Triple Points of Immersed Orientable 2n-Manifolds in 3n-Space
Triple Points of Immersed Orientable 2n-Manifolds in 3n-Space
The paper proves that for all integer n larger than 3, there exists a self transverse immersion of a 4n dimensional manifold with complex structure on its normal bundle into 6n dimensional Euclidean space that has an odd number of triple points. The paper is not identical to the one that appeared in the LMS journal. That version was sadly corrupted by substandard type setting.
335-346
Mitchell, Bill
5d045751-9ef4-4375-9e89-dbae07c90049
Eccles, Peter J.
efee6c11-aa88-4553-b7ef-3117bd33d711
1989
Mitchell, Bill
5d045751-9ef4-4375-9e89-dbae07c90049
Eccles, Peter J.
efee6c11-aa88-4553-b7ef-3117bd33d711
Mitchell, Bill and Eccles, Peter J.
(1989)
Triple Points of Immersed Orientable 2n-Manifolds in 3n-Space.
Journal of the London Mathematical Society, 39 (2), .
(doi:10.1112/jlms/s2-39.2.335).
Abstract
The paper proves that for all integer n larger than 3, there exists a self transverse immersion of a 4n dimensional manifold with complex structure on its normal bundle into 6n dimensional Euclidean space that has an odd number of triple points. The paper is not identical to the one that appeared in the LMS journal. That version was sadly corrupted by substandard type setting.
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Published date: 1989
Organisations:
Electronics & Computer Science, IT Innovation
Identifiers
Local EPrints ID: 266060
URI: http://eprints.soton.ac.uk/id/eprint/266060
ISSN: 0024-6107
PURE UUID: 12bb9caa-9df0-4f93-8be5-8a03117e7718
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Date deposited: 04 Jul 2008 20:56
Last modified: 14 Mar 2024 08:20
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Author:
Bill Mitchell
Author:
Peter J. Eccles
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