English

Degree bounds for separating invariants

Commutative Algebra 2014-06-25 v2

Abstract

If V is a representation of a linear algebraic group G, a set S of G-invariant regular functions on V is called separating if the following holds: If two elements v,v' from V can be separated by an invariant function, then there is an f from S such that f(v) is different from f(v'). It is known that there always exist finite separating sets. Moreover, if the group G is finite, then the invariant functions of degree <= |G| form a separating set. We show that for a non-finite linear algebraic group G such an upper bound for the degrees of a separating set does not exist. If G is finite, we define b(G) to be the minimal number d such that for every G-module V there is a separating set of degree less or equal to d. We show that for a subgroup H of G we have b(H) <= b(G) <= [G:H] b(H),andthatb(G)<=b(G/H)b(H), and that b(G) <= b(G/H) b(H) in case H is normal. Moreover, we calculate b(G) for some specific finite groups.

Keywords

Cite

@article{arxiv.1001.5216,
  title  = {Degree bounds for separating invariants},
  author = {Martin Kohls and Hanspeter Kraft},
  journal= {arXiv preprint arXiv:1001.5216},
  year   = {2014}
}

Comments

11 pages

R2 v1 2026-06-21T14:40:47.863Z