Distributed Systems of Intersecting Branes at Arbitrary Angles
Abstract
A `reduced' action formulation for a general class of the supergravity solutions, corresponding to the `marginally' bound `distributed' systems of various types of branes at arbitrary angles, is developed. It turns out that all the information regarding the classical features of such solutions is encoded in a first order Lagrangian (the `reduced' Lagrangian) corresponding to the desired geometry of branes. The marginal solution for a system of N such distributions (for various distribution functions) span an N dimensional submanifold of the fields' configuration (target) space, parametrised by a set of N independent harmonic functions on the transverse space. This submanifold, which we call it as the `H-surface', is a null surface with respect to a metric on the configuration space, which is defined by the reduced Lagrangian. The equations of motion then transform to a set of equations describing the embedding of a null geodesic surface in this space, which is identified as the H-surface. Using these facts, we present a very simple derivation of the conventional orthogonal solutions together with their intersection rules. Then a new solution for a (distributed) pair of p-branes at SU(2) angles in D dimensions is derived.
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