Tangent bundles of bundles (Ex)

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Let $<wikitex>; Let $F \to E \stackrel{\pi}{\to} B$ be a smooth fiber bundle so that all spaces $F, E$ and $B$ are manifolds. {{beginthm|Exercise}} Show that $TE$, the tangent bundle of $E$, splits as the sum of two bundles $$ TE \cong \pi^*TB \oplus T_{\pi}E $$ where $T_{\pi}E$ consists of those tangent vectors tangent to the fibres of $\pi$. {{endthm}} {{beginthem|Question}} Is the bundle $T_{\pi}E$ the pullback of some bundle over $B$? {{endthm}} {{beginthm|Exercise}} Suppose that $\pi \colon E \to B$ is itself a smooth vector bundle. Determine $TE$ in terms of $TB$ and $\pi$ regarded as a vector bundle. {{endthm}} {{beginthm|Exercise}} Suppose that $\pi \colon E \to B$ is the sphere bundle of a vector bundle. Determine the stable tangent bundle of $E$ in terms of $\pi$ and $TB$. {{endthm}} {{beginthm|Exercise}} Compute the total Pontragin class of $\Hh P^n$, [[Wikipedia:Quaternionic_projective_space|quaternionicprojective space]]. (This was first achieved in {{citeD|Hirzebruch1953}}). </wikitex> == References == {{#RefList:}} [[Category:Exercises]]F \to E \stackrel{\pi}{\to} B$ be a smooth fiber bundle so that all spaces $F, E$ and $B$ are manifolds.

Exercise 0.1. Show that $TE$, the tangent bundle of $E$, splits as the sum of two bundles

$$\displaystyle TE \cong \pi^*TB \oplus T_{\pi}E$$

where $T_{\pi}E$ consists of those tangent vectors tangent to the fibres of $\pi$.

Exercise 0.5.

Compute the total Pontragin class of $\Hh P^n$, quaternionicprojective space. (This was first achieved in [Hirzebruch1953]).

References