EXPONENTIAL INTEGRABILITY OF STOCHASTIC CONVOLUTIONS

JAN SEIDLER; TAKUYA SOBUKAWA

doi:10.1112/S0024610702003745

Abstract

Sufficient conditions are found for stochastic convolution integrals driven by a Wiener process in a Hilbert space to belong to the Orlicz space exp $L^2$ ; standard exponential tail estimates follow from these results. Proofs are based on the extrapolation theory and are rather simple.

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EXPONENTIAL INTEGRABILITY OF STOCHASTIC CONVOLUTIONS

Abstract

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EXPONENTIAL INTEGRABILITY OF STOCHASTIC CONVOLUTIONS

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