What is Delta function: Definition and 378 Discussions

In mathematics, the Dirac delta function (δ function) is a generalized function or distribution, a function on the space of test functions. It was introduced by physicist Paul Dirac. It is called a function, although it is not a function R → C.
It is used to model the density of an idealized point mass or point charge as a function equal to zero everywhere except for zero and whose integral over the entire real line is equal to one. No function has these properties, such that the computations made by theoretical physicists appeared to mathematicians as nonsense until the introduction of distributions by Laurent Schwartz to formalize and validate the computations. As a distribution, the Dirac delta function is a linear functional that maps every function to its value at zero. The Kronecker delta function, which is usually defined on a discrete domain and takes values 0 and 1, is a discrete analog of the Dirac delta function.
In engineering and signal processing, the delta function, also known as the unit impulse symbol, may be regarded through its Laplace transform, as coming from the boundary values of a complex analytic function of a complex variable. The convolution of a (theoretical) signal with a Dirac delta can be thought of as a stimulation that includes all frequencies. This leads to a resonance with the signal, making the theoretical signal "real" (i.e. causal). The formal rules obeyed by this function are part of the operational calculus, a standard tool kit of physics and engineering. In many applications, the Dirac delta is regarded as a kind of limit (a weak limit) of a sequence of functions having a tall spike at the origin (in theory of distributions, this is a true limit). The approximating functions of the sequence are thus "approximate" or "nascent" delta functions.

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  1. M

    Dirac Delta Function: Scaling and Shifting

    Just have a question about the dirac delta function. I understand how you would write it if you want to shift it but how would you scale it assuming we are using discrete time. Would you write 2*diracdelta[n] or diracdelta[2n]. Also, would that increase it or reduce it by 2 meaning that...
  2. Cincinnatus

    Exploring the Mystery of the Dirac Delta Function

    I've recently come across this function in one of my science classes and am wondering were this identity comes from: \displaystyle{\int{\delta(t-\tau)f(\tau)d\tau}=f(t)} Where \delta(t) is the dirac delta function and f(t) is any (continuous?) function.
  3. A

    Proving Dirac Delta Function Does Not Exist

    How can I prove that no continuous function exists that satisfies the property of the dirac delta function? I thought it should be pretty easy, but it's actually giving me quite a hard time! I know that the integral of such a function must be 1, and that it must also be even (symmetric about the...
  4. P

    Properties of the dirac delta function

    I'm trying to show that \int \delta \prime(x-x')f(x') dx = f\prime(x) can I differentiate delta with respect to x' instead (giving me a minus sign), and then integrate by parts and note that the delta function is zero at the boundaries? this will give me an integral involving f' and delta...
  5. C

    Want to learn more about Delta Function and Generalized Function

    I am reading a electrical engineering book about digital signal processing, in the process, those Fourier transform and discrete time Fourier transform of constant and the exponential function lead to the delta function. I understand how to manipulate them formally, but I have serious trouble...
  6. C

    Proving an identity of Dirac's delta function

    Hello, I need to prove (7) here: http://mathworld.wolfram.com/DeltaFunction.html http://mathworld.wolfram.com/images/equations/DeltaFunction/equation5.gif The instructions were to start with the definition of the delta function by integral, and then chagne variables u -> g(x). But I...
  7. R

    Exploring Delta Function in Quantum Mechanics and Quantum Field Theory

    As I read in my quantum mechanics book the delta function is sometimes called the sampling function because it samples the value of the function at one point. \int {\delta (x - x')} f(x')dx' = f(x) But then I opened a quantum field book and I found equations like that: \phi (x) =...
  8. P

    2 questions one wave one delta function

    1st question what the heck does a "minimum" mean when talking about interference in waves, i got a question of the like y = 1.19(1 + 2 cos p)sin(kx - wt + p) is the superpostion function of three waves one which is p out of phase of the first and another which is p out of phase of the second...
  9. E

    Perhaps delta function or inverse Laplace transform?

    Hello everyone, i have this question and not even sure how to approach it: \frac {di}{dt}+4i+3\int_{0^-}^t{i(z)dz = 12(t-1)u(t-1) and i(0^-) = 0 find i(t) last topics we covered were laplace transforms (and inverse) and dirac delta function. At least some hint to get me started...
  10. E

    Integrals and dirac delta function

    hello again, i have an integral to solve and not sure how to approach this: \int f(q+T)\delta (t-q)dq and the boundaries of integral are -inf +inf couldn't figure it out with latex. what I know about this is that if delta function is integrated like this, it would be just the value of...
  11. Reshma

    What is the curl of r^n\hat r?

    For a given function: r^n\hat r, find its curl. I formulated the divergence first. For the divergence: \nabla . (r^n\hat r) = (n+2)r^{n-1} and the functon becomes a dirac delta at the origin in case of n = -2. For the curl: Geometrically, the curl should be zero. Likewise, the curl in...
  12. C

    Understanding Transition btwn Steps of Dirac Delta Function

    Can someone help me understand the transition between these two steps? <x> = \iint \Phi^* (p',t) \delta (p - p') \left( - \frac{\hbar}{i} \frac{\partial}{\partial p} \Phi (p,t) \right) dp' dp = <x> = \int \Phi^* (p,t) \left( - \frac{\hbar}{i} \frac{\partial}{\partial p} \Phi (p,t)...
  13. D

    Help with Dirac Delta Function Problem

    i can't solve there problem, please help me 1) delta(y^2-a^2) = 1/absolute 2a[delta(y-a)+delta(y+a)] 2) f(y)delta(y-a) = f(a)delta(y-a)
  14. E

    Laplace transform with delta function

    I am sort of stuck on this one: compute Laplace trasnform of this signal (directly by evaluating the integral) f(t) = cos(pi*t + theta)*delta(t-2); I know what the LT integral looks like, but I don't think I'm evaluating it right. Would the answer be just: cos(pi*t + theta)*e^(-2s) ...
  15. E

    Dirac delta function (DE problem) solved

    NOTE: I actually found the correct answer while I was typing this :rolleyes: and since I already had it typed, I figured i would post anyway. mods you can do with it as you please or leave it for reference. thanks Here's the problem: A uniform beam of length L carries a concentrated...
  16. C

    Delta function & kronecker delta

    Can anyone tell me the difference between the Delta function and the Kronecker delta? It seems that both are 1 at a certain point and 0 otherwise... The delta function is a eigenfunction of x and the Kronecker delta is ... i'm kind of confused..
  17. A

    What is the simplest way to understand the Dirac Delta function?

    1. INTRODUCTION Many students become frustrated when they first meet the Dirac Delta function, typically in a course involving electrostatics, or Laplace transforms. As it is commonly presented, the Dirac function seems totally meaningless: Either, it is "defined" as...
  18. S

    Proving the Limit of a Parabola Delta Function

    Can someone help me prove the following: L=\mathop \lim\limits_{k\to \infty}\int_{-\frac{3}{4k}}^{\frac{3}{4k}} f(x)[-\frac{16k^3}{9}x^2+k]dx=f(0) I'm pretty sure at the limit, -\frac{16k^3}{9}x^2+k becomes a delta function. Essentially, it's that section of a narow parabola above...
  19. S

    Dirac Delta Function: Understanding Laplace & Inverse Laplace Properties

    I have a test in Diff Eq. tommorow and part of the test is inovling the Dirac Delta function. I have no clue as to what it is at all. More specifically its Laplace and Inverse Laplace. If anyone could explain to me what the delta function is and how to use in in diff eq and what are its...
  20. Reshma

    Explaining Dirac Delta Function: \vec A

    Can someone explain me the Dirac Delta function for the function: \vec A = \frac{\hat r}{r^2}
  21. U

    Help with Delta Function & Spherical Electrostatic Potential

    Hello, I'm having trouble with the following problem: The spherically symmetrical electrostatic potential of a particular object is given (in spherical coordinates) by: V(\vec{r})=V(r)=c\frac{exp{(\frac{-2r}{a})}}{4\pi\varepsilon r} (1+\frac{r}{a}) I found the electrostatic field in...
  22. K

    Laplace transform of dirac delta function

    let S be the Unit Step function for a function with a finite jump at t0 we have: (*) L{F'(t)}=s f(s)-F(0)-[F(t0+0)-F(t0-0)]*exp(-s t0)] so: L{S'(t-k)}=s exp(-s k)/s-0-[1-0]*exp(-s k) = 0 & k>0 but S'(t-k)=deltadirac(t-k) and we know that L{deltadirac(t-k)}=exp(-s k) so...
  23. A

    Can Bound States with Exact Energies Violate the Uncertainty Principle?

    So I read that the delta function potential well has one and only one bound state. This seems to give a precise momentum and position as the bound state has a definite energy and the particle must be in the well. This seems to be a violation of the HUP. Is the physical impossibility of...
  24. E

    Dirac Delta Function Properties

    Okay...so here's the thing. I have been researching the dirac Delta properties. The sights I've visited, thus far, are moderately helpful. I'm looking to tackle this question I'm about to propose, so for you Brains out there (the truly remarkable :rolleyes:) please don't post a solution...
  25. S

    Polchinski Excercise Question - delta function

    I am going again over Polchinski's excercises, trying to work them and using http://schwinger.harvard.edu/~headrick/polchinski.html when I get stuck. In problem 2.1, P. wants us to show that \partial \bar{\partial} ln \vert z \vert^2 = 2 \pi \delta^2(z,\bar{z}) and Headrick, introducing...
  26. MathematicalPhysicist

    The Dirac delta function question

    in the attatch file there is the dd function. what i want to know is: when x doesn't equal 0 the function equals 0 and the inegral is the integral of the number 0 which is any constant therefore i think the integral should be equal 0. can someone show me how this integral equals 1? for...
  27. T

    Understanding & Using the Delta Function in Physics

    I'm not sure what field this fits with, so I'll post here. I was introduced to the delta function in physics class. I understand what it means, but how do you use it?
  28. pellman

    Dirac delta function on the complex plane?

    Supposedly, &int; ez*(z - z0)f(z) dz*dz is proportional to f(z0) much in the same way that (1/2&pi;)&int; eiy(x - x0)f(x) dxdy = &int; &delta;(x - x0)f(x) dx = f(x0) Is this true? Could someone help convince me of it, or point me to a text? I would say that even if true, it...
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