Dirac string

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In physics, a Dirac string is a fictitious one-dimensional curve in space, conceived of by the physicist Dirac, stretched from a magnetic monopole - also called the Dirac monopole - to infinity. The gauge potential cannot be defined on the Dirac string, but it is defined everywhere else. The Dirac string acts as the solenoid in the Aharonov-Bohm effect, and the requirement that the position of the Dirac string should not be observable implies the Dirac quantization rule: the product of a magnetic charge and an electric charge must always be an integer multiple of .

The quantization forced by the Dirac string can be understood in terms of the cohomology of the fibre bundle representing the gauge fields over the base manifold of space-time. The magnetic charges of a gauge field theory can be understood to be the group generators of the cohomology group H1(M) for the fiber bundle M. The cohomology arises from the idea of classifying all possible gauge field strengths F = dA, which are manifestly exact forms, modulo all possible gauge transformations, given that the field strength F must be a closed form: dF = 0. Here, A is the vector potential and d represents the gauge-covariant derivative, and F the field strength or curvature form on the fiber bundle. Informally, one might say that the Dirac string carries away the "excess curvature" that would otherwise prevent F from being a closed form, as one has that dF = 0 everywhere except at the location of the monopole.

[edit] References

  • P.A.M. Dirac, "Quantized Singularities in the Electromagnetic Field", Proceedings of the Royal Society, A133 (1931) pp 60-72.