associator Associator 2004-10-10 14:15:52 2006-10-02 14:17:20 Definition anti-associative % this is the default PlanetMath preamble. as your knowledge % of TeX increases, you will probably want to edit this, but % it should be fine as is for beginners. % almost certainly you want these \usepackage{amssymb,amscd} \usepackage{amsmath} \usepackage{amsfonts} % used for TeXing text within eps files %\usepackage{psfrag} % need this for including graphics (\includegraphics) %\usepackage{graphicx} % for neatly defining theorems and propositions %\usepackage{amsthm} % making logically defined graphics %\usepackage{xypic} % there are many more packages, add them here as you need them % define commands here \PMlinkescapeword{measures} Let $A$ be a non-associative algebra over a field. The \emph{associator} of $A$, denoted by $[\ , , ]$, is a \PMlinkname{trilinear}{multilinear} map from $A\times A\times A$ to $A$ given by: $$[\ a,b,c\ ]=(ab)c-a(bc).$$ \par Just as the commutator measures how close an algebra is to being commutative, the associator measures how close it is to being associative. $[\ , , ]=0$ identically iff $A$ is associative. \par \begin{thebibliography}{8} \bibitem{Shafer} R. D. Schafer, {\em An Introduction on Nonassociative Algebras}, Dover, New York (1995). \end{thebibliography}