Let $\Bbb{F}_p$ be the finite field of integers modulo $p, p$ a prime, let $A$ be an abelian group. Precisely when can $A$ be made into a vector space over $\Bbb{F}_p$?
2026-04-08 17:27:53.1775669273
When can $A$ an abelian group be made into a vector space over $\Bbb{F}_p$?
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