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The $$4n^2$$ 4 n 2 -Inequality for Complete Intersection Singularities

The $$4n^2$$ 4 n 2 -Inequality for Complete Intersection Singularities The famous $$4n^2$$ 4 n 2 -inequality is extended to generic complete intersection singularities: it is shown that the multiplicity of the self-intersection of a mobile linear system with a maximal singularity is greater than $$4n^2\mu $$ 4 n 2 μ , where $$\mu $$ μ is the multiplicity of the singular point. http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Arnold Mathematical Journal Springer Journals

The $$4n^2$$ 4 n 2 -Inequality for Complete Intersection Singularities

Pukhlikov, Aleksandr
Arnold Mathematical Journal , Volume 3 (2) – Nov 30, 2016
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References (21)

Publisher
Springer Journals
Copyright
Copyright © 2016 by The Author(s)
Subject
Mathematics; Mathematics, general
ISSN
2199-6792
eISSN
2199-6806
DOI
10.1007/s40598-016-0060-8
Publisher site
See Article on Publisher Site

Abstract

The famous $$4n^2$$ 4 n 2 -inequality is extended to generic complete intersection singularities: it is shown that the multiplicity of the self-intersection of a mobile linear system with a maximal singularity is greater than $$4n^2\mu $$ 4 n 2 μ , where $$\mu $$ μ is the multiplicity of the singular point.

Journal

Arnold Mathematical JournalSpringer Journals

Published: Nov 30, 2016

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