Random Operator-Valued Frames in Hilbert Spaces (2508.01914v1)

Abstract: This paper develops a framework for operator-valued random variables on separable Hilbert spaces. Random operators are defined as measurable maps into the space of bounded operators, with measurability understood in the strong operator sense. Under a coercivity condition on i.i.d. random positive contractions, an iterative scheme is introduced and shown to converge both in mean square and almost surely. The limit is identified, and the resulting family of iterated random operators forms a random operator-valued frame. In the special case of random projections, the construction yields a Parseval-type identity.