Jacobi polynomials and design theory II

Abstract

In this paper, we introduce some new polynomials associated to linear codes over Fq. In particular, we introduce the notion of split complete Jacobi polynomials attached to multiple sets of coordinate places of a linear code over Fq, and give the MacWilliams type identity for it. We also give the notion of generalized q-colored t-designs. As an application of the generalized q-colored t-designs, we derive a formula that obtains the split complete Jacobi polynomials of a linear code over Fq.Moreover, we define the concept of colored packing (resp. covering) designs. Finally, we give some coding theoretical applications of the colored designs for Type~III and Type~IV codes.