The singular points of analytic space-curves

AbstractWe consider a smooth curve with singular points in the Euclidean space. As a smooth curve with singular points, we have introduced a framed curve or a framed immersion. A framed immersion is a smooth curve with a moving frame and the pair is an immersion. We define an evolute and a focal surface of a framed immersion in the Euclidean space. The evolutes and focal surfaces of framed immersions are generalizations of each object of regular space curves. We give relationships between singularities of the evolutes and of the focal surfaces. Moreover, we consider properties of the evolutes, focal surfaces and repeated evolutes.

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Contributions to projective theory of singular points of space curves

Transactions of the American Mathematical Society ◽

10.1090/s0002-9947-1947-0020829-4 ◽

1947 ◽

Vol 61 (3) ◽

pp. 369-369 ◽

Cited By ~ 1

Author(s):

Su-Cheng Chang

Keyword(s):

Singular Points ◽

Space Curves

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Sur l’incomplétude de la série linéaire caractéristique d’une famille de courbes planes à nœuds et à cusps

Nagoya Mathematical Journal ◽

10.1017/s0027763000025514 ◽

2003 ◽

Vol 171 ◽

pp. 51-83 ◽

Cited By ~ 3

Author(s):

Sébastien Guffroy

Keyword(s):

Hilbert Scheme ◽

Singular Points ◽

Plane Curves ◽

Connected Space ◽

Space Curves

AbstractSince J.Wahl ([27]), it is known that degree d plane curves having some fixed numbers of nodes and cusps as its only singularities can be represented by a scheme, let say H, which can be singular. In Wahl’s example, H is singular along a subscheme F but the induced reduced scheme Hred is smooth along F. In this work, we construct explicitly a family of plane curves with nodes and cusps which are represented by singular points of Hred.To this end, we begin to show that the Hilbert scheme of smooth and connected space curves of degree 12 and genus 15 is irreducible and generically smooth. It follows that it is singular along a hypersurface (3.10). This example is minimal in the sense that the Hilbert scheme of smooth and connected space curves is regular in codimension 1 for d < 12 (B.2). Finally we construct our plane curves from the space curves represented by points of this hypersurface (4.7).

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The fundamental theorem of analytic space curves and apparent singularities of Fuchsian differential equations

Tohoku Mathematical Journal ◽

10.2748/tmj/1178228899 ◽

1984 ◽

Vol 36 (1) ◽

pp. 17-24 ◽

Cited By ~ 5

Author(s):

Takao Sasai

Keyword(s):

Differential Equations ◽

Fundamental Theorem ◽

Analytic Space ◽

Space Curves ◽

Fuchsian Differential Equations

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On Meromorphic Mappings into Taut Complex Analytic Spaces

Nagoya Mathematical Journal ◽

10.1017/s0027763000015579 ◽

1973 ◽

Vol 50 ◽

pp. 49-65

Author(s):

Toshio Urata

Keyword(s):

Holomorphic Mapping ◽

Singular Points ◽

Holomorphic Mappings ◽

Analytic Space ◽

Meromorphic Mapping ◽

Analytic Set ◽

Meromorphic Mappings ◽

Proper Modification ◽

Complex Analytic Space

In this paper, we study a certain difference between meromorphic mappings and holomorphic mappings into taut complex analytic spaces. We prove in §2 that, for any complex analytic space X, there exists a unique proper modification of X with center Sg (X) which is minimal with respect to the property that M(X) is normal and, for any T-meromorphic mapping f: X → Y (see Definition 1.3) into a complex analytic space Y, there exists a unique holomorphic mapping such that except some nowhere dense complex analytic set, where Sg(X) denotes the set of all singular points of X.

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