Please note that LibreCat no longer supports Internet Explorer versions 8 or 9 (or earlier).
We recommend upgrading to the latest Internet Explorer, Google Chrome, or Firefox.
149 Publications
2005 | Journal Article | LibreCat-ID: 64700
Hölder continuous homomorphisms between infinite-dimensional Lie groups are smooth
H. Glöckner, Journal of Functional Analysis 228 (2005) 419–444.
LibreCat
| DOI
H. Glöckner, Journal of Functional Analysis 228 (2005) 419–444.
2005 | Journal Article | LibreCat-ID: 64702
Conveniently Hölder homomorphisms are smooth in the convenient sense
H. Glöckner, Annals of Global Analysis and Geometry 27 (2005) 227–255.
LibreCat
| DOI
H. Glöckner, Annals of Global Analysis and Geometry 27 (2005) 227–255.
2005 | Journal Article | LibreCat-ID: 64704
Smooth Lie groups over local fields of positive characteristic need not be analytic
H. Glöckner, Journal of Algebra 285 (2005) 356–371.
LibreCat
| DOI
H. Glöckner, Journal of Algebra 285 (2005) 356–371.
2005 | Journal Article | LibreCat-ID: 64701
Contraction groups for tidy automorphisms of totally disconnected groups
H. Glöckner, Glasgow Mathematical Journal 47 (2005) 329–333.
LibreCat
| DOI
H. Glöckner, Glasgow Mathematical Journal 47 (2005) 329–333.
2005 | Journal Article | LibreCat-ID: 64703
Diff(R^n) as a Milnor-Lie group
H. Glöckner, Mathematische Nachrichten 278 (2005) 1025–1032.
LibreCat
| DOI
H. Glöckner, Mathematische Nachrichten 278 (2005) 1025–1032.
2005 | Journal Article | LibreCat-ID: 64699
Fundamentals of direct limit Lie theory
H. Glöckner, Compositio Mathematica 141 (2005) 1551–1577.
LibreCat
| DOI
H. Glöckner, Compositio Mathematica 141 (2005) 1551–1577.
2004 | Book Chapter | LibreCat-ID: 64708
Lie groups of germs of analytic mappings
H. Glöckner, in: Infinite Dimensional Groups and Manifolds. Based on the 70th Meeting of Theoretical Physicists and Mathematicians at IRMA, Strasbourg, France, May 2004., Berlin: de Gruyter, 2004, pp. 1–16.
LibreCat
H. Glöckner, in: Infinite Dimensional Groups and Manifolds. Based on the 70th Meeting of Theoretical Physicists and Mathematicians at IRMA, Strasbourg, France, May 2004., Berlin: de Gruyter, 2004, pp. 1–16.
2004 | Preprint | LibreCat-ID: 64743
Lie groups over non-discrete topological fields
H. Glöckner, (2004).
LibreCat
| arXiv
H. Glöckner, (2004).
2004 | Journal Article | LibreCat-ID: 64707
Differential calculus over general base fields and rings.
W. Bertram, H. Glöckner, K.-H. Neeb, Expositiones Mathematicae 22 (2004) 213–282.
LibreCat
| DOI
W. Bertram, H. Glöckner, K.-H. Neeb, Expositiones Mathematicae 22 (2004) 213–282.
2004 | Journal Article | LibreCat-ID: 64705
Tensor products in the category of topological vector spaces are not associative.
H. Glöckner, Commentationes Mathematicae Universitatis Carolinae 45 (2004) 607–614.
LibreCat
H. Glöckner, Commentationes Mathematicae Universitatis Carolinae 45 (2004) 607–614.
2004 | Journal Article | LibreCat-ID: 64706
Examples of differentiable mappings into non-locally convex spaces.
H. Glöckner, Topology Proceedings 28 (2004) 479–486.
LibreCat
H. Glöckner, Topology Proceedings 28 (2004) 479–486.
2003 | Book | LibreCat-ID: 64710
Positive definite functions on infinite-dimensional convex cones
H. Glöckner, Positive Definite Functions on Infinite-Dimensional Convex Cones, Providence, RI: American Mathematical Society (AMS), 2003.
LibreCat
| DOI
H. Glöckner, Positive Definite Functions on Infinite-Dimensional Convex Cones, Providence, RI: American Mathematical Society (AMS), 2003.
2003 | Journal Article | LibreCat-ID: 64712
Banach-Lie quotients, enlargibility, and universal complexifications
H. Glöckner, K.-H. Neeb, Journal Für Die Reine Und Angewandte Mathematik 560 (2003) 1–28.
LibreCat
| DOI
H. Glöckner, K.-H. Neeb, Journal Für Die Reine Und Angewandte Mathematik 560 (2003) 1–28.
2003 | Journal Article | LibreCat-ID: 64711
Lie groups of measurable mappings.
H. Glöckner, Canadian Journal of Mathematics 55 (2003) 969–999.
LibreCat
| DOI
H. Glöckner, Canadian Journal of Mathematics 55 (2003) 969–999.
2003 | Journal Article | LibreCat-ID: 64709
Direct limit Lie groups and manifolds
H. Glöckner, Journal of Mathematics of Kyoto University 43 (2003) 1–26.
LibreCat
| DOI
H. Glöckner, Journal of Mathematics of Kyoto University 43 (2003) 1–26.
2002 | Book Chapter | LibreCat-ID: 64716
Infinite-dimensional Lie groups without completeness restrictions
H. Glöckner, in: Geometry and Analysis on Finite- and Infinite-Dimensional Lie Groups. Proceedings of the Workshop on Lie Groups and Lie Algebras, Bȩdlewo, Poland, September 4–15, 2000, Warszawa: Polish Academy of Sciences, Institute of Mathematics, 2002, pp. 43–59.
LibreCat
H. Glöckner, in: Geometry and Analysis on Finite- and Infinite-Dimensional Lie Groups. Proceedings of the Workshop on Lie Groups and Lie Algebras, Bȩdlewo, Poland, September 4–15, 2000, Warszawa: Polish Academy of Sciences, Institute of Mathematics, 2002, pp. 43–59.
2002 | Book Chapter | LibreCat-ID: 64715
A property of locally compact groups
H. Glöckner, J. Winkelmann, in: Recent Advances in Lie Theory. Selected Contributions to the 1st Colloquium on Lie Theory and Applications, Vigo, Spain, July 2000, Lemgo: Heldermann Verlag, 2002, pp. 205–210.
LibreCat
H. Glöckner, J. Winkelmann, in: Recent Advances in Lie Theory. Selected Contributions to the 1st Colloquium on Lie Theory and Applications, Vigo, Spain, July 2000, Lemgo: Heldermann Verlag, 2002, pp. 205–210.
2002 | Journal Article | LibreCat-ID: 64717
Real and p-adic Lie algebra functors on the category of topological groups.
H. Glöckner, Pacific Journal of Mathematics 203 (2002) 321–368.
LibreCat
| DOI
H. Glöckner, Pacific Journal of Mathematics 203 (2002) 321–368.
2002 | Journal Article | LibreCat-ID: 64714
Lie group structures on quotient groups and universal complexifications for infinite-dimensional Lie groups
H. Glöckner, Journal of Functional Analysis 194 (2002) 347–409.
LibreCat
| DOI
H. Glöckner, Journal of Functional Analysis 194 (2002) 347–409.
2002 | Journal Article | LibreCat-ID: 64721
Algebras whose groups of units are Lie groups
H. Glöckner, Studia Mathematica 153 (2002) 147–177.
LibreCat
| DOI
H. Glöckner, Studia Mathematica 153 (2002) 147–177.