Isometries and MacWilliams Extension Property for Weighted Poset Metric

Abstract

Let H be the cartesian product of a family of left modules over a ring S, indexed by a finite set . We are concerned with the (P,ω)-weight on H, where P=(,P) is a poset and ω:+ is a weight function. We characterize the group of (P,ω)-weight isometries of H, and give a canonical decomposition for semi-simple subcodes of H when P is hierarchical. We then study the MacWilliams extension property (MEP) for (P,ω)-weight. We show that the MEP implies the unique decomposition property (UDP) of (P,ω), which further implies that P is hierarchical if ω is identically 1. For the case that either P is hierarchical or ω is identically 1, we show that the MEP for (P,ω)-weight can be characterized in terms of the MEP for Hamming weight, and give necessary and sufficient conditions for H to satisfy the MEP for (P,ω)-weight when S is an Artinian simple ring (either finite or infinite). When S is a finite field, in the context of (P,ω)-weight, we compare the MEP with other coding theoretic properties including the MacWilliams identity, Fourier-reflexivity of partitions and the UDP, and show that the MEP is strictly stronger than all the rest among them.