@article{34790, author = {{Glöckner, Helge and Willis, George A.}}, issn = {{0075-4102}}, journal = {{Journal für die reine und angewandte Mathematik}}, keywords = {{22D05, 22A05, 20E18}}, pages = {{85–103}}, title = {{{Locally pro-p contraction groups are nilpotent}}}, doi = {{10.1515/crelle-2021-0050}}, volume = {{781}}, year = {{2021}}, } @article{34789, author = {{Amiri, Habib and Glöckner, Helge and Schmeding, Alexander}}, issn = {{0044-8753}}, journal = {{Archivum Mathematicum}}, keywords = {{22A22, 22E65, 22E67, 46T10, 47H30, 58D15, 58H05}}, number = {{5}}, pages = {{307–356}}, title = {{{Lie groupoids of mappings taking values in a Lie groupoid}}}, doi = {{10.5817/AM2020-5-307}}, volume = {{56}}, year = {{2020}}, } @article{34787, author = {{Glöckner, Helge and Masbough, Niku}}, issn = {{0146-4124}}, journal = {{Topology Proceedings}}, keywords = {{54B10, 54D45, 54D50}}, pages = {{35–38}}, title = {{{Products of regular locally compact spaces are k_R-spaces}}}, volume = {{55}}, year = {{2020}}, } @unpublished{34808, abstract = {{For suitable finite-dimensional smooth manifolds M (possibly with various kinds of boundary or corners), locally convex topological vector spaces F and non-negative integers k, we construct continuous linear operators S_n from the space of F-valued k times continuously differentiable functions on M to the corresponding space of smooth functions such that S_n(f) converges to f in C^k(M,F) as n tends to infinity, uniformly for f in compact subsets of C^k(M,F). We also study the existence of continuous linear right inverses for restriction maps from C^k(M,F) to C^k(L,F) if L is a closed subset of M, endowed with a C^k-manifold structure turning the inclusion map from L to M into a C^k-map. Moreover, we construct continuous linear right inverses for restriction operators between spaces of sections in vector bundles in many situations, and smooth local right inverses for restriction operators between manifolds of mappings. We also obtain smoothing results for sections in fibre bundles.}}, author = {{Glöckner, Helge}}, booktitle = {{arXiv:2006.00254}}, title = {{{Smoothing operators for vector-valued functions and extension operators}}}, year = {{2020}}, } @article{34828, author = {{Hanusch, Maximilian}}, issn = {{0019-3577}}, journal = {{Indagationes Mathematicae}}, keywords = {{regularity of Lie groups}}, number = {{1}}, pages = {{152--176}}, publisher = {{Elsevier BV}}, title = {{{The regularity problem for Lie groups with asymptotic estimate Lie algebras}}}, doi = {{10.1016/j.indag.2019.12.001}}, volume = {{31}}, year = {{2020}}, } @article{34830, author = {{Hanusch, Maximilian}}, journal = {{Journal of Lie Theory}}, keywords = {{Lie theory, strong Trotter property}}, number = {{1}}, pages = {{025--032}}, publisher = {{Heldermann Verlag}}, title = {{{The Strong Trotter Property for Locally μ-convex Lie Groups}}}, volume = {{30}}, year = {{2020}}, } @article{34829, author = {{Hanusch, Maximilian}}, issn = {{1435-5337}}, journal = {{Forum Mathematicum}}, keywords = {{regularity of Lie groups, differentiability of the evolution map}}, number = {{5}}, pages = {{1139--1177}}, publisher = {{Walter de Gruyter GmbH}}, title = {{{Differentiability of the evolution map and Mackey continuity}}}, doi = {{10.1515/forum-2018-0310}}, volume = {{31}}, year = {{2019}}, } @unpublished{64769, author = {{Nikitin, Natalie}}, title = {{{Measurable regularity of infinite-dimensional Lie groups based on Lusin measurability}}}, year = {{2019}}, } @article{64756, author = {{Walter, Boris}}, issn = {{0019-3577}}, journal = {{Indagationes Mathematicae}}, keywords = {{58D05, 57S05, 22E65, 58D15, 58B10}}, number = {{4}}, pages = {{669–705}}, title = {{{Weighted diffeomorphism groups of Riemannian manifolds}}}, doi = {{10.1016/j.indag.2019.03.003}}, volume = {{30}}, year = {{2019}}, } @article{64630, author = {{Glöckner, Helge}}, issn = {{0008-414X}}, journal = {{Canadian Journal of Mathematics}}, keywords = {{22E65, 22A05, 22E67, 46A13, 46M40, 58D05}}, number = {{1}}, pages = {{131–152}}, title = {{{Completeness of infinite-dimensional Lie groups in their left uniformity}}}, doi = {{10.4153/CJM-2017-048-5}}, volume = {{71}}, year = {{2019}}, } @inbook{64633, author = {{Glöckner, Helge}}, booktitle = {{New directions in locally compact groups}}, isbn = {{978-1-108-41312-1; 978-1-108-33267-5}}, keywords = {{22E50, 22E20, 22D05, 22E35, 26E30, 37D10}}, pages = {{37–72}}, publisher = {{Cambridge: Cambridge University Press}}, title = {{{Lectures on Lie groups over local fields}}}, doi = {{10.1017/9781108332675.005}}, year = {{2018}}, } @inbook{64632, author = {{Glöckner, Helge}}, booktitle = {{2016 MATRIX annals}}, isbn = {{978-3-319-72298-6; 978-3-319-72299-3}}, keywords = {{22D05, 20G25, 22E40}}, pages = {{101–165}}, publisher = {{Cham: Springer}}, title = {{{Endomorphisms of Lie groups over local fields}}}, doi = {{10.1007/978-3-319-72299-3_6}}, year = {{2018}}, } @phdthesis{64762, author = {{Schütt, Jakob}}, title = {{{Infinite-dimensional supermanifolds, Lie supergroups and the supergroup of superdiffeomorphisms}}}, year = {{2018}}, } @unpublished{64764, author = {{Schütt, Jakob}}, title = {{{Infinite-Dimensional Supermanifolds via Multilinear Bundles}}}, year = {{2018}}, } @article{64631, author = {{Bywaters, Timothy P. and Glöckner, Helge and Tornier, Stephan}}, issn = {{0021-2172}}, journal = {{Israel Journal of Mathematics}}, keywords = {{22E10, 47H09, 54H11}}, number = {{2}}, pages = {{691–752}}, title = {{{Contraction groups and passage to subgroups and quotients for endomorphisms of totally disconnected locally compact groups}}}, doi = {{10.1007/s11856-018-1750-9}}, volume = {{227}}, year = {{2018}}, } @inbook{64768, author = {{Nikitin, Natalie}}, booktitle = {{50th Seminar “Sophus Lie”, Będlewo, Poland, September 26 – October 1, 2016. Dedicated to Professor Karl Heinrich Hofmann on the occasion of his 85th birthday}}, isbn = {{978-83-86806-37-9}}, keywords = {{22E65, 22A10, 26E15, 46E50}}, pages = {{363–373}}, publisher = {{Warsaw: Polish Academy of Sciences, Institute of Mathematics}}, title = {{{Differentiability along one-parameter subgroups compared to differentiability on Lie groups as manifolds}}}, doi = {{10.4064/bc113-0-17}}, year = {{2017}}, } @article{64635, author = {{Glöckner, Helge and Neeb, Karl-Hermann}}, issn = {{0019-3577}}, journal = {{Indagationes Mathematicae}}, keywords = {{58D05, 22E55, 52A20}}, number = {{4}}, pages = {{760–783}}, title = {{{Diffeomorphism groups of compact convex sets}}}, doi = {{10.1016/j.indag.2017.04.004}}, volume = {{28}}, year = {{2017}}, } @article{64638, author = {{Glöckner, Helge and Raja, C. R. E.}}, issn = {{1433-5883}}, journal = {{Journal of Group Theory}}, keywords = {{22D05, 22A10, 22D40}}, number = {{3}}, pages = {{589–619}}, title = {{{Expansive automorphisms of totally disconnected, locally compact groups}}}, doi = {{10.1515/jgth-2016-0051}}, volume = {{20}}, year = {{2017}}, } @article{64636, author = {{Glöckner, Helge}}, issn = {{0002-9939}}, journal = {{Proceedings of the American Mathematical Society}}, keywords = {{22E20}}, number = {{11}}, pages = {{5007–5021}}, title = {{{Elementary p-adic Lie groups have finite construction rank}}}, doi = {{10.1090/proc/13637}}, volume = {{145}}, year = {{2017}}, } @article{64634, author = {{Glöckner, Helge}}, issn = {{0166-8641}}, journal = {{Topology and its Applications}}, keywords = {{22E65, 22A05, 46A13, 46M40, 58D05}}, pages = {{277–284}}, title = {{{Completeness of locally k_ω-groups and related infinite-dimensional Lie groups}}}, doi = {{10.1016/j.topol.2017.05.007}}, volume = {{228}}, year = {{2017}}, }