Axioms of uncertainty measures: dependence and independence

The present paper is a generalization and further development of the theory of Kernel measures of reducibility axioms formulated in [1], [2], [3] in the years 1969-1973. In this paper legieal connections of Kernel measures with some set-theoretical notions are studied and some suggestions related to

The sparsity and complexity of information in many technological situations has led to the development of new methods for quantifying uncertain evidence, and new schemes of inference from uncertain data. This paper deals with set-models of information-gap uncertainty which employ geometrical rather

## Abstract We show that the both assertions “in every vector space __B__ over a finite element field every subspace __V__ ⊆ __B__ has a complementary subspace __S__” and “for every family 𝒜 of disjoint odd sized sets there exists a subfamily ℱ={F~j~:j ϵω} with a choice function” together imply the