p-form electrodynamics

In theoretical physics, p-form electrodynamics is a generalization of Maxwell's theory of electromagnetism.

Ordinary (via. one-form) Abelian electrodynamics

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We have a one-form  , a gauge symmetry

 

where   is any arbitrary fixed 0-form and   is the exterior derivative, and a gauge-invariant vector current   with density 1 satisfying the continuity equation

 

where   is the Hodge star operator.

Alternatively, we may express   as a closed (n − 1)-form, but we do not consider that case here.

  is a gauge-invariant 2-form defined as the exterior derivative  .

  satisfies the equation of motion

 

(this equation obviously implies the continuity equation).

This can be derived from the action

 

where   is the spacetime manifold.

p-form Abelian electrodynamics

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We have a p-form  , a gauge symmetry

 

where   is any arbitrary fixed (p − 1)-form and   is the exterior derivative, and a gauge-invariant p-vector   with density 1 satisfying the continuity equation

 

where   is the Hodge star operator.

Alternatively, we may express   as a closed (np)-form.

  is a gauge-invariant (p + 1)-form defined as the exterior derivative  .

  satisfies the equation of motion

 

(this equation obviously implies the continuity equation).

This can be derived from the action

 

where M is the spacetime manifold.

Other sign conventions do exist.

The Kalb–Ramond field is an example with p = 2 in string theory; the Ramond–Ramond fields whose charged sources are D-branes are examples for all values of p. In eleven-dimensional supergravity or M-theory, we have a 3-form electrodynamics.

Non-abelian generalization

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Just as we have non-abelian generalizations of electrodynamics, leading to Yang–Mills theories, we also have nonabelian generalizations of p-form electrodynamics. They typically require the use of gerbes.

References

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  • Henneaux; Teitelboim (1986), "p-Form electrodynamics", Foundations of Physics 16 (7): 593-617, doi:10.1007/BF01889624
  • Bunster, C.; Henneaux, M. (2011). "Action for twisted self-duality". Physical Review D. 83 (12): 125015. arXiv:1103.3621. Bibcode:2011PhRvD..83l5015B. doi:10.1103/PhysRevD.83.125015. S2CID 119268081.
  • Navarro; Sancho (2012), "Energy and electromagnetism of a differential k-form ", J. Math. Phys. 53, 102501 (2012) doi:10.1063/1.4754817