Coherent states over Grassmann manifolds and the WKB-exactness in path integral
Abstract
\(N\) coherent states over Grassmann manifold, \(NnN/ (n× N-n)\), are formulated to be able to argue the WKB-exactness, so called the localization of Duistermaat-Heckman, in the path integral representation of a character formula. The exponent in the path integral formula is proportional to an integer \(k\) that labels the \(N\) representation. Thus when \(k →∞\) a usual semiclassical approximation, by regarding \(k 1 / \), can be performed yielding to a desired conclusion. The mechanism of the localization is uncovered by means of a view from an extended space realized by the Schwinger boson technique.
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