Photons as the electric field. Question

In summary, the frequency of photons in the electromagnetic field is determined by the energy density of the field and the time-energy uncertainty principle, which allows for virtual photons to have higher energies and frequencies near their sources. This explains why electromagnetic field strength increases as sources are approached and why high energy photons are encountered only near their sources.
  • #1
Ivan Seeking
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Hopefully this is not a stupid question. When we talk about photon exchange as the electric field, what determines the frequency of the photons? I would tend to assume that the electric field strength goes as photon frequency, but since classically the field strength can depend entirely on the quantity of charge [assuming no magnetic field] present, which seems to mean that a stronger electric field has more photon exchanges but not stronger ones, I don't see what would detemine frequency of the photons. Is this a function of distance that manifest generally as the inverse square law?
 
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  • #2


Greetings !

First of of all, it's not just the electric field if you're
talking about photons, it's the electromagnetic field.

As for the frequency of the photons, I believe it can
be calculated from and described as a quality of the
energy density of the electromagnetic field. (I'm afraid
I can't help you with Maxwell's equations that describe this,
my knowledge of this is strictly theoretical, for now.)

Live long and prosper.
 
  • #3


Originally posted by drag
Greetings !

First of of all, it's not just the electric field if you're
talking about photons, it's the electromagnetic field.

I may, but I'm very thin on this idea. I mean for a static electric field. For example, for a charged sphere. The electric field measured about the sphere can be described by a photon exchange. I understand to some extent how we get attraction and repulsion by this. Beyond these two points I get in trouble really fast.
 
  • #4
No, a static electric field has nothing to do with photons or light. Light consists of waves in the electromagnetic field. If you don't have both you can't have waves and so can't have light.(Strictly speaking, "electric" and "magnetic" are components of the same field. A "static electric field" is one in which the magnetic component is 0.)

Photons are the quantization of the electromagnetic field.
 
  • #5


Greetings !
Originally posted by Ivan Seeking
I may, but I'm very thin on this idea. I mean for a static electric field. For example, for a charged sphere. The electric field measured about the sphere can be described by a photon exchange. I understand to some extent how we get attraction and repulsion by this. Beyond these two points I get in trouble really fast.
I believe you are referring to virtual particles ?

Well, look at it this way. The enitial mathematical discriptions
of forces used geometrical discriptions - continuous dimensions
that deform by the effect of the source of the force and
thus effect other bodies with a certain "charge" relevant to
this force. This is the way GR works - a space-time geometry
deformed by the gravitational charge - mass.

QM deals with things in a different manner - everything is
quantified - cut into individual packets. This is where
virtual particles appear - instead of discribing a geometry
we discribe (according to QM's interpretation) individual
packets that "transport" the electric and other forces.

You should make a search for Feynman Diagrams that explain
this theorized virtual particles' interaction. They're
easy to find online and provide a nice graphic discription
and explanation of this process.

Live long and prosper.
 
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  • #6


Originally posted by drag
Greetings !

I believe you are referring to virtual particles ?

Well, look at it this way. The enitial mathematical discriptions
of forces used geometrical discriptions - continuous dimensions
that deform by the effect of the source of the force and
thus effect other bodies with a certain "charge" relevant to
this force. This is the way GR works - a space-time geometry
deformed by the gravitational charge - mass.

QM deals with things in a different manner - everything is
quantified - cut into individual packets. This is where
virtual particles appear - instead of discribing a geometry
we discribe (according to QM's interpretation) individual
packets that "transport" the electric and other forces.

You should make a search for Feynman Diagrams that explain
this theorized virtual particles' interaction. They're
easy to find online and provide a nice graphic discription
and explanation of this process.

Live long and prosper.

I read QED years ago but I don't remember this issue [virtual photon frequency] being addressed. I will take a look. Also, I didn't remember them as being virtual; so long as the charged body interacts with another.
 
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  • #7


Greetings !
Originally posted by Ivan Seeking
I read QED years ago but I don't remember this issue [virtual
photon frequency] being addressed.
I never read it so far so I can't adress it I'm afraid.
I believe that it still relates to energy density of the
field, but I do not know if there are precise frequencies
for 3 of the forces or like in the case of the gravitational
force - there is a problem of plotting (I believe it's called
"normalising" ?) the interaction since you get any number of
1 to infinity of virtual particles' interaction loops.

Or something like that... On to the experts with this.:wink:

Live long and prosper.
 
  • #8
Originally posted by Ivan Seeking
...When we talk about photon exchange as the electric field, what determines the frequency of the photons? I would tend to assume that the electric field strength goes as photon frequency, but since classically the field strength can depend entirely on the quantity of charge [assuming no magnetic field] present, which seems to mean that a stronger electric field has more photon exchanges but not stronger ones, I don't see what would detemine frequency of the photons. Is this a function of distance that manifest generally as the inverse square law?

Why does electromagnetic field strength grow as it's sources are approached, or in quantum theoretic terms, why are high energy photons encountered only near their sources? The answer is that the time-energy uncertainty principle allows photons to have greater energies (or equivalently, frequencies) than allowed by the relation pμpμ = -m2 = 0 satisfied classically by their 4-momenta as long as their lifetimes and hence the distances they travel are sufficiently short. Such photons are called "virtual" and their 4-momenta are said to be "off the mass shell", i.e. pμpμ ≠ 0.
 
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  • #9


Originally posted by jeff
Why does electromagnetic field strength grow as it's sources are approached, or in quantum theoretic terms, why are high energy photons encountered only near their sources? The answer is that the time-energy uncertainty principle allows photons to have greater energies (or equivalently, frequencies) than allowed by the relation pμpμ = -m2 = 0 satisfied classically by their 4-momenta as long as their lifetimes and hence the distances they travel are sufficiently short. Such photons are called "virtual" and their 4-momenta are said to be "off the mass shell", i.e. pμpμ ≠ 0.

Are you saying that the inverse square law is a special case of the time-energy uncertainty relationship?
 
  • #10


Originally posted by Ivan Seeking
Are you saying that the inverse square law is a special case of the time-energy uncertainty relationship?

No. Inverse square laws are a consequence of the structure of tree amplitudes for the exchange of bosons that result from the fact that the lagrangian densities involve two powers of the spacetime derivative. In momentum space, the relevant part of the energy E of interaction between electrically charged particles at x1 and x2 following from these amplitudes is

E = - (1/2π)3∫d3k exp[ik⋅(x1 - x2)](ik2+m2)-1 = - (1/4πr)e-mr

where r ≡ |x1 - x2|. Setting the mass m equal to zero for the photon in the case of the electromagnetic interaction and computing ∂E/∂r yields the familiar inverse square law of coulomb for the electromagnetic force.
 
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  • #11


Originally posted by jeff
No. Inverse square laws are a consequence of the structure of tree amplitudes for the exchange of bosons that result from the fact that the lagrangian densities involve two powers of the spacetime derivative. In momentum space, the relevant part of the energy E of interaction between electrically charged particles at x1 and x2 following from these amplitudes is

E = - (1/2π)3∫d3k exp[ik⋅(x1 - x2)](ik2+m2)-1 = - (1/4πr)e-mr

where r ≡ |x1 - x2|. Setting the mass m equal to zero for the photon in the case of the electromagnetic interaction and computing ∂E/∂r yields the familiar inverse square law of coulomb for the electromagnetic force.

Then for a large charged surface we must write an equation for every combination of charged interacting pairs? Say for example if we have two large charged spheres. How does one calculate the energy for a particular photon exchange between these two spheres; thus the related frequency?
 
  • #12
Originally posted by Ivan Seeking
How does one calculate the energy for a particular photon exchange...?

The expression E = - (1/2π)3∫d3k exp[ik⋅(x1 - x2)](ik2+m2)-1 says that of the particles exchanged between sources a distance r apart, only those with momentum of magnitude k roughly of order 1/r or less contribute nonnegligibly to the energy. We can regard this heuristically as resulting from the cancellation of the contributions with k large compared to 1/r due to the oscillations of the phase factors exp[ik⋅(x1 - x2)]. This is consistent with the uncertainty principle since it says that higher energy particles are encountered as sources are approached. This expression also tells us that the characteristic distance of interactions mediated by field particles of mass m is just 1/m since the phase factor shows that k takes it's characteristic value m when k ≈ 1/r. Thus very light or massless particles like the photon mediate long-range interactions.
 
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  • #13
Originally posted by jeff
The expression E = - (1/2π)3∫d3k exp[ik⋅(x1 - x2)](ik2+m2)-1 says that of the particles exchanged between sources a distance r apart, only those with momentum of magnitude k roughly of order 1/r or less contribute nonnegligibly to the energy. We can regard this heuristically as resulting from the cancellation of the contributions with k large compared to 1/r due to the oscillations of the phase factors exp[ik⋅(x1 - x2)]. This is consistent with the uncertainty principle since it says that higher energy particles are encountered as sources are approached. This expression also tells us that the characteristic distance of interactions mediated by field particles of mass m is just 1/m since the phase factor shows that k takes it's characteristic value m when k ≈ 1/r. Thus very light or massless particles like the photon mediate long-range interactions.

Jeff, thanks for all of your great answers!
 
  • #14
Feynman and some others invented the concept of virtual photons ad hoc in order to calculate a second order effect (the gyromagnetic ratio) to a high degree of precision - QED does not lead to a derivation of Coulombs inverse squared law - nor does it address the fundamental issues in a way that can be related to concepts for which we have familiar analogies - it is an alternative that provides a way to calculate the perturbation coefficients. Dirac and others proposed different explanations for the electrostatic field.
 
  • #15
Originally posted by yogi
...QED does not lead to a derivation of Coulombs inverse squared law...

As I've shown, QED does produce coulomb's law. If you're remark was true, QED wouldn't produce correct predictions. In fact any theory that makes correct predictions must produce the corresponding classical expressions at low energies.
 
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  • #16
Jeff - where have you shown QED derives the inverse squared law - what did you use for the charge and why does it have the value it has - you would have to fudge all the properties of the virtual photons to get an inverse squared law and the correct force coefficient - and if you have to do that you have not derived anything - you simply started from the experimental result and worked backwards
 
  • #17
Originally posted by yogi
Jeff - where have you shown QED derives the inverse squared law

Inverse square laws are a consequence of the structure of tree amplitudes for the exchange of bosons that result from the fact that the lagrangian densities involve two powers of the spacetime derivative. In momentum space, the relevant part of the energy E of interaction between electrically charged particles at x1 and x2 following from these amplitudes is

E = - (1/2π)3∫d3k exp[ik⋅(x1 - x2)](ik2+m2)-1 = - (1/4πr)e-mr

where r ≡ |x1 - x2|. Setting the mass m equal to zero for the photon in the case of the electromagnetic interaction and computing ∂E/∂r yields the familiar inverse square law of coulomb for the electromagnetic force.
 
  • #18
So Jeff -- where is the physics - where did the fundamental equation come from - what have bosons to do with the electrical force between two electrons - define the parameters and how each is physically related to the problem posed -- where does your equation provide an answer to the question of why the electron has a unique charge that will repel another electron with a certain force at a certain distance - you can always gin up an inverse squared law based upon simply geometry - because the notion of a field is deemed to be reduced proportionately with the area over which is is spread ...that is not what is at issue - the point is the physics are introduced by hand

I know the argument that the photon must be massless for the force to extend to infinity - and the notion that uncertainty allows borrowing from the medium temporarily ... but these are all hypothetical rationales ... you cannot get a qualitative value for "e" from this, or if you can - show me. As Lord Kelvin once said - "When you can talk about something with numbers, you know something about it - when you cannot, your knowledge is of a meager and unsatisfactory nature."
 
  • #19
Originally posted by yogi
...the physics are introduced by hand...

As always.
 
  • #20
Jeff - if we had a complete (correct) theory we would not have to put in the electron charge by hand - the theory would predict what the charge should be in terms of other relationships e.g., when Newton combined his gravitational formulation with his laws of inertial motion - he could derive Kepler's laws - by analogy, there is a physical reason why charge has a certain value - why it cannot be something else - otherwise we are reduced to God given factors and God given constants - while there are a few occasions where the math preceded the physical model (e.g., Dirac's derivation of the gyromagnetic ratio, they are rare), In the usual case, it will we usually be more insighful to rely upon the math to test the physical model - not to generate it
 
  • #21
Originally posted by yogi
if we had a complete (correct) theory we would not have to put in the electron charge by hand - the theory would predict what the charge should be...

Such a theory would be expected to explain the success of QED, the subject of this thread. In the absence of such a theory, the best I can do is show how QED produces the inverse square law, which is what Ivanseeking wanted to know. Do you understand QFT?
 
  • #22
To the extent I understand it - I don't buy it - granted it makes some predictions - but a correct theory must ultimately reduce to a quantative physical description. When such is discovered, my guess is that what is now founded upon particle interaction metaphores will be relegated to little more than puzzlement over how something so far from reality could produce useful results.
 
  • #23
Originally posted by yogi
To the extent I understand it - I don't buy it - granted it makes some predictions - but a correct theory must ultimately reduce to a quantative physical description. When such is discovered, my guess is that what is now founded upon particle interaction metaphores will be relegated to little more than puzzlement over how something so far from reality could produce useful results.

I take it then that you don't understand QFT.
 
  • #24
take it as you will
 

1. What is a photon?

A photon is a fundamental particle of light and contains energy and momentum. It has no mass and travels at the speed of light.

2. How is the electric field related to photons?

The electric field is a fundamental property of photons. Photons have an electric field that oscillates perpendicular to their direction of travel, which allows them to interact with charged particles.

3. How do photons carry energy?

Photons carry energy through their electric and magnetic fields, which vibrate at a specific frequency. The energy of a photon is directly proportional to its frequency.

4. Can photons be created or destroyed?

Photons cannot be created or destroyed, but they can be absorbed or emitted by particles during interactions. This conservation of photons is known as the law of conservation of energy.

5. What is the relationship between photons and electricity?

Electricity is the flow of charged particles, and photons can interact with these charged particles to create an electric current. Photons also play a crucial role in technologies such as solar panels, which convert light energy into electrical energy.

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