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Positive generalized Wiener functions and potential theory over abstract Wiener spaces
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Relatively Compact Sets on Abstract Wiener Space
Acta Mathematica Sinica, English Series, 2005zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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On seminorms and probabilities, and abstract Wiener spaces
The Annals of Mathematics, 1971In real Hilbert space H there is a finitely additive measure n on the ring of sets defined by finitely many linear conditions, which is analogous to the normal distribution in the finite-dimensional case. This has been examined from various points of view in Gelfand and Vilenkin [11], Gross [12], Segal [19], as well as by many earlier authors.
Dudley, R. M. +2 more
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Towards a theory of functions in abstract Wiener spaces
Physica D: Nonlinear Phenomena, 2010The basic results on the theory of functions of bounded variation in an abstract Wiener space are discussed. First of all, the tools of the corresponding finite dimensional theory are carefully examined in order to find those results which are still helpful in infinite dimensional setting.
AMBROSIO, Luigi +3 more
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Products of Wiener Functionals on an Abstract Wiener Space
1988Mikusinski in [1] has proved that the product of the distributions δ (x) and pf. \(\frac{1} {{\text{x}}}\) on the one-dimensional Euclidean space ℝ exists in the sense of generalized operations and equals \(- \frac{1} {{\text{2}}}\delta \prime \left( {\text{x}} \right)\).
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Generalized convolution and generalized Fourier–Wiener transform on abstract Wiener space
Integral Transforms and Special Functions, 2010Using the generalized Fourier–Gauss transforms of functionals defined on the complexification of an abstract Wiener space in M.K. Im, U.C. Ji, and Y.J. Park [Relations between the first variation, the convolutions and the generalized Fourier-Gauss transforms, Bull. Korean Math. Soc.
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