Projection genericity of space curves

doi:10.1112/jtopol/jtm015

Journal of Topology Advance Access originally published online on February 5, 2008
Journal of Topology 2008 1(2):362-390; doi:10.1112/jtopol/jtm015

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Projection genericity of space curves

C. T. C. Wall

Department of Mathematical Sciences, University of Liverpool, Liverpool L69 7ZL, United Kingdom ctcw@liv.ac.uk

Abstract

If ${Gamma}$ is a smooth space curve, we consider the family of projectionsof ${Gamma}$ from a variable point not on ${Gamma}$ to a fixed plane. For a residualset of curves ${Gamma}$ , this family versally unfolds those singularitiesthat occur in it.

To obtain a family of curves which is open as well as densein the space of smooth maps, we must compactify the parameterspace, so we study curves in real projective space, and includeprojections from points of the curve itself. If ${Gamma}$ is smoothlyembedded, the projection C_P of ${Gamma}$ from is a well-defined smooth curve, and for generic ${Gamma}$ the family C_P has generic singularities.

However, when the point of projection moves off ${Gamma}$ , the projectionvaries discontinuously. We define a family of plane curves,parametrised by the blow-up X of P³ along ${Gamma}$ , such that for apoint in the exceptional locus lying over , we have the union of the projection C_P of ${Gamma}$ from P and a straight line L through the image of the tangentat P. A key result asserts that this is a flat family. We givean explicit list of restrictions on the family C_P ${cup}$ L (the keycondition is that the total contact order of C_P with L neverexceeds 2), and show that these hold for a dense open set ofcurves ${Gamma}$ , and that if they do hold, there is a neighbourhoodU of ${Gamma}$ , such that the family of projections from points of is generic.

Combining this list of conditions with those obtained previouslygives a natural definition of a dense set of space curves ${Gamma}$ ,for which the complete family of projections has generic singularities,and we show that this set is also open.

Received September 6, 2007.

2000 Mathematics Subject Classification 57R45 (primary), 51N15, 53A04 (secondary)

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