Digit systems over commutative rings

Abstract

Let be a commutative ring with identity and P∈[x] be a polynomial. In the present paper we consider digit representations in the residue class ring [x]/(P). In particular, we are interested in the question whether each A∈[x]/(P) can be represented modulo P in the form e0+e1 X + ·s + eh Xh, where the ei∈[x]/(P) are taken from a fixed finite set of digits. This general concept generalises both canonical number systems and digit systems over finite fields. Due to the fact that we do not assume that 0 is an element of the digit set and that P need not be monic, several new phenomena occur in this context.