On the equality of operator valued weights

Abstract

G. K. Pedersen and M. Takesaki have proved in 1973 that if is a faithful, semi-finite, normal weight on a von Neumann algebra M\;\!, and is a σ-invariant, semi-finite, normal weight on M\;\!, equal to on the positive part of a weak*-dense σ-invariant *-subalgebra of M\;\!, then =\;\!. In 1978 L. Zsid\'o extended the above result by proving: if is as above, a≥ 0 belongs to the centralizer M of \;\!, and is a σ-invariant, semi-finite, normal weight on M\;\!, equal to a:= (a1/2\;\!·\;\! a1/2) on the positive part of a weak*-dense σ-invariant *-subalgebra of M\;\!, then =a\;\!. Here we will further extend this latter result, proving criteria for both the inequality ≤a and the equality =a\;\!. Particular attention is accorded to criteria with no commutation assumption between and \;\!, in order to be used to prove inequality and equality criteria for operator valued weights. Concerning operator valued weights, it is proved that if E1\;\! ,E2 are semi-finite, normal operator valued weights from a von Neumann algebra M to a von Neumann subalgebra N 1M and they are equal on ME1\;\!, then E2≤ E1\;\!. Moreover, it is shown that this happens if and only if for any (or, if E1\;\! ,E2 have equal supports, for some) faithful, semi-finite, normal weight θ on N the weights θ E2\;\! ,θ E1 coincide on Mθ E1\;\!.