Associate editor
ACADEMIC QUALIFICATIONS:
PhD thesis 1990(Doctorate of Haute Alsace University)
Habilitation 2003(Acredited to supervise research)
FIELD OF SPECIALIZATION:
Algebra, Nonassociative algebra, Deformation Theory, Homological algebra.
CURRENT RESEARCH AREAS:
The aim of my research in mathematics is to investigate structure and algebraic deformation theory of different type of algebras such as associative algebras,Lie algebras,nonassociative algebras,n‐ary algebras,Hopf algebras and Quantum groups.I have pioneered and developed a research direction in which the identities defining the algebraic structures are twisted by a morphism.This is motivated by algebras of vector fields in physics and allows for broader categories.A big research activity and a huge number of publications are devoted to this kind of algebras called Hom‐algebras.
PUBLICATIONS:
86 articles
(51 in International Journals,16 chapters in books or Proceedings,7 internal reports,12 in Didactics Journals).ResearchGate Citations :759.MathSciNet Citations :245 times by 97 authors. Google Scholar Citations :1983 (June2015).
Educational Experience:
I have taught many undergraduate and graduate courses.Mainly,I am teaching the following courses:Algebraic geometry (Graduate),Calculus for chemistry students (undergraduate),Optmization and Linear programming (Undergraduate),Computer algebra (Undergraduate).