Personal information
Name
email
ORCiD profile
Georg Klein
georgklein53@gmail.com
http://orcid.org/0000-0001-6912-4632
Education and training
• Dates (from – to )
• Name and type of organization
providing education and training
• Title of qualification awarded
2008 – 2014
University of Brussels, Belgium
• Dates (from – to )
• Name and type of organization
providing education and training
• Title of qualification awarded
2005 – 2006
University of Louvain-la-Neuve, Belgium
• Dates (from – to )
• Name and type of organization
providing education and training
• Title of qualification awarded
1998 – 2004
Queen’s University at Kingston, Canada
Doctor in Sciences
Diplôme d’Etudes Approfondies en Mathématiques
Bachelor of Science (Honours), Major Mathematics, Minor
Physics
Employment
Postdoctoral fellow sponsored by The Research Council of Oman, Department of Mathematics and
Statistics, Sultan Qaboos University. (Since 03/2015)
Scientific collaborator, Department of Mathematics, University of Brussels. (10/2008 - 10/2014)
Preparation of a PhD thesis: Finitely presented algebras defined by permutation relations, under
the supervision of Prof. E. Jespers, University of Brussels. (10/2008 - 10/2014)
Teaching assistant, Department of Mathematics, Universiy of Liège. (10/2011 - 09/2012)
Teaching assistant, Department of Mathematics, University of Brussels. (10/2010 - 09/2011)
Research
• Finitely presented semigroup algebras. Structure investigation of semigroup algebras as introduced and initiated by F. Cedó, E. Jespers, J. Okniński in: Finitely presented algebras and groups
defined by permutation relations, J. Pure Appl. Algebra 214 (2010), no. 7, 1095–1102.
• Semigroups of contraction mappings of a finite chain.
1
Publications
• F. Cedó, E. Jespers, G. Klein, Construction of a two unique product semigroup defined by permutation relations of quaternion type, J. Algebra (2016),
http://dx.doi.org/10.1016/j.jalgebra.2015.12.017
• F. Cedó, E. Jespers, G. Klein, Finitely presented algebras defined by permutation relations
of dihedral type, ArXiv preprint math.RA (2014), http://arxiv.org/abs/1412.3707, accepted for
publication in Internat. J. Algebra Comput.
• F. Cedó, E. Jespers, G. Klein, Group algebras and semigroup algebras defined by permutation
relations of fixed length, J. Algebra Appl. 15 (2016), no. 2.
• F. Cedó, E. Jespers, G. Klein, Finitely presented monoids and algebras defined by permutation
relations of abelian type, II, J. Pure Appl. Algebra 219 (2015), no. 4, 1095-1102.
• F. Cedó, E. Jespers, G. Klein, Finitely presented monoids and algebras defined by permutation
relations of abelian type, J. Pure Appl. Algebra 216 (2012), no. 5, 1033-1039.
Conferences
• Groups and their Actions, Bedlewo, Poland, 23-28 August 2010. Talk: Finitely presented monoids
and algebras defined by permutation relations of abelian type.
• Arithmetic of Group Rings and Related Objects, Aachen, Germany, 22-26 March 2010.
Research Stays Abroad
• Universitat Autònoma de Barcelona: 07-11 July 2014, 02-10 April 2014, 09-13 December 2013,
21-25 January 2013, 24-28 January 2011.
Presentations
• Finitely presented monoids and algebras defined by permutation relations of abelian type, II,
VUB Algebra Seminar, 06 November 2013.
• Poster: Finitely presented algebras and groups defined by permutation relations, PhD Day of the
Belgian Mathematical Society, 13 September 2010.
Personal Skills and Competences
Languages
Dutch
proficient
English
fluent
French
fluent
Competences
Experience in lecturing through teaching and active participation in seminars.
Experience in typesetting documents using LaTeX.
Ability to use the computer algebra system GAP.
2
German
native