Lebesgue Measurable Set

A set is called Lebesgue measurable if it satisfies one of the following equivalent definitions:

1. Carathéodory’s criterion:

2. Approximability by Open Sets:

A set is Lebesgue measurable if for every , there exists an open set such that:

This means that can be approximated from above by open sets.

3. Approximability by Sets:

A set is Lebesgue measurable if there exists an set (a countable union of closed sets) such that:

This implies that can be approximated from above by sets.

4. Null Set Modulo Outer Measure:

A set is Lebesgue measurable if there exists a set (a countable intersection of open sets) such that:

where denotes the symmetric difference between and . This indicates that differs from a set by a null set.

5. Intersection with Every Set:

A set is Lebesgue measurable if for every , there exists a measurable set such that:

This suggests that can be approximated by a Measurable Set up to an arbitrarily small error in measure.

6. Borel Set Approximation:

A set is Lebesgue measurable if there exists a Borel sets and such that:

And

This implies that can be approximated from below and from above by a Borel set, differing only by a null set.