Conformally Invariant Sigma Models on Anti de Sitter Spaces, Chern-Simons p-branes and W Geometry

Abstract

Conformally invariant sigma models in D=2n dimensions with target non-compact O(2n,1) groups are studied. It is shown that despite the non-compact nature of the O(2n,1) groups, the classical action and Hamiltonian are positive definite. Instanton field configurations are found to correspond geometrically to conformal ``stereographic'' mappings of R2n into the Euclidean signature AdS2n spaces. Zaikov's relationship between Self Dual p-branes and Chern-Simons p'-branes, provided p=p'+1 and the embedding D=p+1-dimensional manifold is Euclidean, is elaborated further. Branes actions can be obtained also from a Moyal deformation quantization of Generalized Yang Mills Theories. Using this procedure, we show how four dimensional SU(N) YM theories contain Chern-Simons membranes and hadronic bags in the large N limit. Since Chern-Simons p'-branes have an underlying infinite dimensional algebra containing W1+∞, as shown by Zaikov, we discuss the importance that W geometry should have in the final formulation of M theory.

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