Galois LCD Codes Over Fq + uFq + vFq + uvFq

Abstract

In anote, Wu and Shi studied l -Galois LCD codes over finite chain ring R=Fq+uFq, where u2=0 and q=pe for some prime p and positive integer e. In this work, we extend the results to the finite non chain ring R =Fq+uFq+vFq+uvFq, where u2=u,v2=v and uv=vu . We define a correspondence between l -Galois dual of linear codes over R and l -Galois dual of its component codes over Fq . Further, we construct Euclidean LCD and l -Galois LCD codes from linear code over R . This consequently leads us to prove that any linear code over R is equivalent to Euclidean ( q>3 ) and l -Galois LCD (0<l<e, and pe-l+1 pe-1) code over R . Finally, we investigate MDS codes over R .