Closed manifolds coming from Artinian complete intersections
Algebraic Topology
2007-12-11 v1
Abstract
We reformulate the integrality property of the Poincar\'{e} inner product in the middle dimension, for an arbitrary Poincar\'{e} -algebra, in classical terms (discriminant and local invariants). When the algebra is 1-connected, we show that this property is the only obstruction to realizing it by a closed manifold, up to dimension 11. We reinterpret a result of Eisenbud and Levine on finite map germs, relating the degree of the map germ to the signature of the associated local ring, to answer a question of Halperin on artinian weighted complete intersections.We analyse the homogeneous artinian complete intersections over realized by closed manifolds of dimensions 4 and 8, and their signatures.
Cite
@article{arxiv.math/0406161,
title = {Closed manifolds coming from Artinian complete intersections},
author = {Ştefan Papadima and Laurenţiu Păunescu},
journal= {arXiv preprint arXiv:math/0406161},
year = {2007}
}
Comments
13 pages