Regular Cyclic (q+1)-Arcs in (3,2m): Spectral Rigidity, Descent, and an MDS Criterion

Abstract

Let q=2m with m 3 and set n:=q+1. We investigate (q+1)-arcs A⊂ PG(3,q) that admit a regular cyclic subgroup C PGL(4,q) of order n. Over K=Fq2, such an action can be conjugated to a diagonal one, producing explicit cyclic monomial models \[ Ma = \[1:t:ta:ta+1]:t∈ Un\⊂ PG(3,K), Un=\u∈ K×:un=1\, \] with a∈(Z/nZ)×. We develop a spectral rigidity principle to obtain a precise descent criterion: Ma is K-projectively equivalent to a (q+1)-arc defined over Fq if and only if a 2e n for some integer e with (e,m)=1. Consequently, regular cyclic pairs ( A,C) fall into exactly (m)/2 K-projective equivalence classes. As an immediate coding-theoretic application, we resolve the remaining AMDS/MDS dichotomy for the BCH family C(q,q+1,3,h) studied by Xu et al.: C(q,q+1,3,h) is MDS if and only if 2h+1 2e n for some e with (e,m)=1. The underlying spectral rigidity step is formulated in a general setting for diagonal regular cyclic pairs in PG(r,K), providing a portable reduction of projective equivalence questions to explicit congruences on exponent data.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…