptotics for the infinite Brownian loop on noncompact symmetric spaces","doi":"10.1007/s41808-023-00250-8","publication_status":"published","publication_identifier":{"issn":["2296-9020","2296-9039"]},"year":"2023","citation":{"apa":"Papageorgiou, E. (2023). Asymptotics for the infinite Brownian loop on noncompact symmetric spaces. Journal of Elliptic and Parabolic Equations. https://doi.org/10.1007/s41808-023-00250-8","mla":"Papageorgiou, Efthymia. “Asymptotics for the Infinite Brownian Loop on Noncompact Symmetric Spaces.” Journal of Elliptic and Parabolic Equations, Springer Science and Business Media LLC, 2023, doi:10.1007/s41808-023-00250-8.","bibtex":"@article{Papageorgiou_2023, title={Asymptotics for the infinite Brownian loop on noncompact symmetric spaces}, DOI={10.1007/s41808-023-00250-8}, journal={Journal of Elliptic and Parabolic Equations}, publisher={Springer Science and Business Media LLC}, author={Papageorgiou, Efthymia}, year={2023} }","short":"E. Papageorgiou, Journal of Elliptic and Parabolic Equations (2023).","ama":"Papageorgiou E. Asymptotics for the infinite Brownian loop on noncompact symmetric spaces. Journal of Elliptic and Parabolic Equations. Published online 2023. doi:10.1007/s41808-023-00250-8","ieee":"E. Papageorgiou, “Asymptotics for the infinite Brownian loop on noncompact symmetric spaces,” Journal of Elliptic and Parabolic Equations, 2023, doi: 10.1007/s41808-023-00250-8.","chicago":"Papageorgiou, Efthymia. “Asymptotics for the Infinite Brownian Loop on Noncompact Symmetric Spaces.” Journal of Elliptic and Parabolic Equations, 2023. https://doi.org/10.1007/s41808-023-00250-8."},"_id":"53539","user_id":"100325","department":[{"_id":"555"}],"keyword":["Applied Mathematics","Numerical Analysis","Analysis"],"language":[{"iso":"eng"}],"type":"journal_article","publication":"Journal of Elliptic and Parabolic Equations","abstract":[{"lang":"eng","text":"AbstractThe infinite Brownian loop on a Riemannian manifold is the limit in distribution of the Brownian bridge of length T around a fixed origin when $$T \\rightarrow +\\infty $$\r\n \r\n T\r\n →\r\n +\r\n ∞\r\n \r\n . The aim of this note is to study its long-time asymptotics on Riemannian symmetric spaces G/K of noncompact type and of general rank. This amounts to the behavior of solutions to the heat equation subject to the Doob transform induced by the ground spherical function. Unlike the standard Brownian motion, we observe in this case phenomena which are similar to the Euclidean setting, namely $$L^1$$\r\n \r\n L\r\n 1\r\n \r\n asymptotic convergence without requiring bi-K-invariance for initial data, and strong $$L^{\\infty }$$\r\n \r\n L\r\n ∞\r\n \r\n convergence."}],"status":"public"},{"year":"2023","citation":{"ieee":"G. Polychrou, E. Papageorgiou, A. Fotiadis, and C. Daskaloyannis, “New examples of harmonic maps to the hyperbolic plane via Bäcklund transformation,” Revista Matemática Complutense, 2023, doi: 10.1007/s13163-023-00476-z.","chicago":"Polychrou, G., Efthymia Papageorgiou, A. Fotiadis, and C. Daskaloyannis. “New Examples of Harmonic Maps to the Hyperbolic Plane via Bäcklund Transformation.” Revista Matemática Complutense, 2023. https://doi.org/10.1007/s13163-023-00476-z.","ama":"Polychrou G, Papageorgiou E, Fotiadis A, Daskaloyannis C. New examples of harmonic maps to the hyperbolic plane via Bäcklund transformation. Revista Matemática Complutense. Published online 2023. doi:10.1007/s13163-023-00476-z","apa":"Polychrou, G., Papageorgiou, E., Fotiadis, A., & Daskaloyannis, C. (2023). New examples of harmonic maps to the hyperbolic plane via Bäcklund transformation. Revista Matemática Complutense. https://doi.org/10.1007/s13163-023-00476-z","mla":"Polychrou, G., et al. “New Examples of Harmonic Maps to the Hyperbolic Plane via Bäcklund Transformation.” Revista Matemática Complutense, Springer Science and Business Media LLC, 2023, doi:10.1007/s13163-023-00476-z.","short":"G. Polychrou, E. Papageorgiou, A. Fotiadis, C. Daskaloyannis, Revista Matemática Complutense (2023).","bibtex":"@article{Polychrou_Papageorgiou_Fotiadis_Daskaloyannis_2023, title={New examples of harmonic maps to the hyperbolic plane via Bäcklund transformation}, DOI={10.1007/s13163-023-00476-z}, journal={Revista Matemática Complutense}, publisher={Springer Science and Business Media LLC}, author={Polychrou, G. and Papageorgiou, Efthymia and Fotiadis, A. and Daskaloyannis, C.}, year={2023} }"},"publication_status":"published","publication_identifier":{"issn":["1139-1138","1988-2807"]},"title":"New examples of harmonic maps to the hyperbolic plane via Bäcklund transformation","doi":"10.1007/s13163-023-00476-z","publisher":"Springer Science and Business Media LLC","date_updated":"2024-04-17T13:15:51Z","date_created":"2024-04-17T13:15:07Z","author":[{"last_name":"Polychrou","full_name":"Polychrou, G.","first_name":"G."},{"last_name":"Papageorgiou","id":"100325","full_name":"Papageorgiou, Efthymia","first_name":"Efthymia"},{"first_name":"A.","full_name":"Fotiadis, A.","last_name":"Fotiadis"},{"first_name":"C.","full_name":"Daskaloyannis, C.","last_name":"Daskaloyannis"}],"abstract":[{"text":"AbstractWe study harmonic maps from a subset of the complex plane to a subset of the hyperbolic plane. In Fotiadis and Daskaloyannis (Nonlinear Anal 214, 112546, 2022), harmonic maps are related to the sinh-Gordon equation and a Bäcklund transformation is introduced, which connects solutions of the sinh-Gordon and sine-Gordon equation. We develop this machinery in order to construct new harmonic maps to the hyperbolic plane.","lang":"eng"}],"status":"public","type":"journal_article","publication":"Revista Matemática Complutense","keyword":["General Mathematics"],"language":[{"iso":"eng"}],"_id":"53538","user_id":"100325","department":[{"_id":"555"}]}]