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Journal of Soviet Mathematics

, Volume 49, Issue 2, pp 926–929 | Cite as

A mean value theorem connected with infinite-dimensional heat potentials

  • N. V. Norin
Article

Keywords

Heat Potential 
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Literature cited

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    A. A. Belyaev, “The mean value theorem for functions that are harmonic in a domain of a Hilbert space,”Vestnik Moskov. Univ. Ser. I Mat. Mekh., No. 5, 32–35 (1982).Google Scholar
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    A. V. Uglanov, “Surface integrals in a Banach space,”Mat. Sb.,110, No. 2, 189–217 (1979).Google Scholar
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    O. G. Smolyanov, Analysis on Linear Topological Spacs and Its Applications [in Russian], Izd. Moskov. Gos. Univ., Moscow (1979).Google Scholar
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    N. V. Norin, “Heat potentials on a Hilbert space,”Mat. Zametki,35, No. 4, 531–548 (1984).Google Scholar
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    V. I. Averbukh, O. G. Smolyanov, and S. V. Fomin, “Generalized functions and differential equations in linear spaces. I. Differentiable measures,”Trudy Moskov. Mat. Obshch.,24, 133–174 (1971).Google Scholar

Copyright information

© Plenum Publishing Corporation 1990

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  • N. V. Norin

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