[{"author":[{"id":"220","full_name":"Hilgert, Joachim","first_name":"Joachim","last_name":"Hilgert"}],"title":"Procesi, C. Lie Groups (Springer, 2007)","year":"2007","status":"public","publication_status":"published","date_updated":"2024-02-20T13:43:15Z","language":[{"iso":"eng"}],"_id":"51600","user_id":"49063","citation":{"mla":"Hilgert, Joachim. “Procesi, C. Lie Groups (Springer, 2007).” <i>JBer. DMV</i>, 2007.","ama":"Hilgert J. Procesi, C. Lie Groups (Springer, 2007). <i>JBer DMV</i>. Published online 2007.","bibtex":"@article{Hilgert_2007, title={Procesi, C. Lie Groups (Springer, 2007)}, journal={JBer. DMV}, author={Hilgert, Joachim}, year={2007} }","apa":"Hilgert, J. (2007). Procesi, C. Lie Groups (Springer, 2007). In <i>JBer. DMV</i>.","ieee":"J. Hilgert, “Procesi, C. Lie Groups (Springer, 2007),” <i>JBer. DMV</i>. 2007.","short":"J. Hilgert, JBer. DMV (2007).","chicago":"Hilgert, Joachim. “Procesi, C. Lie Groups (Springer, 2007).” <i>JBer. DMV</i>, 2007."},"publication":"JBer. DMV","date_created":"2024-02-20T13:42:12Z","department":[{"_id":"91"}],"type":"review"},{"date_created":"2024-02-20T10:32:31Z","type":"review","department":[{"_id":"91"}],"publication":"JBer. DMV","citation":{"ama":"Hilgert J. Adler, M., P. Moerbeke, P. Vanhaecke. Algebraic integrability, Painlevé geometry and Lie algebras (Springer, 2004). <i>JBer DMV</i>. 2006;108.","bibtex":"@article{Hilgert_2006, title={Adler, M., P. Moerbeke, P. Vanhaecke. Algebraic integrability, Painlevé geometry and Lie algebras (Springer, 2004)}, volume={108}, journal={JBer. DMV}, author={Hilgert, Joachim}, year={2006} }","mla":"Hilgert, Joachim. “Adler, M., P. Moerbeke, P. Vanhaecke. Algebraic Integrability, Painlevé Geometry and Lie Algebras (Springer, 2004).” <i>JBer. DMV</i>, vol. 108, 2006.","short":"J. Hilgert, JBer. DMV 108 (2006).","chicago":"Hilgert, Joachim. “Adler, M., P. Moerbeke, P. Vanhaecke. Algebraic Integrability, Painlevé Geometry and Lie Algebras (Springer, 2004).” <i>JBer. DMV</i>, 2006.","apa":"Hilgert, J. (2006). Adler, M., P. Moerbeke, P. Vanhaecke. Algebraic integrability, Painlevé geometry and Lie algebras (Springer, 2004). In <i>JBer. DMV</i> (Vol. 108).","ieee":"J. Hilgert, “Adler, M., P. Moerbeke, P. Vanhaecke. Algebraic integrability, Painlevé geometry and Lie algebras (Springer, 2004),” <i>JBer. DMV</i>, vol. 108. 2006."},"extern":"1","language":[{"iso":"eng"}],"_id":"51577","user_id":"49063","volume":108,"title":"Adler, M., P. Moerbeke, P. Vanhaecke. Algebraic integrability, Painlevé geometry and Lie algebras (Springer, 2004)","year":"2006","status":"public","author":[{"id":"220","full_name":"Hilgert, Joachim","first_name":"Joachim","last_name":"Hilgert"}],"publication_status":"published","date_updated":"2024-02-20T13:26:12Z","intvolume":"       108"},{"title":"Stroppel, M. Topological groups (EMS, 2006)","status":"public","year":"2006","author":[{"full_name":"Hilgert, Joachim","last_name":"Hilgert","first_name":"Joachim","id":"220"}],"publication_status":"published","date_updated":"2024-02-20T13:41:49Z","_id":"51599","language":[{"iso":"eng"}],"user_id":"49063","publication":"Zentralblatt für Math.","citation":{"ieee":"J. Hilgert, “Stroppel, M. Topological groups (EMS, 2006),” <i>Zentralblatt für Math.</i> 2006.","apa":"Hilgert, J. (2006). Stroppel, M. Topological groups (EMS, 2006). In <i>Zentralblatt für Math.</i>","short":"J. Hilgert, Zentralblatt Für Math. (2006).","chicago":"Hilgert, Joachim. “Stroppel, M. Topological Groups (EMS, 2006).” <i>Zentralblatt Für Math.</i>, 2006.","mla":"Hilgert, Joachim. “Stroppel, M. Topological Groups (EMS, 2006).” <i>Zentralblatt Für Math.</i>, 2006.","bibtex":"@article{Hilgert_2006, title={Stroppel, M. Topological groups (EMS, 2006)}, journal={Zentralblatt für Math.}, author={Hilgert, Joachim}, year={2006} }","ama":"Hilgert J. Stroppel, M. Topological groups (EMS, 2006). <i>Zentralblatt für Math</i>. Published online 2006."},"extern":"1","date_created":"2024-02-20T13:41:37Z","type":"review","department":[{"_id":"91"}]},{"citation":{"ieee":"J. Hilgert, “An Ergodic Arnold-Liouville Theorem for Symmetric Spaces,” in <i>Twenty Years of Bialowieza: A Mathematical Antology</i>, S. T. Ali and et al., Eds. Singapore: World Scientific, 2005.","apa":"Hilgert, J. (2005). An Ergodic Arnold-Liouville Theorem for Symmetric Spaces. In S. T. Ali &#38; et al. (Eds.), <i>Twenty Years of Bialowieza: A Mathematical Antology</i>. World Scientific.","chicago":"Hilgert, Joachim. “An Ergodic Arnold-Liouville Theorem for Symmetric Spaces.” In <i>Twenty Years of Bialowieza: A Mathematical Antology</i>, edited by S.T. Ali and et al. Singapore: World Scientific, 2005.","short":"J. Hilgert, in: S.T. Ali, et al. (Eds.), Twenty Years of Bialowieza: A Mathematical Antology, World Scientific, Singapore, 2005.","mla":"Hilgert, Joachim. “An Ergodic Arnold-Liouville Theorem for Symmetric Spaces.” <i>Twenty Years of Bialowieza: A Mathematical Antology</i>, edited by S.T. Ali and et al., World Scientific, 2005.","bibtex":"@inbook{Hilgert_2005, place={Singapore}, title={An Ergodic Arnold-Liouville Theorem for Symmetric Spaces}, booktitle={Twenty Years of Bialowieza: A Mathematical Antology}, publisher={World Scientific}, author={Hilgert, Joachim}, editor={Ali, S.T. and et al.}, year={2005} }","ama":"Hilgert J. An Ergodic Arnold-Liouville Theorem for Symmetric Spaces. In: Ali ST, et al., eds. <i>Twenty Years of Bialowieza: A Mathematical Antology</i>. World Scientific; 2005."},"publication":"Twenty Years of Bialowieza: A Mathematical Antology","extern":"1","place":"Singapore","date_created":"2024-02-19T08:13:30Z","department":[{"_id":"91"}],"type":"book_chapter","corporate_editor":["et al."],"author":[{"id":"220","full_name":"Hilgert, Joachim","first_name":"Joachim","last_name":"Hilgert"}],"status":"public","year":"2005","title":"An Ergodic Arnold-Liouville Theorem for Symmetric Spaces","date_updated":"2024-02-20T13:26:21Z","publication_status":"published","_id":"51468","publisher":"World Scientific","language":[{"iso":"eng"}],"editor":[{"full_name":"Ali, S.T.","first_name":"S.T.","last_name":"Ali"}],"user_id":"49063"},{"publication":"Math. Proc. Camb. Phil. Soc.","citation":{"chicago":"Hilgert, Joachim, H. Movasati, and D. Mayer. “Transfer Operators for Gamma_0(n) and the Hecke Operators for the Period Functions of PSL(2,Z).” <i>Math. Proc. Camb. Phil. Soc.</i> 139 (2005): 81–116.","short":"J. Hilgert, H. Movasati, D. Mayer, Math. Proc. Camb. Phil. Soc. 139 (2005) 81–116.","apa":"Hilgert, J., Movasati, H., &#38; Mayer, D. (2005). Transfer Operators for Gamma_0(n) and the Hecke Operators for the Period Functions of PSL(2,Z). <i>Math. Proc. Camb. Phil. Soc.</i>, <i>139</i>, 81–116.","ieee":"J. Hilgert, H. Movasati, and D. Mayer, “Transfer Operators for Gamma_0(n) and the Hecke Operators for the Period Functions of PSL(2,Z),” <i>Math. Proc. Camb. Phil. Soc.</i>, vol. 139, pp. 81–116, 2005.","ama":"Hilgert J, Movasati H, Mayer D. Transfer Operators for Gamma_0(n) and the Hecke Operators for the Period Functions of PSL(2,Z). <i>Math Proc Camb Phil Soc</i>. 2005;139:81-116.","bibtex":"@article{Hilgert_Movasati_Mayer_2005, title={Transfer Operators for Gamma_0(n) and the Hecke Operators for the Period Functions of PSL(2,Z)}, volume={139}, journal={Math. Proc. Camb. Phil. Soc.}, author={Hilgert, Joachim and Movasati, H. and Mayer, D.}, year={2005}, pages={81–116} }","mla":"Hilgert, Joachim, et al. “Transfer Operators for Gamma_0(n) and the Hecke Operators for the Period Functions of PSL(2,Z).” <i>Math. Proc. Camb. Phil. Soc.</i>, vol. 139, 2005, pp. 81–116."},"extern":"1","date_created":"2024-02-19T07:07:51Z","type":"journal_article","department":[{"_id":"91"}],"status":"public","year":"2005","title":"Transfer Operators for Gamma_0(n) and the Hecke Operators for the Period Functions of PSL(2,Z)","author":[{"id":"220","full_name":"Hilgert, Joachim","last_name":"Hilgert","first_name":"Joachim"},{"full_name":"Movasati, H.","last_name":"Movasati","first_name":"H."},{"full_name":"Mayer, D.","last_name":"Mayer","first_name":"D."}],"publication_status":"published","date_updated":"2024-02-20T13:26:28Z","intvolume":"       139","page":"81-116","_id":"51410","language":[{"iso":"eng"}],"user_id":"49063","volume":139},{"intvolume":"       107","date_updated":"2024-02-20T13:26:16Z","publication_status":"published","author":[{"id":"220","full_name":"Hilgert, Joachim","last_name":"Hilgert","first_name":"Joachim"}],"year":"2005","title":"Dungey, N., A. ter Elst, D. Robinson. Analysis on Lie Groups with Polynomial Growth (Birkhäuser, Boston, 2003)","status":"public","volume":107,"user_id":"49063","language":[{"iso":"eng"}],"_id":"51578","extern":"1","citation":{"chicago":"Hilgert, Joachim. “Dungey, N., A. Ter Elst, D. Robinson. Analysis on Lie Groups with Polynomial Growth (Birkhäuser, Boston, 2003).” <i>JBer. DMV</i>, 2005.","short":"J. Hilgert, JBer. DMV 107 (2005).","ama":"Hilgert J. Dungey, N., A. ter Elst, D. Robinson. Analysis on Lie Groups with Polynomial Growth (Birkhäuser, Boston, 2003). <i>JBer DMV</i>. 2005;107.","bibtex":"@article{Hilgert_2005, title={Dungey, N., A. ter Elst, D. Robinson. Analysis on Lie Groups with Polynomial Growth (Birkhäuser, Boston, 2003)}, volume={107}, journal={JBer. DMV}, author={Hilgert, Joachim}, year={2005} }","apa":"Hilgert, J. (2005). Dungey, N., A. ter Elst, D. Robinson. Analysis on Lie Groups with Polynomial Growth (Birkhäuser, Boston, 2003). In <i>JBer. DMV</i> (Vol. 107).","mla":"Hilgert, Joachim. “Dungey, N., A. Ter Elst, D. Robinson. Analysis on Lie Groups with Polynomial Growth (Birkhäuser, Boston, 2003).” <i>JBer. DMV</i>, vol. 107, 2005.","ieee":"J. Hilgert, “Dungey, N., A. ter Elst, D. Robinson. Analysis on Lie Groups with Polynomial Growth (Birkhäuser, Boston, 2003),” <i>JBer. DMV</i>, vol. 107. 2005."},"publication":"JBer. DMV","department":[{"_id":"91"}],"type":"review","date_created":"2024-02-20T12:20:40Z"},{"date_created":"2024-02-19T07:06:23Z","department":[{"_id":"91"}],"type":"journal_article","citation":{"mla":"Hilgert, Joachim, and A. Deitmar. “Cohomology of Arithmetic Groups with Infinite Dimensional Coefficient Spaces.” <i>Documenta Math.</i>, vol. 10, 2005, pp. 199–216.","bibtex":"@article{Hilgert_Deitmar_2005, title={Cohomology of Arithmetic Groups with Infinite Dimensional Coefficient Spaces}, volume={10}, journal={Documenta Math.}, author={Hilgert, Joachim and Deitmar, A.}, year={2005}, pages={199–216} }","ama":"Hilgert J, Deitmar A. Cohomology of Arithmetic Groups with Infinite Dimensional Coefficient Spaces. <i>Documenta Math</i>. 2005;10:199-216.","ieee":"J. Hilgert and A. Deitmar, “Cohomology of Arithmetic Groups with Infinite Dimensional Coefficient Spaces,” <i>Documenta Math.</i>, vol. 10, pp. 199–216, 2005.","apa":"Hilgert, J., &#38; Deitmar, A. (2005). Cohomology of Arithmetic Groups with Infinite Dimensional Coefficient Spaces. <i>Documenta Math.</i>, <i>10</i>, 199–216.","short":"J. Hilgert, A. Deitmar, Documenta Math. 10 (2005) 199–216.","chicago":"Hilgert, Joachim, and A. Deitmar. “Cohomology of Arithmetic Groups with Infinite Dimensional Coefficient Spaces.” <i>Documenta Math.</i> 10 (2005): 199–216."},"publication":"Documenta Math.","extern":"1","language":[{"iso":"eng"}],"_id":"51409","page":"199-216","volume":10,"user_id":"220","author":[{"last_name":"Hilgert","first_name":"Joachim","full_name":"Hilgert, Joachim","id":"220"},{"full_name":"Deitmar, A.","last_name":"Deitmar","first_name":"A."}],"status":"public","year":"2005","title":"Cohomology of Arithmetic Groups with Infinite Dimensional Coefficient Spaces","intvolume":"        10","publication_status":"published","date_updated":"2026-03-31T08:43:19Z"},{"intvolume":"       364","publication_status":"published","date_updated":"2024-02-20T13:27:15Z","corporate_editor":["et al."],"author":[{"full_name":"Hilgert, Joachim","last_name":"Hilgert","first_name":"Joachim","id":"220"},{"full_name":"Mayer, D.","first_name":"D.","last_name":"Mayer"}],"title":"The Dynamical Zeta Function and Transfer Operators for the Kac-Baker Model","status":"public","year":"2004","volume":364,"editor":[{"full_name":"Agranowsky, M.","last_name":"Agranowsky","first_name":"M."}],"user_id":"49063","_id":"51469","series_title":"Contemporary Mathematics","language":[{"iso":"eng"}],"extern":"1","citation":{"short":"J. Hilgert, D. Mayer, in: M. Agranowsky, et al. (Eds.), Complex Analysis and Dynamical Systems, 2004.","chicago":"Hilgert, Joachim, and D. Mayer. “The Dynamical Zeta Function and Transfer Operators for the Kac-Baker Model.” In <i>Complex Analysis and Dynamical Systems</i>, edited by M. Agranowsky and et al., Vol. 364. Contemporary Mathematics, 2004.","apa":"Hilgert, J., &#38; Mayer, D. (2004). The Dynamical Zeta Function and Transfer Operators for the Kac-Baker Model. In M. Agranowsky &#38; et al. (Eds.), <i>Complex Analysis and Dynamical Systems</i> (Vol. 364).","ieee":"J. Hilgert and D. Mayer, “The Dynamical Zeta Function and Transfer Operators for the Kac-Baker Model,” in <i>Complex Analysis and Dynamical Systems</i>, vol. 364, M. Agranowsky and et al., Eds. 2004.","ama":"Hilgert J, Mayer D. The Dynamical Zeta Function and Transfer Operators for the Kac-Baker Model. In: Agranowsky M, et al., eds. <i>Complex Analysis and Dynamical Systems</i>. Vol 364. Contemporary Mathematics. ; 2004.","bibtex":"@inbook{Hilgert_Mayer_2004, series={Contemporary Mathematics}, title={The Dynamical Zeta Function and Transfer Operators for the Kac-Baker Model}, volume={364}, booktitle={Complex Analysis and Dynamical Systems}, author={Hilgert, Joachim and Mayer, D.}, editor={Agranowsky, M. and et al.}, year={2004}, collection={Contemporary Mathematics} }","mla":"Hilgert, Joachim, and D. Mayer. “The Dynamical Zeta Function and Transfer Operators for the Kac-Baker Model.” <i>Complex Analysis and Dynamical Systems</i>, edited by M. Agranowsky and et al., vol. 364, 2004."},"publication":"Complex Analysis and Dynamical Systems","department":[{"_id":"91"}],"type":"book_chapter","date_created":"2024-02-19T08:14:51Z"},{"main_file_link":[{"url":"https://arxiv.org/abs/math/0404067"}],"language":[{"iso":"eng"}],"_id":"51548","user_id":"49063","status":"public","title":"The Lewis Correspondence for submodular groups","year":"2004","author":[{"last_name":"Hilgert","first_name":"Joachim","full_name":"Hilgert, Joachim"},{"full_name":"Deitmar, A.","first_name":"A.","last_name":"Deitmar"}],"date_updated":"2024-02-20T13:27:12Z","publication_status":"published","date_created":"2024-02-20T08:57:12Z","type":"preprint","department":[{"_id":"91"}],"citation":{"mla":"Hilgert, Joachim, and A. Deitmar. <i>The Lewis Correspondence for Submodular Groups</i>. 2004.","bibtex":"@article{Hilgert_Deitmar_2004, title={The Lewis Correspondence for submodular groups}, author={Hilgert, Joachim and Deitmar, A.}, year={2004} }","ama":"Hilgert J, Deitmar A. The Lewis Correspondence for submodular groups. Published online 2004.","ieee":"J. Hilgert and A. Deitmar, “The Lewis Correspondence for submodular groups.” 2004.","apa":"Hilgert, J., &#38; Deitmar, A. (2004). <i>The Lewis Correspondence for submodular groups</i>.","chicago":"Hilgert, Joachim, and A. Deitmar. “The Lewis Correspondence for Submodular Groups,” 2004.","short":"J. Hilgert, A. Deitmar, (2004)."},"extern":"1"},{"type":"journal_article","department":[{"_id":"91"}],"date_created":"2024-02-19T07:08:38Z","extern":"1","publication":"AMS Translations","citation":{"short":"J. Hilgert, E.B. Vinberg, A. Pasquale, AMS Translations 210 (2003) 135–143.","chicago":"Hilgert, Joachim, E.B. Vinberg, and A. Pasquale. “The Dual Horospherical Radon Transform as a Limit of Spherical Radon Transforms.” <i>AMS Translations</i> 210 (2003): 135–43.","apa":"Hilgert, J., Vinberg, E. B., &#38; Pasquale, A. (2003). The Dual Horospherical Radon Transform as a Limit of Spherical Radon Transforms. <i>AMS Translations</i>, <i>210</i>, 135–143.","ieee":"J. Hilgert, E. B. Vinberg, and A. Pasquale, “The Dual Horospherical Radon Transform as a Limit of Spherical Radon Transforms,” <i>AMS Translations</i>, vol. 210, pp. 135–143, 2003.","ama":"Hilgert J, Vinberg EB, Pasquale A. The Dual Horospherical Radon Transform as a Limit of Spherical Radon Transforms. <i>AMS Translations</i>. 2003;210:135-143.","bibtex":"@article{Hilgert_Vinberg_Pasquale_2003, title={The Dual Horospherical Radon Transform as a Limit of Spherical Radon Transforms}, volume={210}, journal={AMS Translations}, author={Hilgert, Joachim and Vinberg, E.B. and Pasquale, A.}, year={2003}, pages={135–143} }","mla":"Hilgert, Joachim, et al. “The Dual Horospherical Radon Transform as a Limit of Spherical Radon Transforms.” <i>AMS Translations</i>, vol. 210, 2003, pp. 135–43."},"user_id":"49063","volume":210,"page":"135-143","language":[{"iso":"eng"}],"_id":"51411","publication_status":"published","date_updated":"2024-02-20T13:27:50Z","intvolume":"       210","status":"public","title":"The Dual Horospherical Radon Transform as a Limit of Spherical Radon Transforms","year":"2003","author":[{"full_name":"Hilgert, Joachim","first_name":"Joachim","last_name":"Hilgert","id":"220"},{"full_name":"Vinberg, E.B.","first_name":"E.B.","last_name":"Vinberg"},{"last_name":"Pasquale","first_name":"A.","full_name":"Pasquale, A."}]},{"publication":"Handbook on the Heart of Algebra","citation":{"ieee":"J. Hilgert, “Representation Theory of Lie Groups,” in <i>Handbook on the Heart of Algebra</i>, A. V. Mikhalev and G. F. Pilz, Eds. Dordrecht: Kluwer, 2002.","apa":"Hilgert, J. (2002). Representation Theory of Lie Groups. In A. V. Mikhalev &#38; G. F. Pilz (Eds.), <i>Handbook on the Heart of Algebra</i>. Kluwer.","short":"J. Hilgert, in: A.V. Mikhalev, G.F. Pilz (Eds.), Handbook on the Heart of Algebra, Kluwer, Dordrecht, 2002.","chicago":"Hilgert, Joachim. “Representation Theory of Lie Groups.” In <i>Handbook on the Heart of Algebra</i>, edited by A.V. Mikhalev and G.F. Pilz. Dordrecht: Kluwer, 2002.","mla":"Hilgert, Joachim. “Representation Theory of Lie Groups.” <i>Handbook on the Heart of Algebra</i>, edited by A.V. Mikhalev and G.F. Pilz, Kluwer, 2002.","bibtex":"@inbook{Hilgert_2002, place={Dordrecht}, title={Representation Theory of Lie Groups}, booktitle={Handbook on the Heart of Algebra}, publisher={Kluwer}, author={Hilgert, Joachim}, editor={Mikhalev, A.V. and Pilz, G.F.}, year={2002} }","ama":"Hilgert J. Representation Theory of Lie Groups. In: Mikhalev AV, Pilz GF, eds. <i>Handbook on the Heart of Algebra</i>. Kluwer; 2002."},"extern":"1","date_created":"2024-02-19T08:16:04Z","place":"Dordrecht","type":"book_chapter","department":[{"_id":"91"}],"status":"public","title":"Representation Theory of Lie Groups","year":"2002","author":[{"full_name":"Hilgert, Joachim","first_name":"Joachim","last_name":"Hilgert","id":"220"}],"publication_status":"published","date_updated":"2024-02-20T13:28:10Z","_id":"51470","publisher":"Kluwer","language":[{"iso":"eng"}],"user_id":"49063","editor":[{"full_name":"Mikhalev, A.V.","last_name":"Mikhalev","first_name":"A.V."},{"first_name":"G.F.","last_name":"Pilz","full_name":"Pilz, G.F."}]},{"publication_status":"published","date_updated":"2024-02-20T13:28:14Z","author":[{"first_name":"Joachim","last_name":"Hilgert","full_name":"Hilgert, Joachim","id":"220"}],"title":"Lie Groups","year":"2002","status":"public","editor":[{"last_name":"Mikhalev","first_name":"A.V.","full_name":"Mikhalev, A.V."},{"full_name":"Pilz, G.F.","last_name":"Pilz","first_name":"G.F."}],"user_id":"49063","publisher":"Kluwer","_id":"51471","language":[{"iso":"eng"}],"extern":"1","citation":{"ama":"Hilgert J. Lie Groups. In: Mikhalev AV, Pilz GF, eds. <i>Handbook on the Heart of Algebra</i>. Kluwer; 2002.","bibtex":"@inbook{Hilgert_2002, place={Dordrecht}, title={Lie Groups}, booktitle={Handbook on the Heart of Algebra}, publisher={Kluwer}, author={Hilgert, Joachim}, editor={Mikhalev, A.V. and Pilz, G.F.}, year={2002} }","mla":"Hilgert, Joachim. “Lie Groups.” <i>Handbook on the Heart of Algebra</i>, edited by A.V. Mikhalev and G.F. Pilz, Kluwer, 2002.","chicago":"Hilgert, Joachim. “Lie Groups.” In <i>Handbook on the Heart of Algebra</i>, edited by A.V. Mikhalev and G.F. Pilz. Dordrecht: Kluwer, 2002.","short":"J. Hilgert, in: A.V. Mikhalev, G.F. Pilz (Eds.), Handbook on the Heart of Algebra, Kluwer, Dordrecht, 2002.","apa":"Hilgert, J. (2002). Lie Groups. In A. V. Mikhalev &#38; G. F. Pilz (Eds.), <i>Handbook on the Heart of Algebra</i>. Kluwer.","ieee":"J. Hilgert, “Lie Groups,” in <i>Handbook on the Heart of Algebra</i>, A. V. Mikhalev and G. F. Pilz, Eds. Dordrecht: Kluwer, 2002."},"publication":"Handbook on the Heart of Algebra","department":[{"_id":"91"}],"type":"book_chapter","date_created":"2024-02-19T08:17:01Z","place":"Dordrecht"},{"publication_status":"published","date_updated":"2024-02-20T13:28:20Z","intvolume":"       232","year":"2002","status":"public","title":"Transfer Operators and Dynamical Zeta Functions for a Class of Lattice Spin Models","author":[{"id":"220","full_name":"Hilgert, Joachim","first_name":"Joachim","last_name":"Hilgert"},{"full_name":"Mayer, D.","last_name":"Mayer","first_name":"D."}],"user_id":"49063","volume":232,"page":"19-58","language":[{"iso":"eng"}],"_id":"51412","extern":"1","publication":"Commun Math. Phys.","citation":{"chicago":"Hilgert, Joachim, and D. Mayer. “Transfer Operators and Dynamical Zeta Functions for a Class of Lattice Spin Models.” <i>Commun Math. Phys.</i> 232 (2002): 19–58.","short":"J. Hilgert, D. Mayer, Commun Math. Phys. 232 (2002) 19–58.","apa":"Hilgert, J., &#38; Mayer, D. (2002). Transfer Operators and Dynamical Zeta Functions for a Class of Lattice Spin Models. <i>Commun Math. Phys.</i>, <i>232</i>, 19–58.","ieee":"J. Hilgert and D. Mayer, “Transfer Operators and Dynamical Zeta Functions for a Class of Lattice Spin Models,” <i>Commun Math. Phys.</i>, vol. 232, pp. 19–58, 2002.","ama":"Hilgert J, Mayer D. Transfer Operators and Dynamical Zeta Functions for a Class of Lattice Spin Models. <i>Commun Math Phys</i>. 2002;232:19-58.","bibtex":"@article{Hilgert_Mayer_2002, title={Transfer Operators and Dynamical Zeta Functions for a Class of Lattice Spin Models}, volume={232}, journal={Commun Math. Phys.}, author={Hilgert, Joachim and Mayer, D.}, year={2002}, pages={19–58} }","mla":"Hilgert, Joachim, and D. Mayer. “Transfer Operators and Dynamical Zeta Functions for a Class of Lattice Spin Models.” <i>Commun Math. Phys.</i>, vol. 232, 2002, pp. 19–58."},"type":"journal_article","department":[{"_id":"91"}],"date_created":"2024-02-19T07:09:18Z"},{"language":[{"iso":"eng"}],"_id":"51413","page":"113-126","volume":2,"user_id":"49063","author":[{"full_name":"Hilgert, Joachim","last_name":"Hilgert","first_name":"Joachim","id":"220"},{"full_name":"Pasquale, A.","last_name":"Pasquale","first_name":"A."},{"last_name":"Vinberg","first_name":"E.B.","full_name":"Vinberg, E.B."}],"status":"public","title":"The Dual Horospherical Radon Transform for Polynomials","year":"2002","intvolume":"         2","date_updated":"2024-02-20T13:28:17Z","publication_status":"published","date_created":"2024-02-19T07:10:09Z","department":[{"_id":"91"}],"type":"journal_article","citation":{"mla":"Hilgert, Joachim, et al. “The Dual Horospherical Radon Transform for Polynomials.” <i>Moscow Math. J.</i>, vol. 2, 2002, pp. 113–26.","ama":"Hilgert J, Pasquale A, Vinberg EB. The Dual Horospherical Radon Transform for Polynomials. <i>Moscow Math J</i>. 2002;2:113-126.","bibtex":"@article{Hilgert_Pasquale_Vinberg_2002, title={The Dual Horospherical Radon Transform for Polynomials}, volume={2}, journal={Moscow Math. J.}, author={Hilgert, Joachim and Pasquale, A. and Vinberg, E.B.}, year={2002}, pages={113–126} }","apa":"Hilgert, J., Pasquale, A., &#38; Vinberg, E. B. (2002). The Dual Horospherical Radon Transform for Polynomials. <i>Moscow Math. J.</i>, <i>2</i>, 113–126.","ieee":"J. Hilgert, A. Pasquale, and E. B. Vinberg, “The Dual Horospherical Radon Transform for Polynomials,” <i>Moscow Math. J.</i>, vol. 2, pp. 113–126, 2002.","short":"J. Hilgert, A. Pasquale, E.B. Vinberg, Moscow Math. J. 2 (2002) 113–126.","chicago":"Hilgert, Joachim, A. Pasquale, and E.B. Vinberg. “The Dual Horospherical Radon Transform for Polynomials.” <i>Moscow Math. J.</i> 2 (2002): 113–26."},"publication":"Moscow Math. J.","extern":"1"},{"language":[{"iso":"eng"}],"_id":"51579","user_id":"49063","volume":104,"status":"public","year":"2002","title":"Juhl, A. Cohomological Theory of Dynamical Zeta Functions  (Birkhäuser, Boston, 2000)","author":[{"first_name":"Joachim","last_name":"Hilgert","full_name":"Hilgert, Joachim","id":"220"}],"publication_status":"published","date_updated":"2024-02-20T13:28:03Z","intvolume":"       104","date_created":"2024-02-20T12:21:29Z","type":"review","department":[{"_id":"91"}],"publication":"JBer. DMV","citation":{"mla":"Hilgert, Joachim. “Juhl, A. Cohomological Theory of Dynamical Zeta Functions  (Birkhäuser, Boston, 2000).” <i>JBer. DMV</i>, vol. 104, 2002.","bibtex":"@article{Hilgert_2002, title={Juhl, A. Cohomological Theory of Dynamical Zeta Functions  (Birkhäuser, Boston, 2000)}, volume={104}, journal={JBer. DMV}, author={Hilgert, Joachim}, year={2002} }","ama":"Hilgert J. Juhl, A. Cohomological Theory of Dynamical Zeta Functions  (Birkhäuser, Boston, 2000). <i>JBer DMV</i>. 2002;104.","ieee":"J. Hilgert, “Juhl, A. Cohomological Theory of Dynamical Zeta Functions  (Birkhäuser, Boston, 2000),” <i>JBer. DMV</i>, vol. 104. 2002.","apa":"Hilgert, J. (2002). Juhl, A. Cohomological Theory of Dynamical Zeta Functions  (Birkhäuser, Boston, 2000). In <i>JBer. DMV</i> (Vol. 104).","short":"J. Hilgert, JBer. DMV 104 (2002).","chicago":"Hilgert, Joachim. “Juhl, A. Cohomological Theory of Dynamical Zeta Functions  (Birkhäuser, Boston, 2000).” <i>JBer. DMV</i>, 2002."},"extern":"1"},{"language":[{"iso":"eng"}],"_id":"51580","user_id":"49063","volume":64,"title":"Neeb, K.-H. Holomorphy and Convexity in Lie Theory  (De Gruyter, Berlin, 2000)","status":"public","year":"2002","author":[{"id":"220","full_name":"Hilgert, Joachim","last_name":"Hilgert","first_name":"Joachim"}],"publication_status":"published","date_updated":"2024-02-20T13:27:59Z","intvolume":"        64","date_created":"2024-02-20T12:21:58Z","type":"review","department":[{"_id":"91"}],"publication":"Semigroup Forum","citation":{"apa":"Hilgert, J. (2002). Neeb, K.-H. Holomorphy and Convexity in Lie Theory  (De Gruyter, Berlin, 2000). In <i>Semigroup Forum</i> (Vol. 64).","ieee":"J. Hilgert, “Neeb, K.-H. Holomorphy and Convexity in Lie Theory  (De Gruyter, Berlin, 2000),” <i>Semigroup Forum</i>, vol. 64. 2002.","chicago":"Hilgert, Joachim. “Neeb, K.-H. Holomorphy and Convexity in Lie Theory  (De Gruyter, Berlin, 2000).” <i>Semigroup Forum</i>, 2002.","short":"J. Hilgert, Semigroup Forum 64 (2002).","mla":"Hilgert, Joachim. “Neeb, K.-H. Holomorphy and Convexity in Lie Theory  (De Gruyter, Berlin, 2000).” <i>Semigroup Forum</i>, vol. 64, 2002.","ama":"Hilgert J. Neeb, K.-H. Holomorphy and Convexity in Lie Theory  (De Gruyter, Berlin, 2000). <i>Semigroup Forum</i>. 2002;64.","bibtex":"@article{Hilgert_2002, title={Neeb, K.-H. Holomorphy and Convexity in Lie Theory  (De Gruyter, Berlin, 2000)}, volume={64}, journal={Semigroup Forum}, author={Hilgert, Joachim}, year={2002} }"},"extern":"1"},{"date_updated":"2024-02-20T13:27:55Z","publication_status":"published","title":"Geometry and Analysis on Finite- and Infinite-Dimensional Lie Groups","year":"2002","status":"public","editor":[{"last_name":"Hilgert","first_name":"Joachim","full_name":"Hilgert, Joachim","id":"220"},{"full_name":"Strasburger, A.","last_name":"Strasburger","first_name":"A."},{"full_name":"Neeb, K.-H.","first_name":"K.-H.","last_name":"Neeb"},{"last_name":"Wojtynski","first_name":"W.","full_name":"Wojtynski, W."}],"user_id":"49063","_id":"51591","publisher":"Banach Center Publications 55","language":[{"iso":"eng"}],"extern":"1","citation":{"chicago":"Hilgert, Joachim, A. Strasburger, K.-H. Neeb, and W. Wojtynski, eds. <i>Geometry and Analysis on Finite- and Infinite-Dimensional Lie Groups</i>. Banach Center Publications 55, 2002.","short":"J. Hilgert, A. Strasburger, K.-H. Neeb, W. Wojtynski, eds., Geometry and Analysis on Finite- and Infinite-Dimensional Lie Groups, Banach Center Publications 55, 2002.","apa":"Hilgert, J., Strasburger, A., Neeb, K.-H., &#38; Wojtynski, W. (Eds.). (2002). <i>Geometry and Analysis on Finite- and Infinite-Dimensional Lie Groups</i>. Banach Center Publications 55.","ieee":"J. Hilgert, A. Strasburger, K.-H. Neeb, and W. Wojtynski, Eds., <i>Geometry and Analysis on Finite- and Infinite-Dimensional Lie Groups</i>. Banach Center Publications 55, 2002.","ama":"Hilgert J, Strasburger A, Neeb K-H, Wojtynski W, eds. <i>Geometry and Analysis on Finite- and Infinite-Dimensional Lie Groups</i>. Banach Center Publications 55; 2002.","bibtex":"@book{Hilgert_Strasburger_Neeb_Wojtynski_2002, title={Geometry and Analysis on Finite- and Infinite-Dimensional Lie Groups}, publisher={Banach Center Publications 55}, year={2002} }","mla":"Hilgert, Joachim, et al., editors. <i>Geometry and Analysis on Finite- and Infinite-Dimensional Lie Groups</i>. Banach Center Publications 55, 2002."},"department":[{"_id":"91"}],"type":"book_editor","date_created":"2024-02-20T12:45:44Z"},{"volume":11,"user_id":"49063","_id":"51417","language":[{"iso":"eng"}],"page":"415-426","intvolume":"        11","publication_status":"published","date_updated":"2024-02-20T13:28:31Z","author":[{"first_name":"Joachim","last_name":"Hilgert","full_name":"Hilgert, Joachim","id":"220"},{"first_name":"W.","last_name":"Bertram","full_name":"Bertram, W."}],"status":"public","year":"2001","title":"Characterization of the Kantor-Koecher-Tits Algebra by a Generalized Ahlfors Operator","department":[{"_id":"91"}],"type":"journal_article","date_created":"2024-02-19T07:12:21Z","extern":"1","citation":{"ama":"Hilgert J, Bertram W. Characterization of the Kantor-Koecher-Tits Algebra by a Generalized Ahlfors Operator. <i>J Lie Theory</i>. 2001;11:415-426.","bibtex":"@article{Hilgert_Bertram_2001, title={Characterization of the Kantor-Koecher-Tits Algebra by a Generalized Ahlfors Operator}, volume={11}, journal={J. Lie Theory}, author={Hilgert, Joachim and Bertram, W.}, year={2001}, pages={415–426} }","mla":"Hilgert, Joachim, and W. Bertram. “Characterization of the Kantor-Koecher-Tits Algebra by a Generalized Ahlfors Operator.” <i>J. Lie Theory</i>, vol. 11, 2001, pp. 415–26.","short":"J. Hilgert, W. Bertram, J. Lie Theory 11 (2001) 415–426.","chicago":"Hilgert, Joachim, and W. Bertram. “Characterization of the Kantor-Koecher-Tits Algebra by a Generalized Ahlfors Operator.” <i>J. Lie Theory</i> 11 (2001): 415–26.","apa":"Hilgert, J., &#38; Bertram, W. (2001). Characterization of the Kantor-Koecher-Tits Algebra by a Generalized Ahlfors Operator. <i>J. Lie Theory</i>, <i>11</i>, 415–426.","ieee":"J. Hilgert and W. Bertram, “Characterization of the Kantor-Koecher-Tits Algebra by a Generalized Ahlfors Operator,” <i>J. Lie Theory</i>, vol. 11, pp. 415–426, 2001."},"publication":"J. Lie Theory"},{"intvolume":"        11","date_updated":"2024-02-20T13:28:34Z","publication_status":"published","author":[{"last_name":"Hilgert","first_name":"Joachim","full_name":"Hilgert, Joachim","id":"220"},{"full_name":"Neeb, K.-H.","first_name":"K.-H.","last_name":"Neeb"}],"status":"public","title":"Vector Valued Riesz Distributions on Euclidian Jordan Algebras","year":"2001","volume":11,"user_id":"49063","_id":"51416","language":[{"iso":"eng"}],"page":"43-75","extern":"1","citation":{"apa":"Hilgert, J., &#38; Neeb, K.-H. (2001). Vector Valued Riesz Distributions on Euclidian Jordan Algebras. <i>J. Geometric Analysis</i>, <i>11</i>, 43–75.","ieee":"J. Hilgert and K.-H. Neeb, “Vector Valued Riesz Distributions on Euclidian Jordan Algebras,” <i>J. Geometric Analysis</i>, vol. 11, pp. 43–75, 2001.","chicago":"Hilgert, Joachim, and K.-H. Neeb. “Vector Valued Riesz Distributions on Euclidian Jordan Algebras.” <i>J. Geometric Analysis</i> 11 (2001): 43–75.","short":"J. Hilgert, K.-H. Neeb, J. Geometric Analysis 11 (2001) 43–75.","mla":"Hilgert, Joachim, and K. H. Neeb. “Vector Valued Riesz Distributions on Euclidian Jordan Algebras.” <i>J. Geometric Analysis</i>, vol. 11, 2001, pp. 43–75.","ama":"Hilgert J, Neeb K-H. Vector Valued Riesz Distributions on Euclidian Jordan Algebras. <i>J Geometric Analysis</i>. 2001;11:43-75.","bibtex":"@article{Hilgert_Neeb_2001, title={Vector Valued Riesz Distributions on Euclidian Jordan Algebras}, volume={11}, journal={J. Geometric Analysis}, author={Hilgert, Joachim and Neeb, K.-H.}, year={2001}, pages={43–75} }"},"publication":"J. Geometric Analysis","department":[{"_id":"91"}],"type":"journal_article","date_created":"2024-02-19T07:11:43Z"},{"publication":"Univ. Brasov Ser.","citation":{"chicago":"Hilgert, Joachim, and W. Bertram. “Geometry of Symmetric Spaces via Jordan Structures. Bull. Transsilv.” <i>Univ. Brasov Ser.</i> 8 (2001): 7–18.","ama":"Hilgert J, Bertram W. Geometry of Symmetric Spaces via Jordan Structures. Bull. Transsilv. <i>Univ Brasov Ser</i>. 2001;8:7-18.","short":"J. Hilgert, W. Bertram, Univ. Brasov Ser. 8 (2001) 7–18.","bibtex":"@article{Hilgert_Bertram_2001, title={Geometry of Symmetric Spaces via Jordan Structures. Bull. Transsilv}, volume={8}, journal={Univ. Brasov Ser.}, author={Hilgert, Joachim and Bertram, W.}, year={2001}, pages={7–18} }","apa":"Hilgert, J., &#38; Bertram, W. (2001). Geometry of Symmetric Spaces via Jordan Structures. Bull. Transsilv. <i>Univ. Brasov Ser.</i>, <i>8</i>, 7–18.","mla":"Hilgert, Joachim, and W. Bertram. “Geometry of Symmetric Spaces via Jordan Structures. Bull. Transsilv.” <i>Univ. Brasov Ser.</i>, vol. 8, 2001, pp. 7–18.","ieee":"J. Hilgert and W. Bertram, “Geometry of Symmetric Spaces via Jordan Structures. Bull. Transsilv,” <i>Univ. Brasov Ser.</i>, vol. 8, pp. 7–18, 2001."},"extern":"1","date_created":"2024-02-19T07:10:53Z","type":"journal_article","department":[{"_id":"91"}],"year":"2001","title":"Geometry of Symmetric Spaces via Jordan Structures. Bull. Transsilv","status":"public","author":[{"full_name":"Hilgert, Joachim","last_name":"Hilgert","first_name":"Joachim","id":"220"},{"last_name":"Bertram","first_name":"W.","full_name":"Bertram, W."}],"publication_status":"published","date_updated":"2024-02-20T13:28:38Z","intvolume":"         8","page":"7-18","_id":"51414","language":[{"iso":"eng"}],"user_id":"49063","volume":8}]
