Abstract

In this paper we initiate the study of representation theory of compact, not necessarily commutative, uniquely divisible semigroups. We show that a certain class of semigroups are all topologically isomorphic to real matrix semigroups. The proof utilizes a group embedding theorem and the standard results on homomorphisms of Lie groups into matrix groups.

Full Text
Published version (Free)

Talk to us

Join us for a 30 min session where you can share your feedback and ask us any queries you have

Schedule a call

Similar Papers

Paper Title
Journal
Date
Author
Semigroups through semilattices
J H Carruth ... Jimmie D Lawson
Transactions of the American Mathematical Society | VOL. 152
J H Carruth, et. al.J H Carruth ... Jimmie D Lawson
01 Feb 1970
Representation Theory of Compact Inverse Semigroups
-
01 Jan 2010
Representations of certain compact semigroups by 𝐻𝐿-semigroups
C E Clark ... J H Carruth
Transactions of the American Mathematical Society | VOL. 149
C E Clark, et. al.C E Clark ... J H Carruth
01 Jan 1970
Abelian semigroups whose Stone-Čech compactifications have left ideal decompositions
D J Parsons
Mathematical Proceedings of the Cambridge Philosophical Society | VOL. 97
D J ParsonsD J Parsons
01 May 1985
View more papers

More From: Transactions of the American Mathematical Society

Paper Title
Journal
Date
Author
-
-
Transactions of the American Mathematical Society | VOL. 377
--
01 Jun 2024
On the discretised 𝐴𝐵𝐶 sum-product problem
Tuomas Orponen
Transactions of the American Mathematical Society | VOL. -
Tuomas OrponenTuomas Orponen
21 May 2024
On a conjectural symmetric version of Ehrhard’s inequality
Galyna Livshyts
Transactions of the American Mathematical Society | VOL. -
Galyna LivshytsGalyna Livshyts
21 May 2024
Sharp weighted log-Sobolev inequalities: Characterization of equality cases and applications
Zoltán Balogh ... Sebastiano Don
Transactions of the American Mathematical Society | VOL. -
Zoltán Balogh, et. al.Zoltán Balogh ... Sebastiano Don
21 May 2024
View more papers