Symplectic Quasi Self-dual, Self-dual, and LCD Codes over Non-unital Rings of Order Six

Abstract

We consider codes over the two semi-local non-unital rings of order six, \[ H23 = a,b 2a=0, 3b = 0, a2=a, b2 = 0, ab = 0 = ba ,\] and \[H32 = a,b 2a=0, 3b = 0, a2=0, b2 = b, ab = 0 = ba . \] with respect to a symplectic inner product. Via the decomposition C = a\,Ca b\,Cb, any Hz-code splits into a binary component Ca and a ternary component Cb; this yields characterizations of symplectic self-orthogonal, self-dual, and quasi self-dual (QSD) codes, and allows the introduction of symplectic nice and symplectic linear complementary dual (LCD) codes. Using the automorphism groups of Ca and Cb and double-coset enumeration, we classify, up to permutation equivalence, all symplectic self-orthogonal and QSD Hz-codes of short even lengths.