A certain fixed point theorem and its applications to integral-functional equations

M. Zima

doi:10.1017/S0004972700011813

Abstract

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In this paper a variant of Banach's contraction principle is established. By using the properties of the spectral radius of a bounded linear operator A defined in a suitable Banach space, we conclude that another operator A has exactly one fixed point in this space. In the second part of this paper some applications are given.

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Zima, M. 1993. A theorem on the spectral radius of the sum of two operators and its application. Bulletin of the Australian Mathematical Society, Vol. 48, Issue. 3, p. 427.

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Zima, Mirosława 1999. On the local spectral radius in partially ordered Banach spaces. Czechoslovak Mathematical Journal, Vol. 49, Issue. 4, p. 835.

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A certain fixed point theorem and its applications to integral-functional equations

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