Gauge Theory of Relativistic Membranes
Abstract
In this paper we show that a relativistic membrane admits an equivalent representation in terms of the Kalb-Ramond gauge field Fμ=∂\,[\,μB] encountered in string theory. By `` equivalence '' we mean the following: if x=X() is a solution of the classical equations of motion derived from the Dirac-Nambu-Goto action, then it is always possible to find a differential form of rank three, satisfying Maxwell-type equations. The converse proposition is also true. In the first part of the paper, we show that a relativistic membrane, regarded as a mechanical system, admits a Hamilton-Jacobi formulation in which the H-J function describing a family of classical membrane histories is given by F=dB=dS1 dS2 dS3. In the second part of the paper, we introduce a new lagrangian of the Kalb-Ramond type which provides a first order formulation for both open and closed membranes. Finally, for completeness, we show that such a correspondence can be established in the very general case of a p-brane coupled to gravity in a spacetime of arbitrary dimensionality.
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