Convergence of Random Products of Countably Infinitely Many Projections
Abstract
Let r ∈ N\∞\ be a fixed number and let Pj\,\, (1 ≤ j≤ r ) be the projection onto the closed subspace Mj of H. We are interested in studying the sequence Pi1, Pi2, … ∈\P1, …, Pr\. A significant problem is to demonstrate conditions under which the sequence \Pin·s Pi2Pi1x\n=1∞ converges strongly or weakly to Px for any x∈H, where P is the projection onto the intersection M=M1 … Mr. Several mathematicians have presented their insights on this matter since von Neumann established his result in the case of r=2. In this paper, we give an affirmative answer to a question posed by M. Sakai. We present a result concerning random products of countably infinitely many projections (the case r=∞) incorporating the notion of pseudo-periodic function.
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