English

Vector invariants for two-dimensional orthogonal groups over finite fields

Commutative Algebra 2026-02-24 v3

Abstract

Let Fq\mathbb{F}_{q} be a finite field of characteristic 22 and O2+(Fq)O_2^+(\mathbb{F}_{q}) be the 22-dimensional orthogonal group of plus type over Fq\mathbb{F}_{q}. Consider the standard representation VV of O2+(Fq)O_2^+(\mathbb{F}_{q}) and the ring of vector invariants Fq[mV]O2+(Fq)\mathbb{F}_{q}[mV]^{O_2^+(\mathbb{F}_{q})} for any mN+m\in \mathbb{N}^{+}. We prove a first main theorem for (O2+(Fq),V)(O_2^+(\mathbb{F}_{q}),V), i.e., we find a minimal generating set for Fq[mV]O2+(Fq)\mathbb{F}_{q}[mV]^{O_2^+(\mathbb{F}_{q})}. As a consequence, we derive the Noether number βmV(O2+(Fq))=max{q1,m}\beta_{mV}(O_2^+(\mathbb{F}_{q}))=\max\{q-1,m\}. We construct a free basis for Fq[2V]O2+(Fq)\mathbb{F}_{q}[2V]^{O_2^+(\mathbb{F}_{q})} over a suitably chosen homogeneous system of parameters. We also obtain a generating set of the Hilbert ideal for Fq[mV]O2+(Fq)\mathbb{F}_{q}[mV]^{O_2^+(\mathbb{F}_{q})} which shows that the Hilbert ideal can be generated by invariants of degree q1=O2+(Fq)2\leqslant q-1=\frac{|O_2^+(\mathbb{F}_{q})|}{2}, positively confirming a conjecure of Derksen and Kemper for this particular case.

Keywords

Cite

@article{arxiv.1612.06039,
  title  = {Vector invariants for two-dimensional orthogonal groups over finite fields},
  author = {Yin Chen},
  journal= {arXiv preprint arXiv:1612.06039},
  year   = {2026}
}

Comments

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R2 v1 2026-06-22T17:27:43.506Z