# Tagged Questions

A Green's function is the impulse response of an inhomogeneous differential equation defined on a domain, with specified initial conditions or boundary conditions, thereby restricting that equation's *fundamental solution*. In QFT, it is essentially the *propagator*.

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### What is the recursive relation for three-particle Green's functions?

In condensed matter physics, one often choose to study the many-body Green's functions (GF) with the diagram (perturbation) expansion technique. In what follows only two-body interaction is concerned. ...
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### Feynmann Propagtor and the Green's Function for a Free Field

I'm going through Mark Srednicki's Quantum Field Theory. Chapter 8 on The Path Integral for the Free Field Theory includes the following: In the presence of a classical source, $J$, the ground state-...
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### Which inverse of $-(\partial^2 + m^2)$ should be used in the path integral?

The partition functional for free scalar field is $$Z=\int D\varphi e^{i\int d^4x[-\frac{1}{2}\varphi (\partial^2+m^2)\varphi+J\varphi]}.\tag{1}$$ To evaluate this functional integral, we usually ...
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### Propagator from Path integral

In class we have proved something like: $$\frac{\partial^2 Z(J,\bar{J})}{\partial J(x) \partial \bar{J}(x')}\frac{1}{Z}|_{J=\bar{J}=0}=\Delta(x-x').$$ That by introducing source terms to path ...
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### Simple, physical explanations for Hadamard behaviour of two-point functions

The two-point function of local quantum fields on a curved spacetime exhibits a singularity of a very particular form, known as Hadamard form, for null separated points $(x,y)$ (including the ...
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### Can anyone suggest any good texts on Green's functions in quantum mechanics?

I am currently learning about Green's functions and want to write an essay on their use in quantum mechanics as part of an assessment. I have seen that they can be used in describing the probability ...
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### Nonequilibrium Green's functions weakly interacting two-component Bose gas

I am planing to describe time evolution of two-component BEC. I was thinking about non-equilibrium Green's functions, but I don't if the method can be applied to the problem describe below. I know ...
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### Non-equivalence between $\omega \to \omega \pm i\varepsilon$ and Cauchy principle value

I am looking to gain a more rigorous and deeper understanding as to how an $i\varepsilon$ prescription actually changes the end result of a divergent integral, specifically in regards to Green's ...
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### theoretical echo from a point scatterer

How can I compute an echo coming back from a point scatterer? Let's say I know the excitation signal (plane wave), scatterer position, medium properties, what else do I need to see, how the echo will ...
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### Representing propagators as Dirac delta functions [closed]

I have found online, in particular on the wolfram site, http://mathworld.wolfram.com/DeltaFunction.html, certain identities that allow one to represent a delta function as limits. Of particular ...
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### Wightman function for massless vector fields in Coulomb gauge

I've been looking for quite some time an expression for the Wightman functions for a massless vector field in the Coulomb gauge $\nabla\cdot\mathbf{A}=0$ (I think it is equivalent to the Feynman gauge ...
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### Greens function for forward propagating waves

I would like to find a form of a Green's function which accounts for the propagation of spherical waves expanding out from the spatial point $r$, but restricted to the forward propagating direction ...
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### References for the non-Abelian gauge covariant Laplace equation?

Is there a standard reference which discusses solutions to the non-Abelian gauge covariant Laplace equation $D_{\mu} D^{\mu} \phi = 0$, where $D_{\mu} \phi = \partial_{\mu} + ig[A_{\mu}, \phi]$? Note ...
I strugle with folowing problem. I do start with the locator equation of motion: $$G_{i j} = g_i \delta_{i j} + g_i \sum\limits_{k \ne i} W_{i k} G_{k j}$$ where $G_{i j}$ are matrix elements of ...