Quantum stochastic integrals as operators
Abstract
We construct quantum stochastic integrals for the integrator being a martingale in a von Neumann algebra, and the integrand -- a suitable process with values in the same algebra, as densely defined operators affiliated with the algebra. In the case of a finite algebra we allow the integrator to be an L2--martingale in which case the integrals are L2--martingales too.
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