Stochastic integration with respect to canonical α-stable cylindrical L\'evy processes

Abstract

In this work, we introduce a theory of stochastic integration with respect to symmetric α-stable cylindrical L\'evy processes. Since α-stable cylindrical L\'evy processes do not enjoy a semi-martingale decomposition, our approach is based on a decoupling inequality for the tangent sequence of the Radonified increments. This approach enables us to characterise the largest space of predictable Hilbert-Schmidt operator-valued processes which are integrable with respect to an α-stable cylindrical L\'evy process as the collection of all predictable processes with paths in the Bochner space Lα. We demonstrate the power and robustness of the developed theory by establishing a dominated convergence result allowing the interchange of the stochastic integral and limit.

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