Pseudodifferential equations and a generalized translation operator in non-gaussian infinite-dimensional analysis

Н. А. Качановский

Pseudodifferential equations and a generalized translation operator in non-gaussian infinite-dimensional analysis

Authors

N. A. Kachanovskii

Abstract

Pseudodifferential equations of the form

$v(D_{\chi})y = f$ (where

$v$ is a function holomorphic at zero and

$D_{\chi}$ is a pseudodifferential operator) are studied on spaces of test functions of non-Gaussian infinite-dimensional analysis. The results obtained are applied to construct a generalized translation operator

$T^{\chi}_y = \chi(\langle y, D_{\chi}\rangle)$ the already mentioned spaces and to study its properties. In particular, the associativity, the commutativity, and another properties of

$T^{\chi}_y$ which are analogs of the classical properties of a generalized translation operator.

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Published

25.10.1999

Issue

Vol. 51 No. 10 (1999)

Section

Research articles

How to Cite

Kachanovskii, N. A. “Pseudodifferential Equations and a Generalized Translation Operator in Non-Gaussian Infinite-Dimensional Analysis”. Ukrains’kyi Matematychnyi Zhurnal, vol. 51, no. 10, Oct. 1999, pp. 1334–1341, https://umj.imath.kiev.ua/index.php/umj/article/view/4732.

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Pseudodifferential equations and a generalized translation operator in non-gaussian infinite-dimensional analysis

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