An iterative algorithm for parametrization of shortest length shift registers over finite rings

Abstract

The construction of shortest feedback shift registers for a finite sequence S1,...,SN is considered over the finite ring Zpr. A novel algorithm is presented that yields a parametrization of all shortest feedback shift registers for the sequence of numbers S1,...,SN, thus solving an open problem in the literature. The algorithm iteratively processes each number, starting with S1, and constructs at each step a particular type of minimal Gr\"obner basis. The construction involves a simple update rule at each step which leads to computational efficiency. It is shown that the algorithm simultaneously computes a similar parametrization for the reciprocal sequence SN,...,S1.