# Pushforward measure

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In measure theory, a **pushforward measure** (also **push forward**, **push-forward** or **image measure**) is obtained by transferring ("pushing forward") a measure from one measurable space to another using a measurable function.

## Contents

## Definition

Given measurable spaces (*X*_{1}, Σ_{1}) and (*X*_{2}, Σ_{2}), a measurable mapping *f* : *X*_{1} → *X*_{2} and a measure *μ* : Σ_{1} → [0, +∞], the **pushforward** of *μ* is defined to be the measure *f*_{∗}(*μ*) : Σ_{2} → [0, +∞] given by

This definition applies *mutatis mutandis* for a signed or complex measure.

## Main property: Change of variables formula

Theorem:^{[1]} A measurable function *g* on *X*_{2} is integrable with respect to the pushforward measure *f*_{∗}(*μ*) if and only if the composition is integrable with respect to the measure *μ*. In that case, the integrals coincide, i.e.,

## Examples and applications

- A natural "Lebesgue measure" on the unit circle
**S**^{1}(here thought of as a subset of the complex plane**C**) may be defined using a push-forward construction and Lebesgue measure*λ*on the real line**R**. Let*λ*also denote the restriction of Lebesgue measure to the interval [0, 2*π*) and let*f*: [0, 2*π*) →**S**^{1}be the natural bijection defined by*f*(*t*) = exp(*i**t*). The natural "Lebesgue measure" on**S**^{1}is then the push-forward measure*f*_{∗}(*λ*). The measure*f*_{∗}(*λ*) might also be called "arc length measure" or "angle measure", since the*f*_{∗}(*λ*)-measure of an arc in**S**^{1}is precisely its arc length (or, equivalently, the angle that it subtends at the centre of the circle.)

- The previous example extends nicely to give a natural "Lebesgue measure" on the
*n*-dimensional torus**T**^{n}. The previous example is a special case, since**S**^{1}=**T**^{1}. This Lebesgue measure on**T**^{n}is, up to normalization, the Haar measure for the compact, connected Lie group**T**^{n}.

- Gaussian measures on infinite-dimensional vector spaces are defined using the push-forward and the standard Gaussian measure on the real line: a Borel measure
*γ*on a separable Banach space*X*is called**Gaussian**if the push-forward of*γ*by any non-zero linear functional in the continuous dual space to*X*is a Gaussian measure on**R**.

- Consider a measurable function
*f*:*X*→*X*and the composition of*f*with itself*n*times:

- This iterated function forms a dynamical system. It is often of interest in the study of such systems to find a measure
*μ*on*X*that the map*f*leaves unchanged, a so-called invariant measure, one for which*f*_{∗}(*μ*) =*μ*.

- One can also consider quasi-invariant measures for such a dynamical system: a measure
*μ*on*X*is called**quasi-invariant**under*f*if the push-forward of*μ*by*f*is merely equivalent to the original measure*μ*, not necessarily equal to it.

## A generalization

In general, any measurable function can be pushed forward, the push-forward then becomes a linear operator, known as the transfer operator or Frobenius–Perron operator. This operator typically satisfies the requirements of the Frobenius–Perron theorem, and the maximal eigenvalue of this theorem corresponds to the invariant measure. The adjoint to the push-forward is the pullback; as an operator on measurable spaces, it is the composition operator or Koopman operator.

## References

- ↑ V.I. Bogachev.
*Measure Theory*. Springer, 2007. Sections 3.6-3.7.