Appendix/Mathematics/StepFunction: Difference between revisions
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=Unit Step Function and Its Derivative= | =Unit Step Function and Its Derivative= | ||
==Standard Presentation== | |||
The unit — or, [https://en.wikipedia.org/wiki/Heaviside_step_function Heaviside] — step function, <math>H(x)</math>, is defined such that, | The unit — or, [https://en.wikipedia.org/wiki/Heaviside_step_function Heaviside] — step function, <math>H(x)</math>, is defined such that, | ||
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<math>\int_{-\infty}^x \delta(\xi)d\xi \, .</math> | <math>\int_{-\infty}^x \delta(\xi)d\xi \, .</math> | ||
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==Sign of a Function== | |||
Notice that the sign of <math>x</math>, may be written in terms of the step function as, | |||
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<math>\sgn[x] = \frac{|x|}{x}</math> | |||
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<math>=</math> | |||
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<math>2H(x) - 1 \, .</math> | |||
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Hence, | |||
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<math>\frac{d}{dx} \biggl[ \sgn(x)\biggr] = \frac{d}{dx}\biggl[ \frac{|x|}{x} \biggr]</math> | |||
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<math>=</math> | |||
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<math>2\delta(x) \, .</math> | |||
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<td align="center" colspan="3">{{ Hunter2003 }}, §2.2, immediately following Eq. (3)</td> | |||
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Latest revision as of 21:12, 11 August 2023
Unit Step Function and Its Derivative
Standard Presentation
The unit — or, Heaviside — step function, , is defined such that,
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In evaluating this function at , we will adopt the half-maximum convention and set . As has been pointed out in, for example, a relevant Wikipedia discussion, the derivative of the unit step function is,
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where, is the Dirac Delta function. Hence, the unit step function is sometimes written as,
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Sign of a Function
Notice that the sign of , may be written in terms of the step function as,
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Hence,
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| 📚 Hunter (2003), §2.2, immediately following Eq. (3) | ||
See Also
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Appendices: | VisTrailsEquations | VisTrailsVariables | References | Ramblings | VisTrailsImages | myphys.lsu | ADS | |