Quantization of the electromagnetic field . A photon corresponds to a unit of energy
E =
hν in its electromagnetic mode. In 1910,
Peter Debye derived
Planck's law of black-body radiation from a relatively simple assumption. He decomposed the electromagnetic field in a cavity into its
Fourier modes, and assumed that the energy in any mode was an integer multiple of h\nu, where \nu is the frequency of the electromagnetic mode. Planck's law of black-body radiation follows immediately as a geometric sum. However, Debye's approach failed to give the correct formula for the energy fluctuations of black-body radiation, which were derived by Einstein in 1909. As may be shown classically, the
Fourier modes of the
electromagnetic field—a complete set of electromagnetic plane waves indexed by their wave vector
k and polarization state—are equivalent to a set of uncoupled
simple harmonic oscillators. Treated quantum mechanically, the energy levels of such oscillators are known to be E=nh\nu, where \nu is the oscillator frequency. The key new step was to identify an electromagnetic mode with energy E=nh\nu as a state with n photons, each of energy h\nu. This approach gives the correct energy fluctuation formula. of two electrons interacting by exchange of a virtual photon
Dirac took this one step further. Second-order and higher-order perturbation calculations can give
infinite contributions to the sum. Such unphysical results are corrected for using the technique of
renormalization. Other virtual particles may contribute to the summation as well; for example, two photons may interact indirectly through virtual
electron–
positron pairs. Such photon–photon scattering (see
two-photon physics), as well as electron–photon scattering, is meant to be one of the modes of operations of the planned particle accelerator, the
International Linear Collider. In
modern physics notation, the
quantum state of the electromagnetic field is written as a
Fock state, a
tensor product of the states for each electromagnetic mode : |n_{k_0}\rangle\otimes|n_{k_1}\rangle\otimes\dots\otimes|n_{k_n}\rangle\dots where |n_{k_i}\rangle represents the state in which \, n_{k_i} photons are in the mode k_i. In this notation, the creation of a new photon in mode k_i (e.g., emitted from an atomic transition) is written as |n_{k_i}\rangle \rightarrow|n_{k_i}+1\rangle. This notation merely expresses the concept of Born, Heisenberg and Jordan described above, and does not add any physics.
As a gauge boson The electromagnetic field can be understood as a
gauge field, i.e., as a field that results from requiring that a gauge symmetry holds independently at every position in
spacetime. For the
electromagnetic field, this gauge symmetry is the
Abelian U(1) symmetry of
complex numbers of absolute value 1, which reflects the ability to vary the
phase of a complex field without affecting
observables or
real valued functions made from it, such as the
energy or the
Lagrangian. The quanta of an
Abelian gauge field must be massless, uncharged bosons, as long as the symmetry is not broken; hence, the photon is predicted to be massless, and to have zero
electric charge and integer spin. The particular form of the
electromagnetic interaction specifies that the photon must have
spin ±1; thus, its
helicity must be \pm \hbar. These two spin components correspond to the classical concepts of
right-handed and left-handed circularly polarized light. However, the transient
virtual photons of
quantum electrodynamics may also adopt unphysical polarization states. Physicists continue to hypothesize
grand unified theories that connect these four gauge bosons with the eight
gluon gauge bosons of
quantum chromodynamics; however, key predictions of these theories, such as
proton decay, have not been observed experimentally.
Hadronic properties Measurements of the interaction between energetic photons and
hadrons show that the interaction is much more intense than expected by the interaction of merely photons with the hadron's electric charge. Furthermore, the interaction of energetic photons with protons is similar to the interaction of photons with neutrons in spite of the fact that the electrical charge structures of protons and neutrons are substantially different. A theory called
vector meson dominance (VMD) was developed to explain this effect. According to VMD, the photon is a superposition of the pure electromagnetic photon, which interacts only with electric charges, and vector mesons, which mediate the residual
nuclear force. However, if experimentally probed at very short distances, the intrinsic structure of the photon appears to have as components a charge-neutral flux of quarks and gluons, quasi-free according to asymptotic freedom in
QCD. That flux is described by the
photon structure function. A review by presented a comprehensive comparison of data with theoretical predictions.
Contributions to the mass of a system The energy of a system that emits a photon is
decreased by the energy E of the photon as measured in the rest frame of the emitting system, which may result in a reduction in mass in the amount {E}/{c^2}. Similarly, the mass of a system that absorbs a photon is
increased by a corresponding amount. As an application, the energy balance of nuclear reactions involving photons is commonly written in terms of the masses of the nuclei involved, and terms of the form {E}/{c^2} for the gamma photons (and for other relevant energies, such as the recoil energy of nuclei). This concept is applied in key predictions of
quantum electrodynamics (QED, see above). In that theory, the mass of electrons (or, more generally, leptons) is modified by including the mass contributions of virtual photons, in a technique known as
renormalization. Such "
radiative corrections" contribute to a number of predictions of QED, such as the
magnetic dipole moment of
leptons, the
Lamb shift, and the
hyperfine structure of bound lepton pairs, such as
muonium and
positronium. Since photons contribute to the
stress–energy tensor, they exert a
gravitational attraction on other objects, according to the theory of
general relativity. Conversely, photons are themselves affected by gravity; their normally straight trajectories may be bent by warped
spacetime, as in
gravitational lensing, and
their frequencies may be lowered by moving to a higher
gravitational potential, as in the
Pound–Rebka experiment. However, these effects are not specific to photons; exactly the same effects would be predicted for classical
electromagnetic waves. == In matter ==