Continuous evolution families

Abstract

Recently in relation to the theory of non-commutative probability, a notion of evolution families \ωs,t\s t is generalized that are only continuous in parameters, namely (s,t) ωs,t is continuous with respect to locally uniform convergence on a planar domain. In this article we present various equivalence conditions to the continuous evolution families concerned with the left and right parameters. We also provide an example of a discontinuous evolution family in the last section.

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