中文

Angle Between Two Vectors over Finite Fields and an Application to Projective Unique Decoding

信息论 2026-05-13 v1 组合数学 math.IT

摘要

We introduce a Hamming-type angular function angleH(u,v):=mincFqndH(u,cv)\mathrm{angle}_H(u,v):= \min_{c \in \mathbb{F}_q^n} d_H(u, cv) on pairs of nonzero vectors in Fqn\mathbb{F}_q^n and show that it satisfies all three metric axioms up to scalar multiplication. The function angleH\mathrm{angle}_H is invariant under nonzero scalar multiplication in either argument and therefore descends to a genuine integer-valued metric on the projective space P(Fqn)\mathbb{P}(\mathbb{F}_q^n). As a concrete application, we prove an \emph{angular} (or \emph{projective}) version of the unique-decoding theorem for linear codes: if angleH(u,C{0})<d/2\mathrm{angle}_H(u, C\setminus\{0\}) < d/2, where dd is the minimum distance of the linear code CC, then the closest direction in CC to uu is unique up to nonzero scalar multiplication. We then discuss how this angular viewpoint relates to the proximity-gap programme for Reed--Solomon codes. To the best of our knowledge, this is the first attempt to define an angle notion for vectors over finite fields and interpret it from several perspectives, including geometry, coding theory, and cryptography.

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引用

@article{arxiv.2605.12216,
  title  = {Angle Between Two Vectors over Finite Fields and an Application to Projective Unique Decoding},
  author = {Kamil Otal},
  journal= {arXiv preprint arXiv:2605.12216},
  year   = {2026}
}