Schur Ring over Group 2n, Circulant S-Sets Invariant by Decimation and Hadamard Matrices

Abstract

In this paper a variety of issues are discussed, Schur ring, S-sets, circulant orbits, decimation operator and Hadamard matrices and their relation between them is shown. Firstly we define the complete S-sets. Next, we study the structure of Schur ring with circulant basic sets over 2n and we define the free and non-free circulant S-sets, the symmetric, non-symmetric and antisymmetric circulant S-sets. We prove that all this S-sets are invariants under decimation. Finally, we prove that if a Hadamard matrix exist then this is contained in a complete S-set. Also, we prove that can't exist circulant and with one core Hadamard matrices with some particular structure. These theorems include a result known on symmetric circulant Hadamard matrices of order 4n only when n is an odd number.