I've wondered for a while now if for vector bundles $A\to E$, $B\to E$, is $\Gamma(A\oplus B)\cong \Gamma(A)\oplus\Gamma(B)$? I found a related question here, on this question for tensor products, but I cannot find an answer for the direct sum version.
2026-04-03 06:21:56.1775197316
For vector bundles $A\to E$, $B\to E$, is $\Gamma(A\oplus B)\cong \Gamma(A)\oplus\Gamma(B)$?
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