Area-Preserving Diffeomorphisms, w∞ Algebras and w∞ Gravity
Abstract
The w∞ algebra is a particular generalization of the Virasoro algebra with generators of higher spin 2,3,...,∞. It can be viewed as the algebra of a class of functions, relative to a Poisson bracket, on a suitably chosen surface. Thus, w∞ is a special case of area-preserving diffeomorphisms of an arbitrary surface. We review various aspects of area- preserving diffeomorphisms, w∞ algebras and w∞ gravity. The topics covered include a) the structure of the algebra of area-preserving diffeomorphisms with central extensions and their relation to w∞ algebras, b) various generalizations of w∞ algebras, c) the structure of w∞ gravity and its geometrical aspects, d) nonlinear realizations of w∞ symmetry and e) various quantum realizations of w∞ symmetry.
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