Revision as of 16:52, 7 June 2022

Unit Step Function and Its Derivative

The unit — or, Heaviside — step function, $H (x)$ , is defined such that,

$H (x) = {\begin{cases} 0; & x < 0 \\ 1; & x > 0 \end{cases}$

[MF53], Part I, §2.1 (p. 123), Eq. (2.1.6)

In evaluating this function at $x = 0$ , we will adopt the half-maximum convention and set $H (0) = \frac{1}{2}$ . As has been pointed out in, for example, a relevant Wikipedia discussion, the derivative of the unit step function is,

$\frac{d H (x)}{d x}$

$=$

$δ (x),$

where, $δ (x)$ is the Dirac Delta function. Hence, the unit step function is sometimes written as,

$H (x)$

$=$

$\int_{- \infty}^{x} δ (ξ) d ξ .$

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+[<b>[[Appendix/References#MF53|<font color="red">MF53</font>]]</b>], Part I, &sect;2.1 (p. 123), Eq. (2.1.6)
+  </td>
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+[[File:Heaviside01.png|300px|Heaviside Function]]
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-[<b>[[Appendix/References#MF53|<font color="red">MF53</font>]]</b>], Part I, &sect;2.1 (p. 123), Eq. (2.1.6)
-  </td>
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 In evaluating this function at <math>x=0</math>, we will adopt the ''half-maximum convention'' and set <math>H(0) = \tfrac{1}{2}</math>.  As has been pointed out in, for example, [https://en.wikipedia.org/wiki/Heaviside_step_function a relevant Wikipedia discussion], the derivative of the unit step function is,

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Unit Step Function and Its Derivative

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Unit Step Function and Its Derivative

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