The Dynamics of Relativistic Membranes II: Nonlinear Waves and Covariantly Reduced Membrane Equations
Abstract
By explicitly eliminating all gauge degrees of freedom in the 3+1-gauge description of a classical relativistic (open) membrane moving in 3 we derive a 2+1-dimensional nonlinear wave equation of Born-Infeld type for the graph z(t,x,y) which is invariant under the Poincar\'e group in four dimensions. Alternatively, we determine the world-volume of a membrane in a covariant way by the zeroes of a scalar field u(t,x,y,z) obeying a homogeneous Poincar\'e-invariant nonlinear wave-equation. This approach also gives a simple derivation of the nonlinear gas dynamic equation obtained in the light-cone gauge.
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