On Polycyclic Codes over Fpm[u] ut and their Cardinalities

Abstract

The purpose of this article is to study polycyclic codes over the ring Fpm[u] ut , \,t ≥ 1, and their associated torsion codes. It is shown that if φ is a surjective ring homomorphism from a commutative ring A to a Noetherian ring B with ker(φ)= π then for every ideal I of A, there exists a1,a2,…,an in I such that I= a1,a2,…,an+π(I:π). Using this, we obtain generators of all ideals of the ring Fpm[u] ut [x] ω(x), where ω(x)∈ Fpm[u] ut [x] . For the case when ω(x)=f(x)ps, where f(x) is an irreducible polynomial in Fpm[x] and s is a non-negative integer, we obtain several other results including computation of torsion ideals and their torsional degrees when t=4. We use the torsional degree to compute the cardinality of polycyclic codes over the ring Fpm[u] u4 .