The Lee weight distributions of several classes of linear codes over Z4

Abstract

Let Z4 denote the ring of integers modulo 4. The Galois ring GR(4,m), which consists of 4m elements, represents the Galois extension of degree m over Z4. The constructions of codes over Z4 have garnered significant interest in recent years. In this paper, building upon previous research, we utilize the defining-set approach to construct several classes of linear codes over Z4 by effectively using the properties of the trace function from GR(4,m) to Z4. As a result, we have been able to obtain new linear codes over Z4 with good parameters and determine their Lee weight distributions. Upon comparison with the existing database of Z4 codes, our construction can yield novel linear codes, as well as linear codes that possess the best known minimum Lee distance.

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