English

Normal Forms in Differential Galois Theory for the Classical Groups

Commutative Algebra 2022-04-14 v1 Rings and Algebras

Abstract

Let GG be a classical group of dimension dd and let a=(a1,,ad)\boldsymbol{a}=(a_1,\dots,a_d) be differential indeterminates over a differential field FF of characteristic zero with algebraically closed field of constants CC. Further let A(a)A(\boldsymbol{a}) be a generic element in the Lie algebra g(Fa)\mathfrak{g}(F\langle \boldsymbol{a} \rangle) of GG obtained from parametrizing a basis of g\mathfrak{g} with the indeterminates a\boldsymbol{a}. It is known (cf. work by Juan) that the differential Galois group of y=A(a)y\boldsymbol{y}'=A(\boldsymbol{a})\boldsymbol{y} over FaF\langle \boldsymbol{a} \rangle is G(C)G(C). In this paper we construct a differential field extension L\mathcal{L} of FaF\langle \boldsymbol{a} \rangle such that the field of constants of L\mathcal{L} is CC, the differential Galois group of y=A(a)y\boldsymbol{y}'=A(\boldsymbol{a})\boldsymbol{y} over L\mathcal{L} is still the full group G(C)G(C) and A(a)A(\boldsymbol{a}) is gauge equivalent over L\mathcal{L} to a matrix in normal form which we introduced in work by Seiss. We also consider specializations of the coefficients of A(a)A(\boldsymbol{a}).

Keywords

Cite

@article{arxiv.2204.06494,
  title  = {Normal Forms in Differential Galois Theory for the Classical Groups},
  author = {Daniel Robertz and Matthias Seiss},
  journal= {arXiv preprint arXiv:2204.06494},
  year   = {2022}
}
R2 v1 2026-06-24T10:47:12.345Z