interadditive Definition
(of a function) satisfying the property that the sum of the function evaluated at two vectors is less than or equal to the function evaluated at the sum of the vectors.
Using interadditive: Examples
Take a moment to familiarize yourself with how "interadditive" can be used in various situations through the following examples!
Example
The function is interadditive if it satisfies the inequality f(x+y) ≤ f(x) + f(y).
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Summary: interadditive in Brief
The term 'interadditive' [ˌɪntərˈædɪtɪv] describes a function that satisfies the property that the sum of the function evaluated at two vectors is less than or equal to the function evaluated at the sum of the vectors. An example of its usage is 'The function is interadditive if it satisfies the inequality f(x+y) ≤ f(x) + f(y).'
