Operator-Valued Moment Series of the Generating Operator of L(F2) Over the Commutator Group von Neumann algebra L(K)
Abstract
In this paper, we will consider the generating operator of the free group factor L(F2). Then we can construct the group von Neumann algebra L(K), where K is the commutator group of F2 and the conditional expectation E. Then (L(F2), E) is the W*-probability space with amalgamation over L(K). In this paper, we will compute the trivial operator-valued moment series of the generating operator of L(F2) over L(K). This computation is the good example for studying the operator-valued distribution, since the operator-valued moment series of operator-valued random variables contain algebraic and combinatorial free probability information about the opeartor-valued distributions.
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