Hostname: page-component-586b7cd67f-t7czq Total loading time: 0 Render date: 2024-11-23T01:16:47.375Z Has data issue: false hasContentIssue false

The Topology of Quasibundles

Published online by Cambridge University Press:  20 November 2018

H. Movahedi-Lankarani
Affiliation:
Department of Mathematics Penn State Altoona Campus Altoona, Pennsylvania 16601 U.S.A. e-mail: [email protected]
R. Wells
Affiliation:
Department of Mathematics Penn State University University Park, Pennsylvania 16802 U.S.A. e-mail: [email protected]
Rights & Permissions [Opens in a new window]

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

Let ℳ(N, N) be the space of all N × N real matrices and let 𝒢(N) be the set of all linear subspaces of ℝN. The maps ker and coker from ℳ(N, N) onto 𝒢(N) induce two quotient topologies, the right and left respectively. A quasibundle over a space X is defined as a continuous map from X into 𝒢(N)\ it is a right quasibundle if 𝒢(N) = ℳ(N,N)/ ker and a left quasibundle if 𝒢(N) = ℳ(N,N)/ coker. The following is established. Theorem: Let ξ be a left quasibundle over a closed subset of some Euclidean space. Then the following statements are equivalent: (i) ξ has enough sections pointwise. (ii) Sections zero at infinity over closed subsets may be extended globally, (iii) A vector subbundle over a closed subset extends to a vector subbundle over a neighborhood, (iv) ξ is a fibrewise sum of local vector subbundles. (v) There exist finitely many global sections spanning ξ. (vi) ξ is an image quasibundle. (vii) ξ results from a Swan construction. These results are used to prove a version of the Hirsch-Smale immersion theorem for locally compact subsets of Euclidean space.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1995

References

1. Dugundji, J., Topology, Allyn and Bacon, Boston, 1966.Google Scholar
2. Fédérer, H., Geometric Measure Theory, Springer-Verlag, New York, 1969.Google Scholar
3. Glaeser, G., Étude de quelque algèbres tayloriennes, J. Analyse Math. 6(1958), 1124.erratum, insert to (2) 6(1958).Google Scholar
4. Goresky, M. and MacPherson, R., Stratified Morse Theory, Springer-Verlag, New York 1988.Google Scholar
5. Gromov, M., Partial Differential Relations, Springer-Verlag, New York, 1986.Google Scholar
6. Helgason, S., Differential Geometry and Symmetric Spaces, Academic Press, New York, 1964.Google Scholar
7. Henon, M., A two dimensional mapping with a strange attractor, Comm. Math. Phys. 50(1976), 6977.Google Scholar
8. Hirsch, M., Immersions of manifolds, Trans. Amer. Math. Soc. 93(1959), 242276.Google Scholar
9. Hurewicz, W. and Wallman, H., Dimension Theory, Princeton University Press, 1941.Google Scholar
10. Husemoller, D., Fibre Bundles, McGraw-Hill, 1966.Google Scholar
11. Mansfield, R., Movahedi-Lankarani, H. and Wells, R., Smooth finite dimensional embeddings, preprint.Google Scholar
12. Morgan, F., Geometric Measure Theory—A Beginners Approach, Academic Press, San Diego, 1988.Google Scholar
13. Phillips, A., Submersions of open manifolds, Topology (2) 6(1967), 170206.Google Scholar
14. Phillips, A., Publications I.R.M.A.—U.S.T.L.Flandres Artois, 1987. Volume 6, Numéro Spécial, Journées M.-H. Schwartz.Google Scholar
15. Samsonowicz, J., Images of vector bundles morphism, Bull. Polish Acad. Sci. Math 34(1986), 599607.Google Scholar
16. Schwartz, M.H., Classes et caractères de Chern-Mather des espaces linéaires, C.R. Acad. Sci. Paris Sér. I Math. (5) 295(1982), 399402.Google Scholar
17. Swan, R.G., Vector bundles and projective modules, Trans. Amer. Math. Soc. 105(1962), 264277.Google Scholar