---
_id: '63588'
author:
- first_name: Klas
  full_name: Modin, Klas
  last_name: Modin
- first_name: Ali
  full_name: Suri, Ali
  id: '89268'
  last_name: Suri
  orcid: https://orcid.org/0000-0002-9682-9037
citation:
  ama: Modin K, Suri A. Geodesic interpretation of the global quasi-geostrophic equations.
    <i>Calculus of Variations and Partial Differential Equations </i>. 2026;65. doi:<a
    href="https://doi.org/10.1007/s00526-025-03186-0">https://doi.org/10.1007/s00526-025-03186-0</a>
  apa: Modin, K., &#38; Suri, A. (2026). Geodesic interpretation of the global quasi-geostrophic
    equations. <i>Calculus of Variations and Partial Differential Equations </i>,
    <i>65</i>. <a href="https://doi.org/10.1007/s00526-025-03186-0">https://doi.org/10.1007/s00526-025-03186-0</a>
  bibtex: '@article{Modin_Suri_2026, title={Geodesic interpretation of the global
    quasi-geostrophic equations}, volume={65}, DOI={<a href="https://doi.org/10.1007/s00526-025-03186-0">https://doi.org/10.1007/s00526-025-03186-0</a>},
    journal={Calculus of Variations and Partial Differential Equations }, author={Modin,
    Klas and Suri, Ali}, year={2026} }'
  chicago: Modin, Klas, and Ali Suri. “Geodesic Interpretation of the Global Quasi-Geostrophic
    Equations.” <i>Calculus of Variations and Partial Differential Equations </i>
    65 (2026). <a href="https://doi.org/10.1007/s00526-025-03186-0">https://doi.org/10.1007/s00526-025-03186-0</a>.
  ieee: 'K. Modin and A. Suri, “Geodesic interpretation of the global quasi-geostrophic
    equations,” <i>Calculus of Variations and Partial Differential Equations </i>,
    vol. 65, 2026, doi: <a href="https://doi.org/10.1007/s00526-025-03186-0">https://doi.org/10.1007/s00526-025-03186-0</a>.'
  mla: Modin, Klas, and Ali Suri. “Geodesic Interpretation of the Global Quasi-Geostrophic
    Equations.” <i>Calculus of Variations and Partial Differential Equations </i>,
    vol. 65, 2026, doi:<a href="https://doi.org/10.1007/s00526-025-03186-0">https://doi.org/10.1007/s00526-025-03186-0</a>.
  short: K. Modin, A. Suri, Calculus of Variations and Partial Differential Equations  65
    (2026).
date_created: 2026-01-13T10:38:42Z
date_updated: 2026-01-13T10:54:15Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
doi: https://doi.org/10.1007/s00526-025-03186-0
intvolume: '        65'
language:
- iso: eng
publication: 'Calculus of Variations and Partial Differential Equations '
status: public
title: Geodesic interpretation of the global quasi-geostrophic equations
type: journal_article
user_id: '89268'
volume: 65
year: '2026'
...
---
_id: '64290'
article_number: '111382'
author:
- first_name: Milan
  full_name: Niestijl, Milan
  last_name: Niestijl
citation:
  ama: Niestijl M. Holomorphic induction beyond the norm-continuous setting, with
    applications to positive energy representations. <i>Journal of Functional Analysis</i>.
    2026;290(9). doi:<a href="https://doi.org/10.1016/j.jfa.2026.111382">10.1016/j.jfa.2026.111382</a>
  apa: Niestijl, M. (2026). Holomorphic induction beyond the norm-continuous setting,
    with applications to positive energy representations. <i>Journal of Functional
    Analysis</i>, <i>290</i>(9), Article 111382. <a href="https://doi.org/10.1016/j.jfa.2026.111382">https://doi.org/10.1016/j.jfa.2026.111382</a>
  bibtex: '@article{Niestijl_2026, title={Holomorphic induction beyond the norm-continuous
    setting, with applications to positive energy representations}, volume={290},
    DOI={<a href="https://doi.org/10.1016/j.jfa.2026.111382">10.1016/j.jfa.2026.111382</a>},
    number={9111382}, journal={Journal of Functional Analysis}, publisher={Elsevier
    BV}, author={Niestijl, Milan}, year={2026} }'
  chicago: Niestijl, Milan. “Holomorphic Induction beyond the Norm-Continuous Setting,
    with Applications to Positive Energy Representations.” <i>Journal of Functional
    Analysis</i> 290, no. 9 (2026). <a href="https://doi.org/10.1016/j.jfa.2026.111382">https://doi.org/10.1016/j.jfa.2026.111382</a>.
  ieee: 'M. Niestijl, “Holomorphic induction beyond the norm-continuous setting, with
    applications to positive energy representations,” <i>Journal of Functional Analysis</i>,
    vol. 290, no. 9, Art. no. 111382, 2026, doi: <a href="https://doi.org/10.1016/j.jfa.2026.111382">10.1016/j.jfa.2026.111382</a>.'
  mla: Niestijl, Milan. “Holomorphic Induction beyond the Norm-Continuous Setting,
    with Applications to Positive Energy Representations.” <i>Journal of Functional
    Analysis</i>, vol. 290, no. 9, 111382, Elsevier BV, 2026, doi:<a href="https://doi.org/10.1016/j.jfa.2026.111382">10.1016/j.jfa.2026.111382</a>.
  short: M. Niestijl, Journal of Functional Analysis 290 (2026).
date_created: 2026-02-20T09:38:34Z
date_updated: 2026-02-20T09:41:45Z
department:
- _id: '93'
doi: 10.1016/j.jfa.2026.111382
intvolume: '       290'
issue: '9'
language:
- iso: eng
publication: Journal of Functional Analysis
publication_identifier:
  issn:
  - 0022-1236
publication_status: published
publisher: Elsevier BV
status: public
title: Holomorphic induction beyond the norm-continuous setting, with applications
  to positive energy representations
type: journal_article
user_id: '104095'
volume: 290
year: '2026'
...
---
_id: '64629'
author:
- first_name: Helge
  full_name: Glöckner, Helge
  id: '178'
  last_name: Glöckner
- first_name: Karl-Hermann
  full_name: Neeb, Karl-Hermann
  last_name: Neeb
citation:
  ama: Glöckner H, Neeb K-H. Infinite-dimensional Lie groups. Published online 2026.
  apa: Glöckner, H., &#38; Neeb, K.-H. (2026). <i>Infinite-dimensional Lie groups</i>.
  bibtex: '@article{Glöckner_Neeb_2026, title={Infinite-dimensional Lie groups}, author={Glöckner,
    Helge and Neeb, Karl-Hermann}, year={2026} }'
  chicago: Glöckner, Helge, and Karl-Hermann Neeb. “Infinite-Dimensional Lie Groups,”
    2026.
  ieee: H. Glöckner and K.-H. Neeb, “Infinite-dimensional Lie groups.” 2026.
  mla: Glöckner, Helge, and Karl-Hermann Neeb. <i>Infinite-Dimensional Lie Groups</i>.
    2026.
  short: H. Glöckner, K.-H. Neeb, (2026).
date_created: 2026-02-26T06:56:00Z
date_updated: 2026-02-26T06:58:23Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
external_id:
  arxiv:
  - arXiv:2602.12362
language:
- iso: eng
page: '1056'
status: public
title: Infinite-dimensional Lie groups
type: preprint
user_id: '178'
year: '2026'
...
---
_id: '64871'
author:
- first_name: Praful
  full_name: Rahangdale, Praful
  id: '103300'
  last_name: Rahangdale
citation:
  ama: Rahangdale P. Drinfeld correspondence in infinite dimensions. Published online
    2026.
  apa: Rahangdale, P. (2026). <i>Drinfeld correspondence in infinite dimensions</i>.
  bibtex: '@article{Rahangdale_2026, title={Drinfeld correspondence in infinite dimensions},
    author={Rahangdale, Praful}, year={2026} }'
  chicago: Rahangdale, Praful. “Drinfeld Correspondence in Infinite Dimensions,” 2026.
  ieee: P. Rahangdale, “Drinfeld correspondence in infinite dimensions.” 2026.
  mla: Rahangdale, Praful. <i>Drinfeld Correspondence in Infinite Dimensions</i>.
    2026.
  short: P. Rahangdale, (2026).
date_created: 2026-03-09T23:25:29Z
date_updated: 2026-03-09T23:26:46Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
external_id:
  arxiv:
  - ' arXiv:2603.04634'
language:
- iso: eng
status: public
title: Drinfeld correspondence in infinite dimensions
type: preprint
user_id: '178'
year: '2026'
...
---
_id: '65036'
author:
- first_name: Tal
  full_name: Cohen, Tal
  last_name: Cohen
- first_name: Helge
  full_name: Glöckner, Helge
  id: '178'
  last_name: Glöckner
- first_name: Gil
  full_name: Goffer, Gil
  last_name: Goffer
- first_name: Waltraud
  full_name: Lederle, Waltraud
  last_name: Lederle
citation:
  ama: Cohen T, Glöckner H, Goffer G, Lederle W. Compact invariant random subgroups.
    Published online 2026.
  apa: Cohen, T., Glöckner, H., Goffer, G., &#38; Lederle, W. (2026). <i>Compact invariant
    random subgroups</i>.
  bibtex: '@article{Cohen_Glöckner_Goffer_Lederle_2026, title={Compact invariant random
    subgroups}, author={Cohen, Tal and Glöckner, Helge and Goffer, Gil and Lederle,
    Waltraud}, year={2026} }'
  chicago: Cohen, Tal, Helge Glöckner, Gil Goffer, and Waltraud Lederle. “Compact
    Invariant Random Subgroups,” 2026.
  ieee: T. Cohen, H. Glöckner, G. Goffer, and W. Lederle, “Compact invariant random
    subgroups.” 2026.
  mla: Cohen, Tal, et al. <i>Compact Invariant Random Subgroups</i>. 2026.
  short: T. Cohen, H. Glöckner, G. Goffer, W. Lederle, (2026).
date_created: 2026-03-18T02:49:44Z
date_updated: 2026-03-18T02:50:18Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
external_id:
  arxiv:
  - 'arXiv:2603.16022 '
language:
- iso: eng
status: public
title: Compact invariant random subgroups
type: preprint
user_id: '178'
year: '2026'
...
---
_id: '63587'
author:
- first_name: Ali
  full_name: Suri, Ali
  id: '89268'
  last_name: Suri
  orcid: https://orcid.org/0000-0002-9682-9037
citation:
  ama: Suri A. Stochastic Euler-Poincaré reduction for central extension. <i>Differential
    Geometry and its Applications</i>. 2025;101. doi:<a href="https://doi.org/10.1016/j.difgeo.2025.102290">https://doi.org/10.1016/j.difgeo.2025.102290</a>
  apa: Suri, A. (2025). Stochastic Euler-Poincaré reduction for central extension.
    <i>Differential Geometry and Its Applications</i>, <i>101</i>. <a href="https://doi.org/10.1016/j.difgeo.2025.102290">https://doi.org/10.1016/j.difgeo.2025.102290</a>
  bibtex: '@article{Suri_2025, title={Stochastic Euler-Poincaré reduction for central
    extension}, volume={101}, DOI={<a href="https://doi.org/10.1016/j.difgeo.2025.102290">https://doi.org/10.1016/j.difgeo.2025.102290</a>},
    journal={Differential Geometry and its Applications}, publisher={Elsevier}, author={Suri,
    Ali}, year={2025} }'
  chicago: Suri, Ali. “Stochastic Euler-Poincaré Reduction for Central Extension.”
    <i>Differential Geometry and Its Applications</i> 101 (2025). <a href="https://doi.org/10.1016/j.difgeo.2025.102290">https://doi.org/10.1016/j.difgeo.2025.102290</a>.
  ieee: 'A. Suri, “Stochastic Euler-Poincaré reduction for central extension,” <i>Differential
    Geometry and its Applications</i>, vol. 101, 2025, doi: <a href="https://doi.org/10.1016/j.difgeo.2025.102290">https://doi.org/10.1016/j.difgeo.2025.102290</a>.'
  mla: Suri, Ali. “Stochastic Euler-Poincaré Reduction for Central Extension.” <i>Differential
    Geometry and Its Applications</i>, vol. 101, Elsevier, 2025, doi:<a href="https://doi.org/10.1016/j.difgeo.2025.102290">https://doi.org/10.1016/j.difgeo.2025.102290</a>.
  short: A. Suri, Differential Geometry and Its Applications 101 (2025).
date_created: 2026-01-13T10:28:17Z
date_updated: 2026-01-13T10:54:20Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
doi: https://doi.org/10.1016/j.difgeo.2025.102290
intvolume: '       101'
language:
- iso: eng
publication: Differential Geometry and its Applications
publisher: Elsevier
status: public
title: Stochastic Euler-Poincaré reduction for central extension
type: journal_article
user_id: '89268'
volume: 101
year: '2025'
...
---
_id: '63589'
author:
- first_name: Ana Bela
  full_name: Cruzeiro, Ana Bela
  last_name: Cruzeiro
- first_name: Ali
  full_name: Suri, Ali
  id: '89268'
  last_name: Suri
  orcid: https://orcid.org/0000-0002-9682-9037
citation:
  ama: 'Cruzeiro AB, Suri A. Stochastic Perturbation of Geodesics on the Manifold
    of Riemannian Metrics. In: Springer; 2025. doi:<a href="https://doi.org/10.1007/978-3-032-03921-7_41">https://doi.org/10.1007/978-3-032-03921-7_41</a>'
  apa: Cruzeiro, A. B., &#38; Suri, A. (2025). <i>Stochastic Perturbation of Geodesics
    on the Manifold of Riemannian Metrics</i>. <a href="https://doi.org/10.1007/978-3-032-03921-7_41">https://doi.org/10.1007/978-3-032-03921-7_41</a>
  bibtex: '@inproceedings{Cruzeiro_Suri_2025, place={Cham}, title={Stochastic Perturbation
    of Geodesics on the Manifold of Riemannian Metrics}, DOI={<a href="https://doi.org/10.1007/978-3-032-03921-7_41">https://doi.org/10.1007/978-3-032-03921-7_41</a>},
    publisher={Springer}, author={Cruzeiro, Ana Bela and Suri, Ali}, year={2025} }'
  chicago: 'Cruzeiro, Ana Bela, and Ali Suri. “Stochastic Perturbation of Geodesics
    on the Manifold of Riemannian Metrics.” Cham: Springer, 2025. <a href="https://doi.org/10.1007/978-3-032-03921-7_41">https://doi.org/10.1007/978-3-032-03921-7_41</a>.'
  ieee: 'A. B. Cruzeiro and A. Suri, “Stochastic Perturbation of Geodesics on the
    Manifold of Riemannian Metrics,” 2025, doi: <a href="https://doi.org/10.1007/978-3-032-03921-7_41">https://doi.org/10.1007/978-3-032-03921-7_41</a>.'
  mla: Cruzeiro, Ana Bela, and Ali Suri. <i>Stochastic Perturbation of Geodesics on
    the Manifold of Riemannian Metrics</i>. Springer, 2025, doi:<a href="https://doi.org/10.1007/978-3-032-03921-7_41">https://doi.org/10.1007/978-3-032-03921-7_41</a>.
  short: 'A.B. Cruzeiro, A. Suri, in: Springer, Cham, 2025.'
date_created: 2026-01-13T10:48:06Z
date_updated: 2026-01-13T10:54:11Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
doi: https://doi.org/10.1007/978-3-032-03921-7_41
language:
- iso: eng
place: Cham
publication_identifier:
  isbn:
  - 978-3-032-03920-0
publisher: Springer
status: public
title: Stochastic Perturbation of Geodesics on the Manifold of Riemannian Metrics
type: conference
user_id: '89268'
year: '2025'
...
---
_id: '63602'
abstract:
- lang: eng
  text: We show that, on a smoothly paracompact convenient manifold $M$ modeled on
    a convenient space with the bornological approximation property, the dual map
    of a Poisson bracket factors as a smooth section of the vector bundle $L_{skew}^2(T^*M,\mathbb
    R)$.
author:
- first_name: ' P. W.'
  full_name: Michor,  P. W.
  last_name: Michor
- first_name: Praful
  full_name: Rahangdale, Praful
  id: '103300'
  last_name: Rahangdale
citation:
  ama: Michor  P. W., Rahangdale P. Poisson bivectors on infinite dimensional manifolds.
    Published online 2025.
  apa: Michor,  P. W., &#38; Rahangdale, P. (2025). <i>Poisson bivectors on infinite
    dimensional manifolds</i>.
  bibtex: '@article{Michor_Rahangdale_2025, title={Poisson bivectors on infinite dimensional
    manifolds}, author={Michor,  P. W. and Rahangdale, Praful}, year={2025} }'
  chicago: Michor,  P. W., and Praful Rahangdale. “Poisson Bivectors on Infinite Dimensional
    Manifolds,” 2025.
  ieee: P. W. Michor and P. Rahangdale, “Poisson bivectors on infinite dimensional
    manifolds.” 2025.
  mla: Michor,  P. W., and Praful Rahangdale. <i>Poisson Bivectors on Infinite Dimensional
    Manifolds</i>. 2025.
  short: P. W. Michor, P. Rahangdale, (2025).
date_created: 2026-01-14T01:08:37Z
date_updated: 2026-01-14T02:11:51Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
language:
- iso: eng
status: public
title: Poisson bivectors on infinite dimensional manifolds
type: preprint
user_id: '103300'
year: '2025'
...
---
_id: '63649'
article_type: original
author:
- first_name: Helge
  full_name: Glöckner, Helge
  id: '178'
  last_name: Glöckner
- first_name: Alexander
  full_name: Schmeding, Alexander
  last_name: Schmeding
- first_name: Ali
  full_name: Suri, Ali
  id: '89268'
  last_name: Suri
  orcid: https://orcid.org/0000-0002-9682-9037
citation:
  ama: Glöckner H, Schmeding A, Suri A. Manifolds of continuous BV-functions and vector
    measure regularity of Banach–Lie groups. <i>Geometric Mechanics</i>. 2025;01(04):383-437.
    doi:<a href="https://doi.org/10.1142/s2972458925500029">10.1142/s2972458925500029</a>
  apa: Glöckner, H., Schmeding, A., &#38; Suri, A. (2025). Manifolds of continuous
    BV-functions and vector measure regularity of Banach–Lie groups. <i>Geometric
    Mechanics</i>, <i>01</i>(04), 383–437. <a href="https://doi.org/10.1142/s2972458925500029">https://doi.org/10.1142/s2972458925500029</a>
  bibtex: '@article{Glöckner_Schmeding_Suri_2025, title={Manifolds of continuous BV-functions
    and vector measure regularity of Banach–Lie groups}, volume={01}, DOI={<a href="https://doi.org/10.1142/s2972458925500029">10.1142/s2972458925500029</a>},
    number={04}, journal={Geometric Mechanics}, publisher={World Scientific Pub Co
    Pte Ltd}, author={Glöckner, Helge and Schmeding, Alexander and Suri, Ali}, year={2025},
    pages={383–437} }'
  chicago: 'Glöckner, Helge, Alexander Schmeding, and Ali Suri. “Manifolds of Continuous
    BV-Functions and Vector Measure Regularity of Banach–Lie Groups.” <i>Geometric
    Mechanics</i> 01, no. 04 (2025): 383–437. <a href="https://doi.org/10.1142/s2972458925500029">https://doi.org/10.1142/s2972458925500029</a>.'
  ieee: 'H. Glöckner, A. Schmeding, and A. Suri, “Manifolds of continuous BV-functions
    and vector measure regularity of Banach–Lie groups,” <i>Geometric Mechanics</i>,
    vol. 01, no. 04, pp. 383–437, 2025, doi: <a href="https://doi.org/10.1142/s2972458925500029">10.1142/s2972458925500029</a>.'
  mla: Glöckner, Helge, et al. “Manifolds of Continuous BV-Functions and Vector Measure
    Regularity of Banach–Lie Groups.” <i>Geometric Mechanics</i>, vol. 01, no. 04,
    World Scientific Pub Co Pte Ltd, 2025, pp. 383–437, doi:<a href="https://doi.org/10.1142/s2972458925500029">10.1142/s2972458925500029</a>.
  short: H. Glöckner, A. Schmeding, A. Suri, Geometric Mechanics 01 (2025) 383–437.
date_created: 2026-01-16T10:22:21Z
date_updated: 2026-01-16T10:25:34Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
doi: 10.1142/s2972458925500029
intvolume: '         1'
issue: '04'
language:
- iso: eng
page: 383-437
publication: Geometric Mechanics
publication_identifier:
  issn:
  - 2972-4589
  - 2972-4597
publication_status: published
publisher: World Scientific Pub Co Pte Ltd
quality_controlled: '1'
status: public
title: Manifolds of continuous BV-functions and vector measure regularity of Banach–Lie
  groups
type: journal_article
user_id: '178'
volume: '01'
year: '2025'
...
---
_id: '64289'
abstract:
- lang: eng
  text: "<jats:title>Abstract</jats:title>\r\n          <jats:p>Motivated by asymptotic
    symmetry groups in general relativity, we consider projective unitary representations
    <jats:inline-formula>\r\n              <jats:alternatives>\r\n                <jats:tex-math>$$\\overline{\\rho
    }$$</jats:tex-math>\r\n                <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\">\r\n
    \                 <mml:mover>\r\n                    <mml:mi>ρ</mml:mi>\r\n                    <mml:mo>¯</mml:mo>\r\n
    \                 </mml:mover>\r\n                </mml:math>\r\n              </jats:alternatives>\r\n
    \           </jats:inline-formula> of the Lie group <jats:inline-formula>\r\n
    \             <jats:alternatives>\r\n                <jats:tex-math>$${{\\,\\textrm{Diff}\\,}}_c(M)$$</jats:tex-math>\r\n
    \               <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\">\r\n
    \                 <mml:mrow>\r\n                    <mml:msub>\r\n                      <mml:mrow>\r\n
    \                       <mml:mspace/>\r\n                        <mml:mtext>Diff</mml:mtext>\r\n
    \                       <mml:mspace/>\r\n                      </mml:mrow>\r\n
    \                     <mml:mi>c</mml:mi>\r\n                    </mml:msub>\r\n
    \                   <mml:mrow>\r\n                      <mml:mo>(</mml:mo>\r\n
    \                     <mml:mi>M</mml:mi>\r\n                      <mml:mo>)</mml:mo>\r\n
    \                   </mml:mrow>\r\n                  </mml:mrow>\r\n                </mml:math>\r\n
    \             </jats:alternatives>\r\n            </jats:inline-formula> of compactly
    supported diffeomorphisms of a smooth manifold <jats:italic>M</jats:italic> that
    satisfy a so-called generalized positive energy condition. In particular, this
    captures representations that are in a suitable sense compatible with a KMS state
    on the von Neumann algebra generated by <jats:inline-formula>\r\n              <jats:alternatives>\r\n
    \               <jats:tex-math>$$\\overline{\\rho }$$</jats:tex-math>\r\n                <mml:math
    xmlns:mml=\"http://www.w3.org/1998/Math/MathML\">\r\n                  <mml:mover>\r\n
    \                   <mml:mi>ρ</mml:mi>\r\n                    <mml:mo>¯</mml:mo>\r\n
    \                 </mml:mover>\r\n                </mml:math>\r\n              </jats:alternatives>\r\n
    \           </jats:inline-formula>. We show that if <jats:italic>M</jats:italic>
    is connected and <jats:inline-formula>\r\n              <jats:alternatives>\r\n
    \               <jats:tex-math>$$\\dim (M) &gt; 1$$</jats:tex-math>\r\n                <mml:math
    xmlns:mml=\"http://www.w3.org/1998/Math/MathML\">\r\n                  <mml:mrow>\r\n
    \                   <mml:mo>dim</mml:mo>\r\n                    <mml:mo>(</mml:mo>\r\n
    \                   <mml:mi>M</mml:mi>\r\n                    <mml:mo>)</mml:mo>\r\n
    \                   <mml:mo>&gt;</mml:mo>\r\n                    <mml:mn>1</mml:mn>\r\n
    \                 </mml:mrow>\r\n                </mml:math>\r\n              </jats:alternatives>\r\n
    \           </jats:inline-formula>, then any such representation is necessarily
    trivial on the identity component <jats:inline-formula>\r\n              <jats:alternatives>\r\n
    \               <jats:tex-math>$${{\\,\\textrm{Diff}\\,}}_c(M)_0$$</jats:tex-math>\r\n
    \               <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\">\r\n
    \                 <mml:mrow>\r\n                    <mml:msub>\r\n                      <mml:mrow>\r\n
    \                       <mml:mspace/>\r\n                        <mml:mtext>Diff</mml:mtext>\r\n
    \                       <mml:mspace/>\r\n                      </mml:mrow>\r\n
    \                     <mml:mi>c</mml:mi>\r\n                    </mml:msub>\r\n
    \                   <mml:msub>\r\n                      <mml:mrow>\r\n                        <mml:mo>(</mml:mo>\r\n
    \                       <mml:mi>M</mml:mi>\r\n                        <mml:mo>)</mml:mo>\r\n
    \                     </mml:mrow>\r\n                      <mml:mn>0</mml:mn>\r\n
    \                   </mml:msub>\r\n                  </mml:mrow>\r\n                </mml:math>\r\n
    \             </jats:alternatives>\r\n            </jats:inline-formula>. As an
    intermediate step towards this result, we determine the continuous second Lie
    algebra cohomology <jats:inline-formula>\r\n              <jats:alternatives>\r\n
    \               <jats:tex-math>$$H^2_\\textrm{ct}(\\mathcal {X}_c(M), \\mathbb
    {R})$$</jats:tex-math>\r\n                <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\">\r\n
    \                 <mml:mrow>\r\n                    <mml:msubsup>\r\n                      <mml:mi>H</mml:mi>\r\n
    \                     <mml:mtext>ct</mml:mtext>\r\n                      <mml:mn>2</mml:mn>\r\n
    \                   </mml:msubsup>\r\n                    <mml:mrow>\r\n                      <mml:mo>(</mml:mo>\r\n
    \                     <mml:msub>\r\n                        <mml:mi>X</mml:mi>\r\n
    \                       <mml:mi>c</mml:mi>\r\n                      </mml:msub>\r\n
    \                     <mml:mrow>\r\n                        <mml:mo>(</mml:mo>\r\n
    \                       <mml:mi>M</mml:mi>\r\n                        <mml:mo>)</mml:mo>\r\n
    \                     </mml:mrow>\r\n                      <mml:mo>,</mml:mo>\r\n
    \                     <mml:mi>R</mml:mi>\r\n                      <mml:mo>)</mml:mo>\r\n
    \                   </mml:mrow>\r\n                  </mml:mrow>\r\n                </mml:math>\r\n
    \             </jats:alternatives>\r\n            </jats:inline-formula> of the
    Lie algebra of compactly supported vector fields. This is subtly different from
    Gelfand–Fuks cohomology in view of the compact support condition.</jats:p>"
article_number: '45'
author:
- first_name: Bas
  full_name: Janssens, Bas
  last_name: Janssens
- first_name: Milan
  full_name: Niestijl, Milan
  last_name: Niestijl
citation:
  ama: Janssens B, Niestijl M. Generalized Positive Energy Representations of the
    Group of Compactly Supported Diffeomorphisms. <i>Communications in Mathematical
    Physics</i>. 2025;406(2). doi:<a href="https://doi.org/10.1007/s00220-024-05226-w">10.1007/s00220-024-05226-w</a>
  apa: Janssens, B., &#38; Niestijl, M. (2025). Generalized Positive Energy Representations
    of the Group of Compactly Supported Diffeomorphisms. <i>Communications in Mathematical
    Physics</i>, <i>406</i>(2), Article 45. <a href="https://doi.org/10.1007/s00220-024-05226-w">https://doi.org/10.1007/s00220-024-05226-w</a>
  bibtex: '@article{Janssens_Niestijl_2025, title={Generalized Positive Energy Representations
    of the Group of Compactly Supported Diffeomorphisms}, volume={406}, DOI={<a href="https://doi.org/10.1007/s00220-024-05226-w">10.1007/s00220-024-05226-w</a>},
    number={245}, journal={Communications in Mathematical Physics}, publisher={Springer
    Science and Business Media LLC}, author={Janssens, Bas and Niestijl, Milan}, year={2025}
    }'
  chicago: Janssens, Bas, and Milan Niestijl. “Generalized Positive Energy Representations
    of the Group of Compactly Supported Diffeomorphisms.” <i>Communications in Mathematical
    Physics</i> 406, no. 2 (2025). <a href="https://doi.org/10.1007/s00220-024-05226-w">https://doi.org/10.1007/s00220-024-05226-w</a>.
  ieee: 'B. Janssens and M. Niestijl, “Generalized Positive Energy Representations
    of the Group of Compactly Supported Diffeomorphisms,” <i>Communications in Mathematical
    Physics</i>, vol. 406, no. 2, Art. no. 45, 2025, doi: <a href="https://doi.org/10.1007/s00220-024-05226-w">10.1007/s00220-024-05226-w</a>.'
  mla: Janssens, Bas, and Milan Niestijl. “Generalized Positive Energy Representations
    of the Group of Compactly Supported Diffeomorphisms.” <i>Communications in Mathematical
    Physics</i>, vol. 406, no. 2, 45, Springer Science and Business Media LLC, 2025,
    doi:<a href="https://doi.org/10.1007/s00220-024-05226-w">10.1007/s00220-024-05226-w</a>.
  short: B. Janssens, M. Niestijl, Communications in Mathematical Physics 406 (2025).
date_created: 2026-02-20T09:33:11Z
date_updated: 2026-02-20T09:41:41Z
department:
- _id: '93'
doi: 10.1007/s00220-024-05226-w
intvolume: '       406'
issue: '2'
language:
- iso: eng
publication: Communications in Mathematical Physics
publication_identifier:
  issn:
  - 0010-3616
  - 1432-0916
publication_status: published
publisher: Springer Science and Business Media LLC
status: public
title: Generalized Positive Energy Representations of the Group of Compactly Supported
  Diffeomorphisms
type: journal_article
user_id: '104095'
volume: 406
year: '2025'
...
---
_id: '64736'
citation:
  ama: Frahm J, Glöckner H, Hilgert J, Olafsson G, eds. <i>Special Issue of Journal
    of Lie Theory Dedicated to Karl-Hermann Neeb on the Occasion of His 60th Birthday</i>.
    Vol 35.; 2025.
  apa: Special issue of Journal of Lie Theory dedicated to Karl-Hermann Neeb on the
    occasion of his 60th birthday. (2025). In J. Frahm, H. Glöckner, J. Hilgert, &#38;
    G. Olafsson (Eds.), <i>J. Lie Theory</i> (Vol. 35, Issue 4).
  bibtex: '@book{Frahm_Glöckner_Hilgert_Olafsson_2025, title={Special issue of Journal
    of Lie Theory dedicated to Karl-Hermann Neeb on the occasion of his 60th birthday},
    volume={35}, number={4}, journal={J. Lie Theory}, year={2025} }'
  chicago: Frahm, Jan, Helge Glöckner, Joachim Hilgert, and Gestur Olafsson, eds.
    <i>Special Issue of Journal of Lie Theory Dedicated to Karl-Hermann Neeb on the
    Occasion of His 60th Birthday</i>. <i>J. Lie Theory</i>. Vol. 35, 2025.
  ieee: J. Frahm, H. Glöckner, J. Hilgert, and G. Olafsson, Eds., <i>Special issue
    of Journal of Lie Theory dedicated to Karl-Hermann Neeb on the occasion of his
    60th birthday</i>, vol. 35, no. 4. 2025.
  mla: Frahm, Jan, et al., editors. “Special Issue of Journal of Lie Theory Dedicated
    to Karl-Hermann Neeb on the Occasion of His 60th Birthday.” <i>J. Lie Theory</i>,
    vol. 35, no. 4, 2025.
  short: J. Frahm, H. Glöckner, J. Hilgert, G. Olafsson, eds., Special Issue of Journal
    of Lie Theory Dedicated to Karl-Hermann Neeb on the Occasion of His 60th Birthday,
    2025.
date_created: 2026-02-26T17:42:01Z
date_updated: 2026-02-26T17:51:43Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
editor:
- first_name: Jan
  full_name: Frahm, Jan
  last_name: Frahm
- first_name: Helge
  full_name: Glöckner, Helge
  id: '178'
  last_name: Glöckner
- first_name: Joachim
  full_name: Hilgert, Joachim
  id: '220'
  last_name: Hilgert
- first_name: Gestur
  full_name: Olafsson, Gestur
  last_name: Olafsson
intvolume: '        35'
issue: '4'
language:
- iso: eng
publication: J. Lie Theory
quality_controlled: '1'
status: public
title: Special issue of Journal of Lie Theory dedicated to Karl-Hermann Neeb on the
  occasion of his 60th birthday
type: journal_editor
user_id: '178'
volume: 35
year: '2025'
...
---
_id: '64770'
author:
- first_name: Matthieu
  full_name: Pinaud, Matthieu
  last_name: Pinaud
citation:
  ama: Pinaud M. <i>Manifold of Mappings and Regularity Properties of Half-Lie Groups</i>.;
    2025. doi:<a href="https://doi.org/10.17619/UNIPB/1-2211">10.17619/UNIPB/1-2211</a>
  apa: Pinaud, M. (2025). <i>Manifold of mappings and regularity properties of half-Lie
    groups</i>. <a href="https://doi.org/10.17619/UNIPB/1-2211">https://doi.org/10.17619/UNIPB/1-2211</a>
  bibtex: '@book{Pinaud_2025, title={Manifold of mappings and regularity properties
    of half-Lie groups}, DOI={<a href="https://doi.org/10.17619/UNIPB/1-2211">10.17619/UNIPB/1-2211</a>},
    author={Pinaud, Matthieu}, year={2025} }'
  chicago: Pinaud, Matthieu. <i>Manifold of Mappings and Regularity Properties of
    Half-Lie Groups</i>, 2025. <a href="https://doi.org/10.17619/UNIPB/1-2211">https://doi.org/10.17619/UNIPB/1-2211</a>.
  ieee: M. Pinaud, <i>Manifold of mappings and regularity properties of half-Lie groups</i>.
    2025.
  mla: Pinaud, Matthieu. <i>Manifold of Mappings and Regularity Properties of Half-Lie
    Groups</i>. 2025, doi:<a href="https://doi.org/10.17619/UNIPB/1-2211">10.17619/UNIPB/1-2211</a>.
  short: M. Pinaud, Manifold of Mappings and Regularity Properties of Half-Lie Groups,
    2025.
date_created: 2026-02-26T21:58:22Z
date_updated: 2026-02-26T21:58:36Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
doi: 10.17619/UNIPB/1-2211
language:
- iso: eng
main_file_link:
- open_access: '1'
  url: https://nbn-resolving.org/urn:nbn:de:hbz:466:2-54221
oa: '1'
status: public
supervisor:
- first_name: Helge
  full_name: Glöckner, Helge
  id: '178'
  last_name: Glöckner
title: Manifold of mappings and regularity properties of half-Lie groups
type: dissertation
user_id: '178'
year: '2025'
...
---
_id: '34807'
abstract:
- lang: eng
  text: "Let $M$ be a compact, real analytic manifold and $G$ be the Lie group of
    all\r\nreal-analytic diffeomorphisms of $M$, which is modelled on the (DFS)-space\r\n${\\mathfrak
    g}$ of real-analytic vector fields on $M$. We study flows of\r\ntime-dependent
    real-analytic vector fields on $M$ which are integrable\r\nfunctions in time,
    and their dependence on the time-dependent vector field.\r\nNotably, we show that
    the Lie group $G$ is $L^1$-regular in the sense that each\r\n$[\\gamma]$ in $L^1([0,1],{\\mathfrak
    g})$ has an evolution which is an\r\nabsolutely continuous $G$-valued function
    on $[0,1]$ and smooth in $[\\gamma]$.\r\nAs tools for the proof, we develop several
    new results concerning\r\n$L^p$-regularity of infinite-dimensional Lie groups,
    for $1\\leq p\\leq \\infty$,\r\nwhich will be useful also for the discussion of
    other classes of groups.\r\nMoreover, we obtain new results concerning the continuity
    and complex\r\nanalyticity of non-linear mappings on open subsets of locally convex
    direct\r\nlimits."
article_number: '113690'
author:
- first_name: Helge
  full_name: Glöckner, Helge
  id: '178'
  last_name: Glöckner
citation:
  ama: Glöckner H. Lie groups of real analytic diffeomorphisms are L^1-regular. <i>Nonlinear
    Analysis</i>. 2025;252. doi:<a href="https://doi.org/10.1016/j.na.2024.113690">10.1016/j.na.2024.113690</a>
  apa: Glöckner, H. (2025). Lie groups of real analytic diffeomorphisms are L^1-regular.
    <i>Nonlinear Analysis</i>, <i>252</i>, Article 113690. <a href="https://doi.org/10.1016/j.na.2024.113690">https://doi.org/10.1016/j.na.2024.113690</a>
  bibtex: '@article{Glöckner_2025, title={Lie groups of real analytic diffeomorphisms
    are L^1-regular}, volume={252}, DOI={<a href="https://doi.org/10.1016/j.na.2024.113690">10.1016/j.na.2024.113690</a>},
    number={113690}, journal={Nonlinear Analysis}, author={Glöckner, Helge}, year={2025}
    }'
  chicago: Glöckner, Helge. “Lie Groups of Real Analytic Diffeomorphisms Are L^1-Regular.”
    <i>Nonlinear Analysis</i> 252 (2025). <a href="https://doi.org/10.1016/j.na.2024.113690">https://doi.org/10.1016/j.na.2024.113690</a>.
  ieee: 'H. Glöckner, “Lie groups of real analytic diffeomorphisms are L^1-regular,”
    <i>Nonlinear Analysis</i>, vol. 252, Art. no. 113690, 2025, doi: <a href="https://doi.org/10.1016/j.na.2024.113690">10.1016/j.na.2024.113690</a>.'
  mla: Glöckner, Helge. “Lie Groups of Real Analytic Diffeomorphisms Are L^1-Regular.”
    <i>Nonlinear Analysis</i>, vol. 252, 113690, 2025, doi:<a href="https://doi.org/10.1016/j.na.2024.113690">10.1016/j.na.2024.113690</a>.
  short: H. Glöckner, Nonlinear Analysis 252 (2025).
date_created: 2022-12-22T07:49:32Z
date_updated: 2024-12-24T16:58:38Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
doi: 10.1016/j.na.2024.113690
intvolume: '       252'
language:
- iso: eng
publication: Nonlinear Analysis
quality_controlled: '1'
status: public
title: Lie groups of real analytic diffeomorphisms are L^1-regular
type: journal_article
user_id: '178'
volume: 252
year: '2025'
...
---
_id: '63569'
abstract:
- lang: eng
  text: "Let $G$ be a totally disconnected locally compact (tdlc) group. The contraction
    group $\\mathrm{con}(g)$ of an element $g\\in G$ is the set of all $h\\in G$ such
    that $g^n h g^{-n} \\to 1_G$ as $n \\to \\infty$. The nub of $g$ can then be characterized
    as the intersection $\\mathrm{nub}(g)$ of the closures of $\\mathrm{con}(g)$ and
    $\\mathrm{con}(g^{-1})$.\r\n Contraction groups and nubs provide important tools
    in the study of the structure of tdlc groups, as already evidenced in the work
    of G. Willis. It is known that $\\mathrm{nub}(g) = \\{1\\}$ if and only if $\\mathrm{con}(g)$
    is closed. In general, contraction groups are not closed and computing the nub
    is typically a challenging problem.\r\n Maximal Kac-Moody groups over finite fields
    form a prominent family of non-discrete compactly generated simple tdlc groups.
    In this paper we give a complete description of the nub of any element in these
    groups."
author:
- first_name: Sebastian
  full_name: Bischof, Sebastian
  id: '106729'
  last_name: Bischof
- first_name: Timothée
  full_name: Marquis, Timothée
  last_name: Marquis
citation:
  ama: Bischof S, Marquis T. Describing the nub in maximal Kac-Moody groups. Published
    online 2025.
  apa: Bischof, S., &#38; Marquis, T. (2025). <i>Describing the nub in maximal Kac-Moody
    groups</i>.
  bibtex: '@article{Bischof_Marquis_2025, title={Describing the nub in maximal Kac-Moody
    groups}, author={Bischof, Sebastian and Marquis, Timothée}, year={2025} }'
  chicago: Bischof, Sebastian, and Timothée Marquis. “Describing the Nub in Maximal
    Kac-Moody Groups,” 2025.
  ieee: S. Bischof and T. Marquis, “Describing the nub in maximal Kac-Moody groups.”
    2025.
  mla: Bischof, Sebastian, and Timothée Marquis. <i>Describing the Nub in Maximal
    Kac-Moody Groups</i>. 2025.
  short: S. Bischof, T. Marquis, (2025).
date_created: 2026-01-12T14:12:09Z
date_updated: 2026-01-12T14:33:08Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
external_id:
  arxiv:
  - arXiv:2508.15506
language:
- iso: eng
status: public
title: Describing the nub in maximal Kac-Moody groups
type: preprint
user_id: '106729'
year: '2025'
...
---
_id: '63568'
abstract:
- lang: eng
  text: In this article we work out the details of flat groups of the automorphism
    group of locally finite Bruhat-Tits buildings.
author:
- first_name: Sebastian
  full_name: Bischof, Sebastian
  id: '106729'
  last_name: Bischof
citation:
  ama: Bischof S. On flat groups in affine buildings. Published online 2025.
  apa: Bischof, S. (2025). <i>On flat groups in affine buildings</i>.
  bibtex: '@article{Bischof_2025, title={On flat groups in affine buildings}, author={Bischof,
    Sebastian}, year={2025} }'
  chicago: Bischof, Sebastian. “On Flat Groups in Affine Buildings,” 2025.
  ieee: S. Bischof, “On flat groups in affine buildings.” 2025.
  mla: Bischof, Sebastian. <i>On Flat Groups in Affine Buildings</i>. 2025.
  short: S. Bischof, (2025).
date_created: 2026-01-12T14:11:47Z
date_updated: 2026-01-12T14:32:33Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
external_id:
  arxiv:
  - arXiv:2512.16548
language:
- iso: eng
status: public
title: On flat groups in affine buildings
type: preprint
user_id: '106729'
year: '2025'
...
---
_id: '56114'
author:
- first_name: Matthieu
  full_name: Pinaud, Matthieu
  last_name: Pinaud
citation:
  ama: Pinaud M. Manifolds of absolutely continuous functions with values in an infinite-dimensional
    manifold and regularity properties of half-Lie groups. Published online 2024.
  apa: Pinaud, M. (2024). <i>Manifolds of absolutely continuous functions with values
    in an infinite-dimensional manifold and regularity properties of half-Lie groups</i>.
  bibtex: '@article{Pinaud_2024, title={Manifolds of absolutely continuous functions
    with values in an infinite-dimensional manifold and regularity properties of half-Lie
    groups}, author={Pinaud, Matthieu}, year={2024} }'
  chicago: Pinaud, Matthieu. “Manifolds of Absolutely Continuous Functions with Values
    in an Infinite-Dimensional Manifold and Regularity Properties of Half-Lie Groups,”
    2024.
  ieee: M. Pinaud, “Manifolds of absolutely continuous functions with values in an
    infinite-dimensional manifold and regularity properties of half-Lie groups.” 2024.
  mla: Pinaud, Matthieu. <i>Manifolds of Absolutely Continuous Functions with Values
    in an Infinite-Dimensional Manifold and Regularity Properties of Half-Lie Groups</i>.
    2024.
  short: M. Pinaud, (2024).
date_created: 2024-09-11T22:40:37Z
date_updated: 2024-09-11T22:45:02Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
external_id:
  arxiv:
  - '2409.06512'
language:
- iso: eng
status: public
title: Manifolds of absolutely continuous functions with values in an infinite-dimensional
  manifold and regularity properties of half-Lie groups
type: preprint
user_id: '178'
year: '2024'
...
---
_id: '56116'
author:
- first_name: Helge
  full_name: Glöckner, Helge
  id: '178'
  last_name: Glöckner
- first_name: Erlend
  full_name: Grong, Erlend
  last_name: Grong
- first_name: Alexander
  full_name: Schmeding, Alexander
  last_name: Schmeding
citation:
  ama: Glöckner H, Grong E, Schmeding A. Boundary values of diffeomorphisms of simple
    polytopes, and controllability. Published online 2024.
  apa: Glöckner, H., Grong, E., &#38; Schmeding, A. (2024). <i>Boundary values of
    diffeomorphisms of simple polytopes, and controllability</i>.
  bibtex: '@article{Glöckner_Grong_Schmeding_2024, title={Boundary values of diffeomorphisms
    of simple polytopes, and controllability}, author={Glöckner, Helge and Grong,
    Erlend and Schmeding, Alexander}, year={2024} }'
  chicago: Glöckner, Helge, Erlend Grong, and Alexander Schmeding. “Boundary Values
    of Diffeomorphisms of Simple Polytopes, and Controllability,” 2024.
  ieee: H. Glöckner, E. Grong, and A. Schmeding, “Boundary values of diffeomorphisms
    of simple polytopes, and controllability.” 2024.
  mla: Glöckner, Helge, et al. <i>Boundary Values of Diffeomorphisms of Simple Polytopes,
    and Controllability</i>. 2024.
  short: H. Glöckner, E. Grong, A. Schmeding, (2024).
date_created: 2024-09-11T22:50:56Z
date_updated: 2024-09-11T22:51:26Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
external_id:
  arxiv:
  - '2407.05444'
language:
- iso: eng
status: public
title: Boundary values of diffeomorphisms of simple polytopes, and controllability
type: preprint
user_id: '178'
year: '2024'
...
---
_id: '56584'
author:
- first_name: Ali
  full_name: Suri, Ali
  last_name: Suri
citation:
  ama: Suri A. Curvature and stability of quasi-geostrophic motion. <i>Journal of
    Geometry and Physics</i>. 2024;198:105109.
  apa: Suri, A. (2024). Curvature and stability of quasi-geostrophic motion. <i>Journal
    of Geometry and Physics</i>, <i>198</i>, 105109.
  bibtex: '@article{Suri_2024, title={Curvature and stability of quasi-geostrophic
    motion}, volume={198}, journal={Journal of Geometry and Physics}, author={Suri,
    Ali}, year={2024}, pages={105109} }'
  chicago: 'Suri, Ali. “Curvature and Stability of Quasi-Geostrophic Motion.” <i>Journal
    of Geometry and Physics</i> 198 (2024): 105109.'
  ieee: A. Suri, “Curvature and stability of quasi-geostrophic motion,” <i>Journal
    of Geometry and Physics</i>, vol. 198, p. 105109, 2024.
  mla: Suri, Ali. “Curvature and Stability of Quasi-Geostrophic Motion.” <i>Journal
    of Geometry and Physics</i>, vol. 198, 2024, p. 105109.
  short: A. Suri, Journal of Geometry and Physics 198 (2024) 105109.
date_created: 2024-10-10T15:59:49Z
date_updated: 2024-10-10T16:00:50Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
intvolume: '       198'
language:
- iso: eng
main_file_link:
- url: https://doi.org/10.1016/j.geomphys.2024.105109
page: '105109'
publication: Journal of Geometry and Physics
quality_controlled: '1'
status: public
title: Curvature and stability of quasi-geostrophic motion
type: journal_article
user_id: '178'
volume: 198
year: '2024'
...
---
_id: '56585'
author:
- first_name: Ali
  full_name: Suri, Ali
  last_name: Suri
citation:
  ama: Suri A. Conjugate points along spherical harmonics. <i>Journal of Geometry
    and Physics</i>. 2024;206:105333.
  apa: Suri, A. (2024). Conjugate points along spherical harmonics. <i>Journal of
    Geometry and Physics</i>, <i>206</i>, 105333.
  bibtex: '@article{Suri_2024, title={Conjugate points along spherical harmonics},
    volume={206}, journal={Journal of Geometry and Physics}, author={Suri, Ali}, year={2024},
    pages={105333} }'
  chicago: 'Suri, Ali. “Conjugate Points along Spherical Harmonics.” <i>Journal of
    Geometry and Physics</i> 206 (2024): 105333.'
  ieee: A. Suri, “Conjugate points along spherical harmonics,” <i>Journal of Geometry
    and Physics</i>, vol. 206, p. 105333, 2024.
  mla: Suri, Ali. “Conjugate Points along Spherical Harmonics.” <i>Journal of Geometry
    and Physics</i>, vol. 206, 2024, p. 105333.
  short: A. Suri, Journal of Geometry and Physics 206 (2024) 105333.
date_created: 2024-10-10T16:05:18Z
date_updated: 2024-10-10T16:05:47Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
intvolume: '       206'
language:
- iso: eng
main_file_link:
- url: https://doi.org/10.1016/j.geomphys.2024.105333
page: '105333'
publication: Journal of Geometry and Physics
quality_controlled: '1'
status: public
title: Conjugate points along spherical harmonics
type: journal_article
user_id: '178'
volume: 206
year: '2024'
...
---
_id: '56583'
author:
- first_name: Helge
  full_name: Glöckner, Helge
  id: '178'
  last_name: Glöckner
- first_name: Ali
  full_name: Suri, Ali
  last_name: Suri
citation:
  ama: Glöckner H, Suri A. L^1-regularity of strong ILB-Lie groups. Published online
    2024.
  apa: Glöckner, H., &#38; Suri, A. (2024). <i>L^1-regularity of strong ILB-Lie groups</i>.
  bibtex: '@article{Glöckner_Suri_2024, title={L^1-regularity of strong ILB-Lie groups},
    author={Glöckner, Helge and Suri, Ali}, year={2024} }'
  chicago: Glöckner, Helge, and Ali Suri. “L^1-Regularity of Strong ILB-Lie Groups,”
    2024.
  ieee: H. Glöckner and A. Suri, “L^1-regularity of strong ILB-Lie groups.” 2024.
  mla: Glöckner, Helge, and Ali Suri. <i>L^1-Regularity of Strong ILB-Lie Groups</i>.
    2024.
  short: H. Glöckner, A. Suri, (2024).
date_created: 2024-10-10T15:49:15Z
date_updated: 2024-10-10T15:51:43Z
department:
- _id: '10'
- _id: '87'
- _id: '93'
external_id:
  arxiv:
  - '2410.02909'
language:
- iso: eng
status: public
title: L^1-regularity of strong ILB-Lie groups
type: preprint
user_id: '178'
year: '2024'
...