Additive Properties Of Measurable Set for Difference Two Measurable Set

Authors

  • Sukoriyanto Sisworo University of Malang

Keywords:

Aditif, Meaurable, difference two measurable set

Abstract

This paper will carry out the problem from [7] to be related difference of two measurable set. The problem is to prove the theorem if A and B are  measurable sets such that and then  m( A – B) = m(A) – m(B). theorem proving is done through the study of properties measurable set.

 


References

C. Traina, On Finitely Subadditive Outher Measures And Modularity Properties, Int. J. Math and Math. Sci. 8 (2003), 461 – 474.

F. Burk, Lebesgue Measurable and Integration, John Wiley and Sons, New York, 1998.

J. Poonly, Outer Measures, Measurability, and Lattice Regular Measures, Int. J. Math. and Math. Sci. 19 (1996), 343 – 350.

R.G. Bartle and D.R. Sherbert, Introduction to Real Analysis, John Wiley and Sons, New York, 2000.

R. Golberg, Method of Real Analysis, John Wiley and Sons, New York, 1998.

S. Hartman and J. Minkusinski, The Theory of Lebesgue Measure and Integration, Pergamon Press, New York, 1962.

P.K. Jain and V.P. Gupta, Lebesgue Measure and Integration, Wiley Eastern Limited, New York, 1986.

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Published

2015-06-15

How to Cite

Sisworo, S. (2015). Additive Properties Of Measurable Set for Difference Two Measurable Set. Asian Journal of Applied Sciences, 3(3). Retrieved from https://ajouronline.com/index.php/AJAS/article/view/2718

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Section

Articles