The equivalence of discrete convexity and the classical definition of convexity
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Date
2006
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Abstract
This article presents a proof of the fact that the classical definition of convexity of nondecreasing (increasing) first forward differences for discrete univariate functions is actually a special case of the concept of discrete convexity for functions defined on a discrete space. Consequently proving the discrete convexity of separable functions is simplified and becomes simply showing each univariate function is convex in the classical sense. An illustrative example is provided.
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Discrete Convexity, First Forward Difference, Seperable Function
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Yüceer, Ümit (2006). "The equivalence of discrete convexity and the classical definition of convexity", International Mathematical Forum, No.7, pp.299-308.
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International Mathematical Forum
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7
Start Page
299
End Page
308
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