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On a random Volterra integral equation

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Summary

Tsokos [12] showed the existence of a unique random solution of the random Volterra integral equation (*)x(t; ω) = h(t; ω) + ∫ t o k(t, τ; ω)f(τ, x(τ; ω)) dτ, whereω ∈ Ω, the supporting set of a probability measure space (Ω,A, P). It was required thatf must satisfy a Lipschitz condition in a certain subset of a Banach space. By using an extension of Banach's contraction-mapping principle, it is shown here that a unique random solution of (*) exists whenf is (∈, λ)-uniformly locally Lipschitz in the same subset of the Banach space considered in [12].

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  1. Department of Mathematics, University of South Carolina, 29208, Columbia, South Carolina, USA

    W. J. Padgett

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  1. W. J. Padgett
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Padgett, W.J. On a random Volterra integral equation. Math. Systems Theory 7, 164–169 (1973). https://doi.org/10.1007/BF01762234

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