Poisson infinite-dimensional analysis as an example of analysis related to generalized translation operators
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Keywords
Jacobi Field Poisson Measure Integral Equation Operator Theory Multiple Configuration White Noise Analysis
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References
- 1.Y. Itô, Probab. Theory Related Fields,77, 1–28 (1988).MATHMathSciNetCrossRefGoogle Scholar
- 2.Y. Itô, and I. Kubo, Nagoya Math. J.,111, 41–84 (1988).MATHMathSciNetGoogle Scholar
- 3.Yu. G. Kondratiev, J. L. da Silva, L. Streit, and G. F. Us, Infinite Dim. Anal. Quantum Prob. Related Topics,1, No. 1, 91–117 (1998).MATHMathSciNetCrossRefGoogle Scholar
- 4.Yu. M. Berezansky, Funct. Anal. Applications,30, No 4, 61–65 (1996).MathSciNetGoogle Scholar
- 5.Yu. M. Berezansky, Ukr. Math. J.,49, No. 3, 364–409 (1997).Google Scholar
- 6.E. W. Lytvynov, Methods Funct. Anal. Topology,1, No. 1, 61–85 (1995).MATHMathSciNetGoogle Scholar
- 7.Yu. M. Berezansky, Integral Equations Operator Theory,30, No. 2, 163–190 (1998).MATHMathSciNetCrossRefGoogle Scholar
- 8.S. Albeverio, Yu. G. Kondratiev, and M. Röckner, Analysis and Geometry on Configuration Spaces, Bielefeld, Preprint BiBoS, 1997.Google Scholar
- 9.Yu. M. Berezansky, Selfadjoint Operators in Spaces of Functions of Infinitely Many Variables, Amer. Math. Soc., Providence, RI, 1986.Google Scholar
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© Plenum Publishing Corporation 1999