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Gutman A.E.
Transition functions (2 publications, 2003–2004)
Study of the spaces of transition functions and their relations to other objects of functional analysis
BibTeX: Download BIB file
@article { Gutman20031114,
author = "Gutman A.E. and Sotnikov A.I.",
title = "On order complete sigma-algebras",
journal = "Sci. Proc. TyvSU. Kyzyl: TyvSU",
year = "2003",
volume = "1",
pages = "83--86",
language = "russian",
annote = "A criterion is obtained for existence of a $\sigma$-algebra $\Sigma$ of subsets of a given set $X$ such that $\Sigma$ is order complete and atomic, but is not discrete, i.e., $\Sigma$ does not coincide with the totality of the unions of various subsets of some partition of $X$."
}
@article { Gutman20031015,
author = "Gutman A.E. and Sotnikov A.I.",
title = "Order properties of the space of finitely additive transition functions",
journal = "Sib. Matem. Zh.",
year = "2004",
volume = "45",
number = "1",
pages = "80--102",
language = "russian",
annote = "The basic order properties, as well as some metric and algebraic properties, are studied of the set of finitely additive transition functions on an arbitrary measurable space, as endowed with the structure of an ordered normed algebra, and some connections are revealed with the classical spaces of linear operators, vector measures, and measurable vector-valued functions. In particular, the question is examined of splitting the space of transition functions into the sum of the subspaces of countably additive and purely finitely additive transition functions.",
keywords = "transition function, purely finitely additive measure, lifting of a measure space, vector measure, measurable vector-valued function, ordered vector space, vector lattice, Riesz space, K-space, Banach lattice, ordered Banach algebra"
}
@article { Gutman20031016,
author = "Gutman A.E. and Sotnikov A.I.",
title = "Order properties of the space of finitely additive transition functions",
journal = "Sib. Math. J.",
year = "2004",
volume = "45",
number = "1",
pages = "69--85",
doi = "10.1023/B:SIMJ.0000013013.03647.65",
annote = "The basic order properties, as well as some metric and algebraic properties, are studied of the set of finitely additive transition functions on an arbitrary measurable space, as endowed with the structure of an ordered normed algebra, and some connections are revealed with the classical spaces of linear operators, vector measures, and measurable vector-valued functions. In particular, the question is examined of splitting the space of transition functions into the sum of the subspaces of countably additive and purely finitely additive transition functions.",
keywords = "transition function, purely finitely additive measure, lifting of a measure space, vector measure, measurable vector-valued function, ordered vector space, vector lattice, Riesz space, K-space, Banach lattice, ordered Banach algebra"
}