Schauder fixed-point theorem: Let ''C'' be a nonempty closed convex subset of a Banach space ''V'', if ''f'' : ''C'' → ''C'' is continuous with a compact image, then ''f'' has a fixed point.

Tikhonov (Tychonoff) fixed point theorem: Let ''V'' be a locally convex topological vector space, for any non-empty compact convex set ''X'' in ''V'', any continuous function ''f'' : ''X'' → ''X'' has a fixed point.

Kakutani's fixed-point theorem: Every correspondence that maps a compact convex subset of a locally convex space into itself with a closed graph and convex nonempty images has a fixed point.