UNIGE document Scientific Article
previous document  unige:12259  next document
add to browser collection
Title

The Alexander module of links at infinity

Author
Published in International Mathematics Research Notices. 2004, no. 20, p. 1023-1036
Abstract Walter Neumann showed that the topology of a ``regular'' algebraic curve V in C^2 is determined up to proper isotopy by some link in S^3 called the link at infinity of V. In this note, we compute the Alexander module over C[t^{pm 1}] of any such link at infinity.
Identifiers
Note 2 figures
Full text
Article (196 Kb) - public document Free access
Structures
Citation
(ISO format)
CIMASONI, David. The Alexander module of links at infinity. In: International Mathematics Research Notices, 2004, n° 20, p. 1023-1036. https://archive-ouverte.unige.ch/unige:12259

227 hits

80 downloads

Update

Deposited on : 2010-11-01

Export document
Format :
Citation style :