An efficient method to construct self-dual cyclic codes of length ps over Fpm+uFpm

Abstract

Let p be an odd prime number, Fpm be a finite field of cardinality pm and s a positive integer. Using some combinatorial identities, we obtain certain properties for Kronecker product of matrices over Fp with a specific type. On that basis, we give an explicit representation and enumeration for all distinct self-dual cyclic codes of length ps over the finite chain ring Fpm+uFpm (u2=0). Moreover, We provide an efficient method to construct every self-dual cyclic code of length ps over Fpm+uFpm precisely.