Complex scalar field propagator evaluation.

[Ace10]

Good afternoon fellow scientists,i have a small problem in evaluating the propagator for the complex Klein-Gordon field. Although the procedure is the one followed for the computation of the propagator of the real K-G field, a problem comes up:

As known: <0|T\varphi^{+}(x)\varphi(y)|0> = \Theta(x^{0}-y^{0})<0|\varphi^{+}(x)\varphi(y)|0> + \Theta(y^{0}-x^{0})<0|\varphi(y)\varphi^{+}(x)|0>

and <0|\varphi^{+}(x)\varphi(y)|0>=<0|\varphi(y)\varphi^{+}(x)|0>

But if we try to verify that one of the above correlation functions is a green's function of the K-G equation we hit the obstacle: \partial_{x}<0|\varphi^{+}(x)\varphi(y)|0> . And I refer to it as an obstacle because of the commutation relation [\varphi(x),\pi^{+}(y)]=0..How could i deal with this calculation..? Thanks in advance.

 

[Ace10]

sorry about the equation faults, if something is not clear or needs correction, please let me know.

 

[Avodyne]

Try putting the entire equation in tex. The tex symbols for left and right angle brackets are \langle and \rangle.

 

[Crake]

Good afternoon fellow scientists,i have a small problem in evaluating the propagator for the complex Klein-Gordon field. Although the procedure is the one followed for the computation of the propagator of the real K-G field, a problem comes up:

As known: <0|T\varphi^{+}(x)\varphi(y)|0>=\Theta(x^{0}-y^{0})&lt;0|\varphi^{+}(x)\varphi(y)|0>+\Theta(y^{0}-x^{0})&lt;0|\varphi(y)\varphi^{+}(x)|0>

and <0|[/itex]\varphi^{+}(x)\varphi(y)|0>=<0|\varphi(y)\varphi^{+}(x)[/itex]|0>

But if we try to verify that one of the above correlation functions is a green's function of the K-G equation we hit the obstacle: \partial_{x}<0|[/itex]\varphi^{+}(x)\varphi(y)|0> . And I refer to it as an obstacle because of the commutation relation [\varphi(x),\pi^{+}(y)]=0..How could i deal with this calculation..? Thanks in advance.

Hello,

You should take a look at this link. I know it's quite hard to find, but it gives a pretty good introduction on mathjax/latex.

 

[Ace10]

I think its ok now..Good afternoon fellow scientists,i have a small problem in evaluating the propagator for the complex Klein-Gordon field. Although the procedure is the one followed for the computation of the propagator of the real K-G field, a problem comes up:

As known: <0|Tφ + (x)φ(y) |0> = Θ(x 0 −y 0 ) <0|φ + (x)φ(y) |0> + Θ(y 0 −x 0 ) <0|φ(y)φ + (x) |0>

and <0|φ + (x)φ(y) |0>=<0|φ(y)φ + (x) |0>

But if we try to verify that one of the above correlation functions is a green's function of the K-G equation we hit the obstacle: ∂ x <0|φ + (x)φ(y) |0> . And I refer to it as an obstacle because of the commutation relation [φ(x),π + (y) ]=0..How could i deal with this calculation..? Thanks in advance.
As for the problem itself, any help?

 

[andrien]

See if this helps,you can see it further in Peskin and Schroeder's book.

 

[Ace10]

Thanks adrien,I have in mind the corresponding paragraph in Peskin and Schroeder's book but I'll check this out too, it's quite helpful.