Abstract. The notion of bundle convergence for single (ordinary) sequences in von Neumann algebras and their $L_2$-spaces was introduced by Hensz, Jajte and Paszkiewicz in 1996. We adopted this notion for double sequences in 2001. In the present paper, we prove a new two-parameter SLLN for double sequences of orthogonal vectors in an $L_2$-space, and this SLLN is an intermediate one between those two Strong Laws of Large Numbers (in abbreviation: SLLN) proved in [4, Theorems 1 and 2]. One of our tools is a more precise variant of the Rademacher--Menshov inequality in noncommutative setting, which may be useful in other cases.
AMS Subject Classification
(1991): 46L10, 46L53, 60B12
Keyword(s):
von Neumann algebra,
Gelfand-Naimark-Segal representation theorem,
bundle convergence,
orthogonal vectors,
Rademacher-Menshov inequality,
L_2,
SLLN in noncommutative-spaces
Received September 13, 2002, and in revised form December 30, 2003. (Registered under 5809/2009.)
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