Elementary abelian 2-group actions on flag manifolds and applications
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- by Goutam Mukherjee and Parameswaran Sankaran PDF
- Proc. Amer. Math. Soc. 126 (1998), 595-606 Request permission
Abstract:
Let $\mathcal N_\ast$ denote the unoriented cobordism ring. Let $G=(\mathbb Z/2)^n$ and let $Z_\ast (G)$ denote the equivariant cobordism ring of smooth manifolds with smooth $G$-actions having finite stationary points. In this paper we show that the unoriented cobordism class of the (real) flag manifold $M=O(m)/(O(m_1)\times \dots \times O(m_s))$ is in the subalgebra generated by $\bigoplus _{i<2^n}\mathcal N_i$, where $m= \sum m_j$, and $2^{n-1}<m\le 2^n$. We obtain sufficient conditions for indecomposability of an element in $Z_\ast (G)$. We also obtain a sufficient condition for algebraic independence of any set of elements in $Z_\ast (G)$. Using our criteria, we construct many indecomposable elements in the kernel of the forgetful map $Z_d(G)\to \mathcal N_d$ in dimensions $2\le d<n$, for $n>2$, and show that they generate a polynomial subalgebra of $Z_\ast (G)$.References
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Additional Information
- Goutam Mukherjee
- Affiliation: Stat-Math Division, Indian Statistical Institute, 203 B. T. Road, Calcutta-700 035, India
- Email: goutam@isical.ernet.in
- Parameswaran Sankaran
- Affiliation: SPIC Mathematical Institute, 92 G. N. Chetty Road, Madras-600 017, India
- Email: sankaran@smi.ernet.in
- Received by editor(s): July 11, 1996
- Communicated by: Thomas Goodwillie
- © Copyright 1998 American Mathematical Society
- Journal: Proc. Amer. Math. Soc. 126 (1998), 595-606
- MSC (1991): Primary 57R75, 57R85
- DOI: https://doi.org/10.1090/S0002-9939-98-04133-1
- MathSciNet review: 1423325