On free differentials on associative algebras
Abstract
A free differential for an arbitrary associative algebra is defined as a differential with a uniqueness property. The existence problem for such a differential is posed. The notion of optimal calculi for given commutation rules is introduced and an explicit construction of it for a homogenous case is provided. Some examples are presented.
 Publication:

arXiv eprints
 Pub Date:
 December 1993
 arXiv:
 arXiv:hepth/9312023
 Bibcode:
 1993hep.th...12023B
 Keywords:

 High Energy Physics  Theory;
 Mathematics  Rings and Algebras
 EPrint:
 10 pages