v2007.09.13 - Convex Optimization

Appendix CSome analytical optimal resultsinfC.1 properties of infima∅ = ∆ ∞ (1452)sup ∅ = ∆ −∞ (1453)Given f(x) : X →R defined on arbitrary set X [147,0.1.2]inf f(x) = − sup −f(x)x∈X x∈Xsupx∈Xf(x) = −infx∈X −f(x) (1454)arg inf f(x) = arg sup −f(x)x∈X x∈Xarg supx∈Xf(x) = arg infx∈X −f(x) (1455)Given f(x) : X →R and g(x) : X →R defined on arbitrary set X[147,0.1.2]inf (f(x) + g(x)) ≥ inf f(x) + inf g(x) (1456)x∈X x∈X x∈X2001 Jon Dattorro. CO&EDG version 2007.09.13. All rights reserved.Citation: Jon Dattorro, Convex Optimization & Euclidean Distance Geometry,Meboo Publishing USA, 2005.535