中文

Invariant tensor fields and orbit varieties for finite algebraic transformation groups

代数几何 2007-05-23 v2 表示论

摘要

Let XX be a smooth algebraic variety endowed with an action of a finite group GG such that there exists the geometric quotient πX:XX/G\pi_X:X\to X/G. We characterize rational tensor fields τ\tau on X/GX/G such that the {\it pull back} of τ\tau is regular on XX: these are precisely all τ\tau such that divRX/G(τ)0\operatorname{div}_{R_{X/G}}(\tau)\ge 0 where RX/GR_{X/G} is the {\it reflection divisor} of X/GX/G and divRX/G(τ)\operatorname{div}_{R_{X/G}}(\tau) is the {\it RX/GR_{X/G}-divisor} of τ\tau. We give some applications, in particular to the generalization of Solomon's theorem. In the last section we show that if VV is a finite dimensional vector space and GG a finite subgroup of GL(V)\operatorname{GL}(V), then each automorphism ψ\psi of V/GV/G admits a biregular lift ϕ:VV\phi: V\to V provided that ψ\psi maps the regular stratum to itself and ψ(RX/G)=RX/G\psi_*(R_{X/G})=R_{X/G}.

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引用

@article{arxiv.math/0206008,
  title  = {Invariant tensor fields and orbit varieties for finite algebraic transformation groups},
  author = {Mark Losik and Peter W. Michor and Vladimir L. Popov},
  journal= {arXiv preprint arXiv:math/0206008},
  year   = {2007}
}

备注

AmSTeX, revised version with 27 pages. More detailed proofs, small mistakes corrected