Integral Stiefel-Whitney class: Difference between revisions

Revision as of 23:59, 13 December 2007

Definition

The integral Stiefel-Whitney class for an oriented real vector bundle over a differential manifold, is defined as a sum of characteristic classes in various dimensions, where the characteristic class in dimension $i + 1$ is obtained by applying the Bockstein homomorphism to the $i^{t h}$ Stiefel-Whitney class.

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	==Definition==		==Definition==

	The '''integral Stiefel-Whitney class''' for an oriented real vector bundle over a [[differential manifold]], is defined as a sum of characteristic classes in various dimensions, where the characteristic class in dimension <math>i+1</math> is obtained by applying the [[wp:Bockstein homomorphism]] to the <math>i^{th}</math> [[Stiefel-Whitney class]].		The '''integral Stiefel-Whitney class''' for an oriented real vector bundle over a [[differential manifold]], is defined as a sum of characteristic classes in various dimensions, where the characteristic class in dimension <math>i+1</math> is obtained by applying the [[ts:Bockstein homomorphism\|Bockstein homomorphism]] to the <math>i^{th}</math> [[Stiefel-Whitney class]].