Saturated measure

Measure in mathematics

In mathematics, a measure is said to be saturated if every locally measurable set is also measurable.^[1] A set $E$ , not necessarily measurable, is said to be a locally measurable set if for every measurable set $A$ of finite measure, $E\cap A$ is measurable. $\sigma$ -finite measures and measures arising as the restriction of outer measures are saturated.

References

^ Bogachev, Vladmir (2007). Measure Theory Volume 2. Springer. ISBN 978-3-540-34513-8.

Measure theory

Basic concepts

Absolute continuity of measures
Lebesgue integration
L^p spaces
Measure
Measure space
- Probability space
Measurable space/function

Sets

Almost everywhere
Atom
Baire set
Borel set
- equivalence relation
Borel space
Carathéodory's criterion
Cylindrical σ-algebra
- Cylinder set
𝜆-system
Essential range
- infimum/supremum
Locally measurable
π-system
σ-algebra
Non-measurable set
- Vitali set
Null set
Support
Transverse measure
Universally measurable

Types of Measures

Atomic
Baire
Banach
Besov
Borel
Brown
Complex
Complete
Content
(Logarithmically) Convex
Decomposable
Discrete
Equivalent
Finite
Inner
(Quasi-) Invariant
Locally finite
Maximising
Metric outer
Outer
Perfect
Pre-measure
(Sub-) Probability
Projection-valued
Radon
Random
Regular
- Borel regular
- Inner regular
- Outer regular
Saturated
Set function
σ-finite
s-finite
Signed
Singular
Spectral
Strictly positive
Tight
Vector

Particular measures

Maps

Measurable function
- Bochner
- Strongly
- Weakly
Convergence: almost everywhere
of measures
in measure
of random variables
- in distribution
- in probability
Cylinder set measure
Random: compact set
element
measure
process
variable
vector
Projection-valued measure

Main results

Carathéodory's extension theorem
Convergence theorems
Decomposition theorems
- Hahn
- Jordan
- Maharam's
Egorov's
Fatou's lemma
Fubini's
- Fubini–Tonelli
Hölder's inequality
Minkowski inequality
Radon–Nikodym
Riesz–Markov–Kakutani representation theorem

Other results

Disintegration theorem Lifting theory Lebesgue's density theorem Lebesgue differentiation theorem Sard's theorem Vitali–Hahn–Saks theorem
For Lebesgue measure	Isoperimetric inequality Brunn–Minkowski theorem Milman's reverse Minkowski–Steiner formula Prékopa–Leindler inequality Vitale's random Brunn–Minkowski inequality