Document Type
Article
Publication Date
2013
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Abstract
A weighing matrix is a square matrix whose entries are 1, 0 or −1, such that the matrix times its transpose is some integer multiple of the identity matrix. We examine the case where these matrices are said to be devel- oped by an abelian group. Through a combination of extending previous results and by giving explicit constructions we will answer the question of existence for 318 such matrices of order and weight both below 100. At the end, we are left with 98 open cases out of a possible 1,022. Further, some of the new results provide insight into the existence of matrices with larger weights and orders.
Repository Citation
Arasu, K. T.,
& Hollon, J. R.
(2013). Group Developed Weighing Matrices. Australasian Journal of Combinatorics, 55, 205-233.
https://corescholar.libraries.wright.edu/math/544
Comments
This is an Open Access publication.