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Noboru Endou (2016)
Formalized Mathematics
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In this article we formalize in Mizar [5] product pre-measure on product sets of measurable sets. Although there are some approaches to construct product measure [22], [6], [9], [21], [25], we start it from σ-measure because existence of σ-measure on any semialgebras has been proved in [15]. In this approach, we use some theorems for integrals.
Robert Morris Pierce
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Robert E. Zink (1966)
Colloquium Mathematicae
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Noboru Endou (2015)
Formalized Mathematics
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In our previous article [22], we showed complete additivity as a condition for extension of a measure. However, this condition premised the existence of a σ-field and the measure on it. In general, the existence of the measure on σ-field is not obvious. On the other hand, the proof of existence of a measure on a semialgebra is easier than in the case of a σ-field. Therefore, in this article we define a measure (pre-measure) on a semialgebra and extend it to a measure on a σ-field. Furthermore,...
James Fickett, Jan Mycielski (1979)
Colloquium Mathematicae
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T. Świątkowski (1967)
Colloquium Mathematicae
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S. N. Mukhopadhyay (1967)
Colloquium Mathematicae
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Karol Borsuk (1983)
Annales Polonici Mathematici
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L. Moser, M. G. Murdeshwar (1966)
Colloquium Mathematicae
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Dedić, Ljuban (1990)
Publications de l'Institut Mathématique. Nouvelle Série
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K. Krzyżewski (1968)
Colloquium Mathematicae
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Ihor Stasyuk, Edward D. Tymchatyn (2013)
Colloquium Mathematicae
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Spaces of finite n-dimensional Hausdorff measure are an important generalization of n-dimensional polyhedra. Continua of finite linear measure (also called continua of finite length) were first characterized by Eilenberg in 1938. It is well-known that the property of having finite linear measure is not preserved under finite unions of closed sets. Mauldin proved that if X is a compact metric space which is the union of finitely many closed sets each of which admits a σ-finite linear...
J. Musielak, W. Orlicz (1959)
Studia Mathematica
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Malgorzata Guerquin (1973)
Colloquium Mathematicae
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D. Caponetti, G. Trombetta (2004)
Bulletin of the Polish Academy of Sciences. Mathematics
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Let X be an infinite-dimensional Banach space. The measure of solvability ν(I) of the identity operator I is equal to 1.