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A Sard theorem for Tame Set-Valued mappings

经典分析与常微分方程 2015-06-26 v1 最优化与控制

摘要

If FF is a set-valued mapping from Rn\R^n into Rm\R^m with closed graph, then yRmy\in \R^m is a critical value of FF if for some xx with yF(x)y\in F(x), FF is not metrically regular at (x,y)(x,y). We prove that the set of critical values of a set-valued mapping whose graph is a definable (tame) set in an oo-minimal structure containing additions and multiplications is a set of dimension not greater than m1m-1 (resp. a porous set). As a corollary of this result we get that the collection of asymptotically critical values of a semialgebraic set-valued mapping has dimension not greater than m1m-1, thus extending to such mappings a corresponding result by Kurdyka-Orro-Simon for C1C^1 semialgebraic mappings. We also give an independent proof of the fact that a definable continuous real-valued function is constant on components of the set of its subdifferentiably critical points, thus extending to all definable functions a recent result of Bolte-Daniilidis-Lewis for globally subanalytic functions.

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引用

@article{arxiv.math/0607697,
  title  = {A Sard theorem for Tame Set-Valued mappings},
  author = {A. D. Ioffe},
  journal= {arXiv preprint arXiv:math/0607697},
  year   = {2015}
}

备注

23 p