Uniqueness of minimizer for a problem of the type $\min f(x), x \in \mathcal{C}$, $\mathcal{C}$ convex, is that $f$ is strictly convex.
I am curious what is the theorem that gives existence of such a minimizer.
2026-04-01 12:48:29.1775047709
In optimization, what guarantees the existence of a minimizer?
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