Fundamental Groups of Some Special Quadric Arrangements

AMRAM Meirav; M. Teicher

Fundamental Groups of Some Special Quadric Arrangements

Department of Mathematics

Research output: Contribution to journal › Article › peer-review

Abstract

Continuing our work on the fundamental groups of conic-line arrangements [3], we obtain presentations of fundamental groups of the complements of three families of quadric arrangements in P 2 . The first arrangement is a union of n conics, which are tangent to each other at two common points. The second arrangement is composed of n quadrics which are tangent to each other at one common point. The third arrangement is composed of n quadrics, n−1 of them are tangent to the nth one and each one of the n − 1 quadrics is transversal to the other n − 2 ones.

Original language	American English
Pages (from-to)	259-276
Journal	Revista Matematica Complutense
Volume	1
Issue number	2
State	Published - 2006

Cite this

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title = "Fundamental Groups of Some Special Quadric Arrangements",

abstract = "Continuing our work on the fundamental groups of conic-line arrangements [3], we obtain presentations of fundamental groups of the complements of three families of quadric arrangements in P 2 . The first arrangement is a union of n conics, which are tangent to each other at two common points. The second arrangement is composed of n quadrics which are tangent to each other at one common point. The third arrangement is composed of n quadrics, n−1 of them are tangent to the nth one and each one of the n − 1 quadrics is transversal to the other n − 2 ones.",

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AU - Teicher, M.

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AB - Continuing our work on the fundamental groups of conic-line arrangements [3], we obtain presentations of fundamental groups of the complements of three families of quadric arrangements in P 2 . The first arrangement is a union of n conics, which are tangent to each other at two common points. The second arrangement is composed of n quadrics which are tangent to each other at one common point. The third arrangement is composed of n quadrics, n−1 of them are tangent to the nth one and each one of the n − 1 quadrics is transversal to the other n − 2 ones.

UR - http://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.193.4917&rep=rep1&type=pdf

M3 - Article

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JO - Revista Matematica Complutense

JF - Revista Matematica Complutense

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ER -

Fundamental Groups of Some Special Quadric Arrangements

Abstract

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