What is Unit step function: Definition and 55 Discussions
The Heaviside step function, or the unit step function, usually denoted by H or θ (but sometimes u, 1 or 𝟙), is a step function, named after Oliver Heaviside (1850–1925), the value of which is zero for negative arguments and one for positive arguments. It is an example of the general class of step functions, all of which can be represented as linear combinations of translations of this one.
The function was originally developed in operational calculus for the solution of differential equations, where it represents a signal that switches on at a specified time and stays switched on indefinitely. Oliver Heaviside, who developed the operational calculus as a tool in the analysis of telegraphic communications, represented the function as 1.
The Heaviside function may be defined as:
a piecewise function:
an indicator function:
the derivative of the ramp function: The Dirac delta function is the derivative of the Heaviside function
Hence the Heaviside function can be considered to be the integral of the Dirac delta function. This is sometimes written as
although this expansion may not hold (or even make sense) for x = 0, depending on which formalism one uses to give meaning to integrals involving δ. In this context, the Heaviside function is the cumulative distribution function of a random variable which is almost surely 0. (See constant random variable.)
In operational calculus, useful answers seldom depend on which value is used for H(0), since H is mostly used as a distribution. However, the choice may have some important consequences in functional analysis and game theory, where more general forms of continuity are considered. Some common choices can be seen below.
Approximations to the Heaviside step function are of use in biochemistry and neuroscience, where logistic approximations of step functions (such as the Hill and the Michaelis–Menten equations) may be used to approximate binary cellular switches in response to chemical signals.
View More On Wikipedia.org
The function was originally developed in operational calculus for the solution of differential equations, where it represents a signal that switches on at a specified time and stays switched on indefinitely. Oliver Heaviside, who developed the operational calculus as a tool in the analysis of telegraphic communications, represented the function as 1.
The Heaviside function may be defined as:
a piecewise function:
an indicator function:
the derivative of the ramp function: The Dirac delta function is the derivative of the Heaviside function
Hence the Heaviside function can be considered to be the integral of the Dirac delta function. This is sometimes written as
although this expansion may not hold (or even make sense) for x = 0, depending on which formalism one uses to give meaning to integrals involving δ. In this context, the Heaviside function is the cumulative distribution function of a random variable which is almost surely 0. (See constant random variable.)
In operational calculus, useful answers seldom depend on which value is used for H(0), since H is mostly used as a distribution. However, the choice may have some important consequences in functional analysis and game theory, where more general forms of continuity are considered. Some common choices can be seen below.
Approximations to the Heaviside step function are of use in biochemistry and neuroscience, where logistic approximations of step functions (such as the Hill and the Michaelis–Menten equations) may be used to approximate binary cellular switches in response to chemical signals.
View More On Wikipedia.org
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Calculating Fourier Transform of Unit Step Function
how can I calculate the Fourier transform for unit step function: v(t)=1 where 0=<t<+infinity v(t)=0 otherwise I applied the general definition relation for FT: v(w)=integral(v(t)*e^-jwt) ; - infinity<t<+infinity but i had v(w)=infinity due to the term infinity-displaced e^(+jwt)...- electronic engineer
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- Forum: General Math
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Learning Integration with unit step function like u(x - a)
hello maths experts is the following true? http://img9.imageshack.us/img9/4596/int15oe.jpg graphically, this is how i view it http://img9.imageshack.us/img9/179/int28ut.jpg -
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Need help with Impulse function and unit step function at singularity
I have some trouble wrapping my head around singularity One of assignment question is to show that the unit function is not defined at 0. To do that, I need to show \lim_{\Delta\to0}[u_{\Delta}(t)\delta(t)]=0 \lim_{\Delta\to0}[u_{\Delta}(t)\delta_{\Delta}(t)]=\frac{1}{2}\delta(t)...- phoenixy
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- Forum: Differential Equations
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Unit Step Function and Laplace Transforms
Hey I was wondering if someone would check my work on this problem: Note: {\cal L} = Laplace {\cal U} = Unit Step Function {\cal L} \{ \cos(2t) \,\,\, {\cal U} (t - \pi)\} =e^{-\pi s} {\cal L} \{ \cos(2(t + \pi)) \} =e^{-\pi s} {\cal L} \{ \cos(2t + 2\pi) \} =e^{-\pi s}...- Spectre5
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- Forum: Introductory Physics Homework Help
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Derivative of unit step function
[SOLVED] Derivative of unit step function How does one do this, for example x= e^(-3t)u(t-4); how do you get x' ??- Will
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- Forum: General Math