3. Convexity in vector spaces

3.1 Convex subsets

Definition (convex subset). Let (E, +, ×) be a real vector space. A non-empty subsetX of E is convex if it contains all closed line segments joining each pair of points belonging to it, or in other words (p. 4 of , p. 1 and p. 215 of

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Bibliography

(1) - ANDERSON (R.D.), KLEE (V.) - Convex functions and upper-semicontinuous collections, - Duke Mathematical Journal, Vol. 19, pp. 349-357 (1952).
(2) - ASPLUND (E.) - Čebyšev sets in Hilbert space, - Transactions of the American Mathematical...

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