Your search keyword '"Vector bundle"' showing total 2 results

1. Stable extendibility of vector bundles over lens spaces mod 3 and the stable splitting problem

Author

Hemmi, Yutaka, Kobayashi, Teiichi, and Komatsu, Kazushi

Subjects

*STABILITY (Mechanics), *VECTOR bundles, *TOPOLOGICAL spaces, *ARITHMETIC, *TANGENT bundles

Abstract

Abstract: Let denote the -dimensional standard lens space mod 3. In this paper, we study the conditions for a given real vector bundle over to be stably extendible to for every , and establish the formula on the power (k-fold) of a real vector bundle ζ over . Moreover, we answer the stable splitting problem for real vector bundles over by means of arithmetic conditions. [Copyright &y& Elsevier]

Published

2009

2. Stable extendibility of vector bundles over and the stable splitting problem

Author

Hemmi, Yutaka and Kobayashi, Teiichi

Subjects

*FIBER bundles (Mathematics), *COMPLEX numbers, *TOPOLOGICAL spaces, *PROJECTIVE spaces, *K-theory, *TENSOR products

Abstract

Abstract: Let F be the real number field R or the complex number field C, and let denote the real projective n-space. In this paper, we study the conditions for a given F-vector bundle over to be stably extendible to for every , and establish the formulas on the power (r-fold) of an F-vector bundle ζ over . Our results are improvements of the previous papers [T. Kobayashi, H. Yamasaki, T. Yoshida, The power of the tangent bundle of the real projective space, its complexification and extendibility, Proc. Amer. Math. Soc. 134 (2005) 303–310] and [Y. Hemmi, T. Kobayashi, Min Lwin Oo, The power of the normal bundle associated to an immersion of , its complexification and extendibility, Hiroshima Math. J. 37 (2007) 101–109]. Furthermore, we answer the stable splitting problem for F-vector bundles over by means of arithmetic conditions. [Copyright &y& Elsevier]

Published

2008