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In the mathematical field of real analysis, a simple function is a real-valued function over a subset of the real line, similar to a step function. Simple functions are sufficiently 'nice' that using them makes mathematical reasoning, theory, and proof easier. For example simple functions attain only a finite number of values. Some authors also require simple functions to be measurable; as used in practice, they invariably are.

A basic example of a simple function is the floor function over the half-open interval [1,9), whose only values are {1,2,3,4,5,6,7,8}. A more advanced example is the Dirichlet function over the real line, which takes the value 1 if x is rational and 0 otherwise. (Thus the "simple" of "simple function" has a technical meaning somewhat at odds with common language.) Note also that all step functions are simple.

Simple functions are used as a first stage in the development of theories of integration, such as the Lebesgue integral, because it is very easy to create a definition of an integral for a simple function, and also, it is straightforward to approximate more general functions by sequences of simple functions.

Definition

Formally, a simple function is a finite linear combination of indicator functions of measurable sets. More precisely, let (X, Σ) be a measurable space. Let A₁, ..., A_n ∈ Σ be a sequence of measurable sets, and let a₁, ..., a_n be a sequence of real or complex numbers. A simple function is a function ${\displaystyle f:X\to \mathbb{ℂ}}$ of the form

${\displaystyle f(x)={\displaystyle \sum _{k=1}^n}{a}_k{\mathbf{1}}_{A_k}(x),}$

where ${\displaystyle {\mathbf{1}}_A}$ is the indicator function of the set A.

Properties of simple functions

The sum, difference, and product of two simple functions are again simple functions, and multiplication by constant keeps a simple function simple; hence it follows that the collection of all simple functions on a given measurable space forms a commutative algebra over ${\displaystyle \mathbb{ℂ}}$.

Integration of simple functions

If a measure μ is defined on the space (X,Σ), the integral of f with respect to μ is

${\displaystyle {\displaystyle \sum _{k=1}^n}{a}_k\mu (A_k),}$

if all summands are finite.

Relation to Lebesgue integration

Any non-negative measurable function ${\displaystyle f:X\to {\mathbb{ℝ}}^{+}}$ is the pointwise limit of a monotonic increasing sequence of non-negative simple functions. Indeed, let ${\displaystyle f}$ be a non-negative measurable function defined over the measure space ${\displaystyle (X,\mathrm{\Sigma },\mu )}$ as before. For each ${\displaystyle n\in \mathbb{\mathbb{N}}}$, subdivide the range of ${\displaystyle f}$ into ${\displaystyle 2^{2n}+1}$ intervals, ${\displaystyle 2^{2n}}$ of which have length ${\displaystyle 2^{-n}}$. For each ${\displaystyle n}$, set

${\displaystyle I_{n,k}=[\frac{k-1}{2^n},\frac{k}{2^n})}$ for ${\displaystyle k=1,2,\dots ,2^{2n}}$, and ${\displaystyle I_{n,2^{2n}+1}=[2^n,\mathrm{\infty })}$.

(Note that, for fixed ${\displaystyle n}$, the sets ${\displaystyle I_{n,k}}$ are disjoint and cover the non-negative real line.)

Now define the measurable sets

${\displaystyle A_{n,k}=f^{-1}(I_{n,k})}$ for ${\displaystyle k=1,2,\dots ,2^{2n}+1}$.

Then the increasing sequence of simple functions

${\displaystyle f_n={\displaystyle \sum _{k=1}^{2^{2n}+1}}\frac{k-1}{2^n}{\mathbf{1}}_{A_{n,k}}}$

converges pointwise to ${\displaystyle f}$ as ${\displaystyle n\to \mathrm{\infty }}$. Note that, when ${\displaystyle f}$ is bounded, the convergence is uniform. This approximation of ${\displaystyle f}$ by simple functions (which are easily integrable) allows us to define an integral ${\displaystyle f}$ itself; see the article on Lebesgue integration for more details.

References

• Template:Aut. Introduction to Measure and Probability, 1966, Cambridge.
• Template:Aut. Real and Functional Analysis, 1993, Springer-Verlag.
• Template:Aut. Real and Complex Analysis, 1987, McGraw-Hill.
• Template:Aut. Real Analysis, 1968, Collier Macmillan.