Convex Sets and Convex Combinations on Complex Linear Spaces

Abstract

Let V be a non empty zero structure. An element of Cthe carrier of V is said to be a C-linear combination of V if: (Def. 1) There exists a finite subset T of V such that for every element v of V such that v / ∈ T holds it(v) = 0. Let V be a non empty additive loop structure and let L be an element of Cthe carrier of V . The support of L yielding a subset of… (More)
DOI: 10.2478/v10037-008-0018-y

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