Cantor Function
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Cantor ternary Function
if is the Cantor set on [0,1], then the Cantor function c : [0,1] → [0,1] can be defined as[1]
Properties of Cantor Functions
- Cantor Function is continuous everywhere, zero derivative almost everywhere.
- lack of absolute continuity.
- Monotonicity
- Its value goes from 0 to 1 as its argument reaches from 0 to 1.
Cantor Function Alternative
The Cantor Function can be constructed iteratively using homework construction.[2]
Measurable function with pre-image of Lebesgue measurable set not Lebesgue measurable
Define
Then it can be shown is the pointwise limit of simple functions. However f takes values in the cantor set on the set of non terminating decimals. We can find a non measurable set such that is a null set and thus lebesgue measurable. Therefore fails to be Lebesgue measurable despite E being measurable.
This is analogous to the construction in HW5 2d) to 2 g) and is useful for motivating the definition of the Lebesgue measurable functions to be measurable
References
1. Terence Tao, An introduction to measure theory