On the Dimension of the Space of Weakly Additive Functionals

Abstract

Important demanded properties of weakly additive order-preserving normalized functionals are established. Various interpretations of a weakly additive order-preserving normalized functional are given. The continuity of such a functional as a function depending on a set in a given compact space is proved. Based on these results, an example is constructed showing that the space $$O(X)$$ of weakly additive order-preserving normalized functionals is not embedded in any space of finite (or even countable) algebraic dimension, provided that the compact space $$X$$ contains more than one point.

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DOI

10.1134/s0001434623030045

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