Absolutely Continuous Measures

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Definitions

Let be a measure space. The measure is said to be absolutely continuous with respect to the measure if we have that for such that (see [1]). In this case, we denote that is absolutely continuous with respect to by writing .

Examples

Recall that if is a measurable function, then the set function for is a measure on . Observe that if , then so that .

Properties

It was previously established on a homework problem that for some nonnegative measurable defined on the measure space and some arbitrarily chosen , there exists such that whenever (see [2]).

References

[1]: Taylor, M. "Measure Theory and Integration". 50-51. [2]: Craig, K. "Math 201a: Homework 8". Refer to question 2.