Step function

In mathematics, a function on the real numbers is called a step function if it can be written as a finite linear combination of indicator functions of intervals. Informally speaking, a step function is a piecewise constant function having only finitely many pieces.

Definition and first consequences

A function ${\displaystyle f:\mathbb{ℝ}\to \mathbb{ℝ}}$ is called a step function if it can be written as ^{[citation needed]}

${\displaystyle f(x)=\sum _{i=0}^n{\alpha }_i{\chi }_{A_i}(x)}$, for all real numbers ${\displaystyle x}$

where ${\displaystyle n\ge 0}$, ${\displaystyle {\alpha }_i}$ are real numbers, ${\displaystyle A_i}$ are intervals, and ${\displaystyle {\chi }_A}$ is the indicator function of ${\displaystyle A}$:

${\displaystyle {\chi }_A(x)=\{\begin{array}{ll}1& \text{if }x\in A\\ 0& \text{if }x\notin A\\ \end{array}}$

In this definition, the intervals ${\displaystyle A_i}$ can be assumed to have the following two properties:

1. The intervals are pairwise disjoint: ${\displaystyle A_i\cap A_j=\mathrm{\varnothing }}$ for ${\displaystyle i\ne j}$
2. The union of the intervals is the entire real line: ${\displaystyle {\displaystyle \bigcup _{i=0}^n}{A}_i=\mathbb{ℝ}.}$

Indeed, if that is not the case to start with, a different set of intervals can be picked for which these assumptions hold. For example, the step function

${\displaystyle f=4{\chi }_{[-5,1)}+3{\chi }_{(0,6)}}$

can be written as

${\displaystyle f=0{\chi }_{(-\mathrm{\infty },-5)}+4{\chi }_{[-5,0]}+7{\chi }_{(0,1)}+3{\chi }_{[1,6)}+0{\chi }_{[6,\mathrm{\infty })}.}$

Variations in the definition

Sometimes, the intervals are required to be right-open^[1] or allowed to be singleton.^[2] The condition that the collection of intervals must be finite is often dropped, especially in school mathematics,^[3][4][5] though it must still be locally finite, resulting in the definition of piecewise constant functions.

Examples

• A constant function is a trivial example of a step function. Then there is only one interval, ${\displaystyle A_0=\mathbb{ℝ}.}$
• The sign function sgn(x), which is −1 for negative numbers and +1 for positive numbers, and is the simplest non-constant step function.
• The Heaviside function H(x), which is 0 for negative numbers and 1 for positive numbers, is equivalent to the sign function, up to a shift and scale of range (${\displaystyle H=(\mathrm{sgn}+1)/2}$). It is the mathematical concept behind some test signals, such as those used to determine the step response of a dynamical system.

• The rectangular function, the normalized boxcar function, is used to model a unit pulse.

Non-examples

• The integer part function is not a step function according to the definition of this article, since it has an infinite number of intervals. However, some authors^[6] also define step functions with an infinite number of intervals.^[6]

Properties

• The sum and product of two step functions is again a step function. The product of a step function with a number is also a step function. As such, the step functions form an algebra over the real numbers.
• A step function takes only a finite number of values. If the intervals ${\displaystyle A_i,}$ for ${\displaystyle i=0,1,\dots ,n}$ in the above definition of the step function are disjoint and their union is the real line, then ${\displaystyle f(x)={\alpha }_i}$ for all ${\displaystyle x\in A_i.}$
• The definite integral of a step function is a piecewise linear function.
• The Lebesgue integral of a step function ${\displaystyle f={\sum }_{i=0}^n{\alpha }_i{\chi }_{A_i}}$ is ${\displaystyle \int fdx={\sum }_{i=0}^n{\alpha }_i\ell (A_i),}$ where ${\displaystyle \ell (A)}$ is the length of the interval ${\displaystyle A}$, and it is assumed here that all intervals ${\displaystyle A_i}$ have finite length. In fact, this equality (viewed as a definition) can be the first step in constructing the Lebesgue integral.^[7]
• A discrete random variable is sometimes defined as a random variable whose cumulative distribution function is piecewise constant.^[8] In this case, it is locally a step function (globally, it may have an infinite number of steps). Usually however, any random variable with only countably many possible values is called a discrete random variable, in this case their cumulative distribution function is not necessarily locally a step function, as infinitely many intervals can accumulate in a finite region.

See also

• Crenel function
• Piecewise
• Sigmoid function
• Simple function
• Step detection
• Heaviside step function
• Piecewise-constant valuation

References