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First order differential operators in white noise analysis

Authors:	Dong Myung Chung Tae Su Chung

Institution:	Department of Mathematics, Sogang University Seoul, 121-742, Korea ; Department of Mathematics, Sogang University Seoul, 121-742, Korea

Abstract:	Let be the space of test white noise functionals. We first introduce a family $\{ \diamond _{\gamma}\,\,;\,\,\gamma\in {\Bbb C} \}$ of products on including Wiener and Wick products, and then show that with each product $\diamond _{\gamma}$ , we can associate a first order differential operator, called a first order $\gamma$ -differential operator. We next show that a first order $\gamma$ -differential operator is indeed a continuous derivation under the product $\diamond _{\gamma}$ . We finally characterize $\gamma\Delta _G+N$ by means of rotation-invariance and continuous derivation under the product $\diamond _{\gamma}$ . Here $\Delta _G$ and are the Gross Laplacian and the number operator on , respectively.

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