A Degree Formula for Secant Varieties of Curves. Issue 2 (21st August 2013)

Record Type:
Journal Article
Title:
A Degree Formula for Secant Varieties of Curves. Issue 2 (21st August 2013)
Main Title:
A Degree Formula for Secant Varieties of Curves
Authors:
Achilles, Rüdiger
Manaresi, Mirella
Schenzel, Peter
Abstract:
<abstract abstract-type="normal"> <title>Abstract</title> <p>Using the Stückrad–Vogel self-intersection cycle of an irreducible and reduced curve in pro-jective space, we obtain a formula that relates the degree of the secant variety, the degree and the genus of the curve and the self-intersection numbers, the multiplicities and the number of branches of the curve at its singular points. From this formula we deduce an expression for the difference between the genera of the curve. This result shows that the self-intersection multiplicity of a curve in projective <italic>N</italic>-space at a singular point is a natural generalization of the intersection multiplicity of a plane curve with its generic polar curve. In this approach, the degree of the secant variety (up to a factor 2), the self-intersection numbers and the multiplicities of the singular points are leading coefficients of a bivariate Hilbert polynomial, which can be computed by computer algebra systems.</p> </abstract>
Is Part Of:
Proceedings of the Edinburgh Mathematical Society. Volume 57:Issue 2(2014)
Journal:
Proceedings of the Edinburgh Mathematical Society
Issue:
Volume 57:Issue 2(2014)
Issue Display:
Volume 57, Issue 2 (2014)
Year:
2014
Volume:
57
Issue:
2
Issue Sort Value:
2014-0057-0002-0000
Page Start:
305
Page End:
322
Publication Date:
2013-08-21
Subjects:
Mathematics -- Periodicals
510
Journal URLs:
http://journals.cambridge.org/action/displayJournal?jid=PEM
DOI:
10.1017/S0013091513000497
Languages:
English
ISSNs:
0013-0915
Deposit Type:
Legaldeposit
View Content:
Available online (eLD content is only available in our Reading Rooms)
Physical Locations:
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Ingest File:
3798.xml