The cohomological reduction method for computing n-dimensional cocyclic matrices
Abstract
Provided that a cohomological model for is known, we describe a method for constructing a basis for -cocycles over , from which the whole set of -dimensional -cocyclic matrices over may be straightforwardly calculated. Focusing in the case (which is of special interest, e.g. for looking for cocyclic Hadamard matrices), this method provides a basis for 2-cocycles in such a way that representative -cocycles are calculated all at once, so that there is no need to distinguish between inflation and transgression 2-cocycles (as it has traditionally been the case until now). When , this method provides an uniform way of looking for higher dimensional -cocyclic Hadamard matrices for the first time. We illustrate the method with some examples, for . In particular, we give some examples of improper 3-dimensional -cocyclic Hadamard matrices.
Cite
@article{arxiv.1201.4026,
title = {The cohomological reduction method for computing n-dimensional cocyclic matrices},
author = {Víctor Álvarez and José-Andrés Armario and María-Dolores Frau and Pedro Real},
journal= {arXiv preprint arXiv:1201.4026},
year = {2015}
}
Comments
17 pages, 0 figures