English

Projector additive group codes

Rings and Algebras 2026-04-21 v2

Abstract

Let F=FqF=\mathbb{F}_q and let K=FqmK=\mathbb{F}_{q^m} be a finite extension. An additive left group code is a left FGFG-submodule of the group algebra KGKG. In this paper, we introduce projector additive left group codes and restricted projector additive left group codes as additive counterparts of idempotent group codes in the classical theory of group codes. More precisely, they are defined, respectively, as images of FGFG-linear projectors on KGKG and as images of left FGFG-submodules under such projectors. This perspective is motivated by the fact that idempotent elements of KGKG do not yield a sufficiently general and natural algebraic framework for the study of additive left group codes. Projector additive left group codes are a particular class of projective left FGFG-submodules of KGKG. Consequently, in the semisimple case every additive left group code arises in this way, whereas in the non-semisimple case the projector construction captures precisely the direct summands of KGKG as left FGFG-modules, and hence a natural subclass of projective left FGFG-submodules. We further relate trace-Euclidean and trace-Hermitian duality to adjoint projectors, establish criteria for the LCD and self-dual cases, study the Murray--von Neumann equivalence of projectors, and interpret quotients by orthogonal codes in terms of module duals.

Cite

@article{arxiv.2604.15158,
  title  = {Projector additive group codes},
  author = {Javier de la Cruz},
  journal= {arXiv preprint arXiv:2604.15158},
  year   = {2026}
}
R2 v1 2026-07-01T12:12:54.204Z