A tight upper bound on the number of non-zero weights of a constacyclic code

Abstract

For a simple-root λ-constacyclic code C over Fq, let and ,M be the subgroups of the automorphism group of C generated by the cyclic shift , and by the cyclic shift and the scalar multiplication M, respectively. Let NG(C) be the number of orbits of a subgroup G of automorphism group of C acting on C=C\0\. In this paper, we establish explicit formulas for N(C) and N,M(C). Consequently, we derive a upper bound on the number of nonzero weights of C. We present some irreducible and reducible λ-constacyclic codes, which show that the upper bound is tight. A sufficient condition to guarantee N(C)=N,M(C) is presented.