Your search keyword '"Ludwig, Jean"' showing total 202 results

201. Beurling-Fourier algebras on Lie groups and their spectra

Author

Jean Ludwig, Lyudmila Turowska, Nico Spronk, Mahya Ghandehari, Hun Hee Lee, Department of Mathematical Sciences (University of Delaware), University of Delaware [Newark], Seoul National University [Seoul] (SNU), Institut Élie Cartan de Lorraine (IECL), Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS), Department of Pure Mathematics [Waterloo], University of Waterloo [Waterloo], Chalmers University of Technology [Göteborg], M. Ghandehari was partially supported by University of Delaware Research Foundation, and partially by NSF grant DMS-1902301, while this work was being completed., H. H. Lee was supported by the Basic Science Research Program through the National Research Foundation of Korea (NRF) Grant NRF-2017R1E1A1A03070510 and the National Research Foundation of Korea (NRF) Grant funded by the Korean Government (MSIT) (Grant No.2017R1A5A1015626)., N. Spronk was partially supported by NSERC grant 312515-2015., L. Turowska was partially supported by 'Stiftelsen G S Magnussons Fond' and the Department of Mathematical Scinces, Chalmers University of Technology through a guest research program., and Ludwig, Jean

Subjects

Pure mathematics, General Mathematics, Complexification (Lie group), [MATH] Mathematics [math], 01 natural sciences, 46J15 (Primary), 22E25, 43A30 (Secondary), Beurling algebra, 0103 physical sciences, FOS: Mathematics, Heisenberg group, [MATH]Mathematics [math], 0101 mathematics, Connection (algebraic framework), Operator Algebras (math.OA), Mathematics, Fourier algebra, MSC : 46J15 (Primary), 22E25, 43A30 (Secondary), Group (mathematics), 010102 general mathematics, Mathematics - Operator Algebras, Lie group, Operator algebra, Gelfand spectrum, Functional Analysis (math.FA), Mathematics - Functional Analysis, Complexification of Lie groups, 010307 mathematical physics

Abstract

We investigate Beurling-Fourier algebras, a weighted version of Fourier algebras, on various Lie groups focusing on their spectral analysis. We will introduce a refined general definition of weights on the dual of locally compact groups and their associated Beurling-Fourier algebras. Constructions of nontrivial weights will be presented focusing on the cases of representative examples of Lie groups, namely $SU(n)$, the Heisenberg group $\mathbb{H}$, the reduced Heisenberg group $\mathbb{H}_r$, the Euclidean motion group $E(2)$ and its simply connected cover $\widetilde{E}(2)$. We will determine the spectrum of Beurling-Fourier algebras on each of the aforementioned groups emphasizing its connection to the complexification of underlying Lie groups. We also demonstrate "polynomially growing" weights does not change the spectrum and show the associated regularity of the resulting Beurling-Fourier algebras., A few minor updates, to appear in Adv. Math.; 88 pages

Published

2021

202. The C*-algebras of certain Lie groups

Author

Günther, Janne-Kathrin, Fonds National de la Recherche - FnR [sponsor], Olbrich, Martin [superviser], Ludwig, Jean [superviser], Thalmaier, Anton [president of the jury], Beltita, Ingrid [member of the jury], Hilgert, Joachim [member of the jury], and Pasquale, Angela [member of the jury]

Subjects

Dual space, Operator fields, Fourier transform, Mathematics [G03] [Physical, chemical, mathematical & earth Sciences], Mathématiques [G03] [Physique, chimie, mathématiques & sciences de la terre], Topology, C*-algebra, Lie group

Abstract

In this doctoral thesis, the C*-algebras of the connected real two-step nilpotent Lie groups and the Lie group SL(2,R) are characterized. Furthermore, as a preparation for an analysis of its C*-algebra, the topology of the spectrum of the semidirect product U(n) x H_n is described, where H_n denotes the Heisenberg Lie group and U(n) the unitary group acting by automorphisms on H_n. For the determination of the group C*-algebras, the operator valued Fourier transform is used in order to map the respective C*-algebra into the algebra of all bounded operator fields over its spectrum. One has to find the conditions that are satisfied by the image of this C*-algebra under the Fourier transform and the aim is to characterize it through these conditions. In the present thesis, it is proved that both the C*-algebras of the connected real two-step nilpotent Lie groups and the C*-algebra of SL(2,R) fulfill the same conditions, namely the “norm controlled dual limit” conditions. Thereby, these C*-algebras are described in this work and the “norm controlled dual limit” conditions are explicitly computed in both cases. The methods used for the two-step nilpotent Lie groups and the group SL(2,R) are completely different from each other. For the two-step nilpotent Lie groups, one regards their coadjoint orbits and uses the Kirillov theory, while for the group SL(2,R) one can accomplish the calculations more directly.

Published

2016