Question: [12] Prove that for every x, there is an additively optimal function 0 (as in Theorem 2.1.1) such that C0 (x) = 0. Prove the

[12] Prove that for every x, there is an additively optimal function φ0 (as in Theorem 2.1.1) such that Cφ0 (x) = 0. Prove the analogous statement for x under condition y.

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