Dynamic feedback over principal ideal domains and quotient rings

We show that, over a principal ideal domain, the dynamic feedback equivalence for (not necessarily reachable) linear systems is reduced to the feedback equivalence for one-augmented systems. We also obtain the dynamic feedback classification for two-dimensional linear systems.

Our aim in this paper is to improve on the algorithms for the computation of SAGBI and SAGBI-Gröbner for subalgebras of polynomial rings in the special case where the base ring is a principal ideal domain. In addition we will show the existence in general of strong SAGBI bases (the natural analogue

A t-(v, k, λ) covering is an incidence structure with v points, each block incident on exactly k points, such that every set of t distinct points is incident on at least λ blocks. By considering certain geometries over finite principal ideal rings, we construct infinite families of t- (v, k, λ) cov

Let Z ⊆ R be a subgroup of the rationals and (S; ≤) a ÿnite poset. In this paper we introduce the category Rep(S; R) of homogeneous completely decomposable groups H of type R with distinguished homogeneous completely decomposable subgroups H i (i ∈ S) of the same type, respecting the order of S, i.e