On the regularity of the fuzzy measure on metric fuzzy measure spaces
Fuzzy Sets and Systems
Fuzzy regular measures on topological spaces
Fuzzy Sets and Systems
Fuzzy Measure Theory
Regularity and Lusin's theorem for Riesz space-valued fuzzy measures
Fuzzy Sets and Systems
Regularity properties of null-additive fuzzy measure on metric spaces
MDAI'05 Proceedings of the Second international conference on Modeling Decisions for Artificial Intelligence
Continuity and compactness of the indirect product of two non-additive measures
Fuzzy Sets and Systems
The continuity and compactness of Riesz space-valued indirect product measures
Fuzzy Sets and Systems
Metrizability of the Lévy topology on the space of nonadditive measures on metric spaces
Fuzzy Sets and Systems
Set-valued Lusin type theorem for null--null-additive set multifunctions
Fuzzy Sets and Systems
Atoms of weakly null-additive monotone measures and integrals
Information Sciences: an International Journal
Hi-index | 0.21 |
The Alexandroff theorem for a compact non-additive measure with values in a Riesz space is still valid for the following two cases: one is the case that the measure is autocontinuous and the Riesz space has the weak asymptotic Egoroff property and the other is the case that the measure is uniformly autocontinuous and the Riesz space is weakly σ-distributive. A close connection between regularity and continuity of non-additive measures is also given.