On Kondratiev spaces of test functions in the non-Gaussian infinite-dimensional analysis
DOI:
Keywords:
Kondratiev space, non-Gaussian analysisAbstract
A blanket version of the non-Gaussian analysis under the so-called bior hogo al approach uses the Kondratiev spaces of test functions with orthogonal bases given by a generating function $Q\times H \ni (x,\lambda)\mapsto h(x;\lambda)\in\mathbb C$, where $Q$ is a metric space, $H$ is some complex Hilbert space, $h$ satisfies certain assumptions (in particular, $h(\cdot;\lambda)$ is a continuous function, $h(x;\cdot)$ is a holomorphic at zero function). In this paper we consider the construction of the Kondratiev spaces of test functions with orthogonal bases given by a generating function $\gamma(\lambda)h(x;\alpha(\lambda))$, where $\gamma :H\to\mathbb C$ and $\alpha :H\to H$ are holomorphic at zero functions, and study some properties of these spaces. The results of the paper give a possibility to extend an area of possible applications of the above mentioned theory.Downloads
Published
2013-12-25
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How to Cite
Kachanovsky, N. A. “On Kondratiev Spaces of Test Functions in the Non-Gaussian Infinite-Dimensional Analysis”. Methods of Functional Analysis and Topology, vol. 19, no. 4, Dec. 2013, pp. 301-9, https://zen.imath.kiev.ua/index.php/mfat/article/view/554.
