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Measurability of functions of two variables

Published online by Cambridge University Press:  09 April 2009

J. H. Michael
Affiliation:
University of Adelaide
B. C. Rennie
Affiliation:
University of Adelaide
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Summary

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This paper investigates the existence and equality of the double and repeated integrals of a real function on a plane set. The main result (Theorem 2) is that if a function on a plane Lebesgue measurable set is continuous in one variable and measurable in the other then it is measurable in the plane.

Type
Research Article
Copyright
Copyright © Australian Mathematical Society 1959

References

[1]Lichtenstein, L., Prace matematyczno-fizyczne, T. XXI, 11.Google Scholar
[2]Sierpinski, W., ‘Sur un probleme concernant les ensembles mesurables superficiellement’, Fund. Math., I (1920), 112115.Google Scholar
[3]Sierpinski, W., ‘Sur les rapports entre l'existence des integrales: Fund. Math. I (1920), 142147.Google Scholar