Dualities of Self-Dual Nonlinear Electrodynamics

Abstract

For any causal nonlinear electrodynamics theory that is "self-dual" (electromagnetic U(1)-duality invariant), the Legendre-dual pair of Lagrangian and Hamiltonian densities \L,H\ are constructed from functions \,h\ on R+ related to a particle-mechanics Lagrangian and Hamiltonian. We show how a `duality' relating to h implies that L and H are related by a simple map between appropriate pairs of variables. We also discuss Born's "Legendre self-duality" and implications of a new "-parity" duality. Our results are illustrated with many examples.

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