On the -DLIPs of codes over finite commutative rings

Abstract

Generalizing the linear complementary duals, the linear complementary pairs and the hull of codes, we introduce the concept of -dimension linear intersection pairs (-DLIPs) of codes over a finite commutative ring (R), for some positive integer . In this paper, we study -DLIP of codes over R in a very general setting by a uniform method. Besides, we provide a necessary and sufficient condition for the existence of a non-free (or free) -DLIP of codes over a finite commutative Frobenius ring. In addition, we obtain a generator set of the intersection of two constacyclic codes over a finite chain ring, which helps us to get an important characterization of -DLIP of constacyclic codes. Finally, the -DLIP of constacyclic codes over a finite chain ring are used to construct new entanglement-assisted quantum error correcting (EAQEC) codes.