On Dold-Whitney's parallelizability of 4-manifolds

Abstract

We present a proof of the fact that a closed orientable 4-manifold is parallelizable if and only if its second Stiefel-Whitney class, first Pontryagin class and Euler characteristics vanish. This follows from a stronger result due to Dold and Whitney on the classification of oriented sphere bundles over a 4-complex. The contribution of this note is to outline in detail an argument which is essentially due to R. Kirby, using the classification of SO(4)-bundles over the 4-sphere by means of their Euler and first Pontryagin classes as a main tool.

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