Whitney equisingularity in families of generically reduced curves

Silva, O. N.; Snoussi, Jawad

doi:10.1007/s00229-019-01164-3

Cited by 6 publications

(3 citation statements)

References 11 publications

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“…Consider a flat family of reduced curves p : (X, 0) → (C, 0) and let p : X → T be a good representative (see [2, p. 248], see also [11,Def. 2.2]).…”

Section: Generic Projections Of Space Curves In Cmentioning

confidence: 99%

On the fifth Whitney cone of a complex analytic curve

Flores¹,

Silva²,

Snoussi³

2021

Preprint

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We present an explicit procedure to determine the C5-cone of a reduced complex analytic curve X ⊂ C n at a singular point 0 ∈ X, which is known to be a union of a finite number of planes. We also give upper bounds on the number of these planes. The procedure comes out with a collections of integers that we call auxiliary multiplicities and we prove they determine the Lipschitz type of complex curve singularities. We finish presenting an example which shows that the number of irreducible components of the C5-cone of a curve is not a bi-Lipschitz invariant.

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“…Consider a flat family of reduced curves p : (X, 0) → (C, 0) and let p : X → T be a good representative (see [2, p. 248], see also [11,Def. 2.2]).…”

Section: Generic Projections Of Space Curves In Cmentioning

confidence: 99%

On the fifth Whitney cone of a complex analytic curve

Flores¹,

Silva²,

Snoussi³

2021

Preprint

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“…If this is the case, we say that f (D( f ) i ) is a generically reduced curve. Recently, Snoussi and the author showed in Silva and Snoussi (2019), Lemma 4.8 that if (C, 0) is a germ of generically reduced curve and (|C|, 0) is its associated reduced curve, then the multiplicities of (C, 0) and (|C|, 0) at 0 are equal. Hence, we also can calculate the multiplicity of f (D( f ) i ) considering its reduced structure and using a corresponding Puiseux parametrization for it.…”

Section: ))mentioning

confidence: 99%

On Invariants of Generic Slices of Weighted Homogeneous Corank 1 Map Germs from the Plane to 3-Space

Silva

2020

Bull Braz Math Soc, New Series

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In this work, we consider a quasi-homogeneous, corank 1, finitely determined map germ f from (C 2 , 0) to (C 3 , 0). We consider the invariants m(f (D(f))) and J , where m(f (D(f))) denotes the multiplicity of the image of the double point curve D(f) of f and J denotes the number of tacnodes that appears in a stabilization of the transversal slice curve of f (C 2). We present formulas to calculate m(f (D(f))) and J in terms of the weights and degrees of f .

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“…If this is the case, we say that f (D(f ) i ) is a generically reduced curve. Recently, the author and Snoussi showed in [16,Lemma 4.8] that if (C, 0) is a germ of generically reduced curve and (|C|, 0) is its associated reduced curve, then the multiplicities of (C, 0) and (|C|, 0) at 0 are equal. Hence, we also can calculate the multiplicity of f (D(f ) i ) considering its reduced structure and using a corresponding Puiseux parametrization for it.…”

Section: Note That Ifmentioning

confidence: 99%

A formula to calculate the invariant $J$ of a quasi-homogeneous map germ

Silva¹

2020

Preprint

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In this work, we consider a quasi-homogeneous, corank 1, finitely determined map germ f from (C 2 , 0) to (C 3 , 0).We consider the invariants m(f (D(f )) and J, where m(f (D(f )) denotes the multiplicity of the image of the double point curve D(f ) of f and J denotes the number of tacnodes that appears in a stabilization of the transversal slice curve of f (C 2 ). We present formulas to calculate m(f (D(f )) and J in terms of the weights and degrees of f .

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Whitney equisingularity in families of generically reduced curves

Cited by 6 publications

References 11 publications

On the fifth Whitney cone of a complex analytic curve

On the fifth Whitney cone of a complex analytic curve

On Invariants of Generic Slices of Weighted Homogeneous Corank 1 Map Germs from the Plane to 3-Space

A formula to calculate the invariant $J$ of a quasi-homogeneous map germ

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