An Algebraic Invariant for Free Convolutional Codes over Finite Local Rings

Abstract

This paper investigates the algebraic structure of free convolutional codes over the finite local ring Zpr. We introduce a new structural invariant, the Residual Structural Polynomial, denoted by Deltap(C) in Fp[D]. We construct this invariant via encoders which are reduced internal degree matrices (RIDM). We formally demonstrate that Deltap(C) is an intrinsic characteristic of the code, invariant under equivalent RIDMs. A central result of this work is the establishment that Deltap(C) serves as an algebraic criterion for intrinsic catastrophicity: we prove that a free code C admits a non-catastrophic realization if and only if Deltap(C) is a monomial of the form Ds. Furthermore, we establish a fundamental duality theorem, proving that Deltap(C) = Deltap(Cperp). This result reveals a deep structural symmetry, showing that the "catastrophicity" of a free code is preserved under orthogonality.