Bertfried, I think it's great to have this quick introduction - especially when it also references what is currently implemented in Axiom and what might be done in the future. I hope that we can eventually have a tutorial including actual Axiom code. If you start to develop something like that I would be very glad to help add it to the axiom-wiki.newsynthesis.org web site!
On Fri, Oct 30, 2009 at 8:26 AM, Bertfried Fauser wrote: > Hi Martin, > >> So yes, I am interested, but I don't know how much I could do. > > OK, I got this disclaimer, anybody states it :-)) > >> As I say, I don't have a rigorous mathematical background, > > No worries, most things with Clifford algebras are easy. > > Clifford and Grassmann bases: > > Mathematically its sound to start with the Grassmann algebra, you have > the following ingrediences: > > V an n-dim vector space > /\ : V x V ... x V --> /\^n V the unital, associative antisymmetric > exterior product or Grassmann or wedge product (all sysnonyms) > > ... Although I think your somewhat more formal approach is very important in the context of Axiom, you might also be interested in the more applied approach presented by John Browne here: http://sites.google.com/site/grassmannalgebra/bookandpackageversions "This Grassmann algebra project has been a part-time project dating from my doctoral thesis in the area in 1978. In October 2001 I published an incomplete book draft "Grassmann Algebra: Exploring applications of extended vector algebra with Mathematica" on my university home page. The computations in this draft were done with early versions of Mathematica and draft versions of the GrassmannAlgebra package. ..." John also makes his Mathematica code available online. It would be great to have this kind of package available in Axiom. Regards, Bill Page. _______________________________________________ Axiom-developer mailing list Axiom-developer@nongnu.org http://lists.nongnu.org/mailman/listinfo/axiom-developer