2017
DOI: 10.1016/j.aim.2017.01.016
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Arc-wise analytic stratification, Whitney fibering conjecture and Zariski equisingularity

Abstract: Abstract. In this paper we show Whitney's fibering conjecture in the real and complex, local analytic and global algebraic cases.For a given germ of complex or real analytic set, we show the existence of a stratification satisfying a strong (real arc-analytic with respect to all variables and analytic with respect to the parameter space) trivialization property along each stratum. We call such a trivialization arc-wise analytic and we show that it can be constructed under the classical Zariski algebro-geometri… Show more

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Cited by 27 publications
(82 citation statements)
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“…Let h : X → S be a regular mapping. Then h −1 (S(s, ǫ)) is AS-homeomorphic to h −1 (S(s, ǫ ′ )) for ǫ, ǫ ′ small enough by Corollary 9.7 in [33], therefore the class of h −1 (lk(s, S)) in K 0 (AS) is well-defined. It just depends on the class [h : X → S] of h : X → S in K 0 (R Var S ) because a regular isomorphism is in particular an AShomeomorphism.…”
Section: 4mentioning
confidence: 87%
See 1 more Smart Citation
“…Let h : X → S be a regular mapping. Then h −1 (S(s, ǫ)) is AS-homeomorphic to h −1 (S(s, ǫ ′ )) for ǫ, ǫ ′ small enough by Corollary 9.7 in [33], therefore the class of h −1 (lk(s, S)) in K 0 (AS) is well-defined. It just depends on the class [h : X → S] of h : X → S in K 0 (R Var S ) because a regular isomorphism is in particular an AShomeomorphism.…”
Section: 4mentioning
confidence: 87%
“…The virtual Poincaré polynomial of the link of an algebraic variety at a point is well-defined by [19]. Even more, the link, as an algebraic set, is well-defined up to AS-homeomorphism and does not depend on the embedding of the algebraic variety in the ambient smooth space (by Proposition 7.4 in [33]).…”
Section: 4mentioning
confidence: 99%
“…Let S be an algebraic stratification of V , and let ρ : V → R, ρ(v) = |v − v 0 | 2 . By [9], Theorem 9.3, there is a stratification T of R such that the restriction of ρ to the preimage of each stratum T ∈ T is a locally trivial fibration. Thus there exists η > 0 such that for every ǫ with 0 < ǫ < η, there exists δ > 0 and a stratum preserving arc-analytic semialgebraic homeomorphism…”
Section: The Obstructionmentioning
confidence: 99%
“…It follows that L ǫ (V, v 0 ) is independent of ǫ up to stratified arc-analytic semialgebraic homeomorphism (cf. [9], Cor. 9.6).…”
Section: The Obstructionmentioning
confidence: 99%
“…(For further details see [16], [17]. ) We say the algebraic stratification S of X ⊂ P r is good if it is a Whitney stratification and there exists an algebraic Whitney stratification T of P r such that S = T |X (i.e.…”
Section: Good Algebraic Stratificationsmentioning
confidence: 99%