The Role of the Canonical Element in the Quantized Algebra of Differential Operators
Abstract
We review the construction of the cross product algebra from two dually paired Hopf algebras and . The canonical element in is then introduced, and its properties examined. We find that it is useful for giving coactions on , and it allows the construction of objects with specific invariance properties under these coactions. A ``vacuum operator'' is found which projects elements of onto said objects. We then discuss bicovariant vector fields in the context of the canonical element.
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