All-derivable points in nest algebras
Abstract
Suppose that A is an operator algebra on a Hilbert space H. An element V in A is called an all-derivable point of A for the strong operator topology if every strong operator topology continuous derivable mapping φ at V is a derivation. Let N be a complete nest on a complex and separable Hilbert space H. Suppose that M belongs to N with \0\≠ M≠\ H and write M for M or M. Our main result is: for any ∈ algN with =P(M) P(M), if |M is invertible in algNM, then is an all-derivable point in algN for the strong operator topology.
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