The duals of generic space curves and complete intersections

J.W. Bruce

Research output: Contribution to journalArticle

Abstract

In a previous paper we discussed the duals of generic hypersurfaces: both smooth hypersurfaces in n and algebraic hypersurfaces in real or complex projective space n. In this note we show how to extend the methods of [1] to cover the case of complete intersections in n and preface this with a brief discussion on the contact of space curves in n with planes. We shall use the notation of [1].
Original languageEnglish
Pages (from-to)259-263
JournalProceedings of the Edinburgh Mathematical Society (Series 2)
Volume26
Issue number2
DOIs
Publication statusPublished - 1983

Fingerprint

Space Curve
Complete Intersection
Hypersurface
Complex Projective Space
Notation
Cover
Contact

Cite this

@article{0b930376d0b74196a8b8c0a6da58d6f5,
title = "The duals of generic space curves and complete intersections",
abstract = "In a previous paper we discussed the duals of generic hypersurfaces: both smooth hypersurfaces in n and algebraic hypersurfaces in real or complex projective space n. In this note we show how to extend the methods of [1] to cover the case of complete intersections in n and preface this with a brief discussion on the contact of space curves in n with planes. We shall use the notation of [1].",
author = "J.W. Bruce",
year = "1983",
doi = "10.1017/S0013091500016965",
language = "English",
volume = "26",
pages = "259--263",
journal = "Proceedings of the Edinburgh Mathematical Society",
issn = "0013-0915",
publisher = "Cambridge University Press",
number = "2",

}

The duals of generic space curves and complete intersections. / Bruce, J.W.

In: Proceedings of the Edinburgh Mathematical Society (Series 2), Vol. 26, No. 2, 1983, p. 259-263.

Research output: Contribution to journalArticle

TY - JOUR

T1 - The duals of generic space curves and complete intersections

AU - Bruce, J.W.

PY - 1983

Y1 - 1983

N2 - In a previous paper we discussed the duals of generic hypersurfaces: both smooth hypersurfaces in n and algebraic hypersurfaces in real or complex projective space n. In this note we show how to extend the methods of [1] to cover the case of complete intersections in n and preface this with a brief discussion on the contact of space curves in n with planes. We shall use the notation of [1].

AB - In a previous paper we discussed the duals of generic hypersurfaces: both smooth hypersurfaces in n and algebraic hypersurfaces in real or complex projective space n. In this note we show how to extend the methods of [1] to cover the case of complete intersections in n and preface this with a brief discussion on the contact of space curves in n with planes. We shall use the notation of [1].

U2 - 10.1017/S0013091500016965

DO - 10.1017/S0013091500016965

M3 - Article

VL - 26

SP - 259

EP - 263

JO - Proceedings of the Edinburgh Mathematical Society

JF - Proceedings of the Edinburgh Mathematical Society

SN - 0013-0915

IS - 2

ER -