Higher weak derivatives and reflexive algebras of operators

TY - CHAP

T1 - Higher weak derivatives and reflexive algebras of operators

AU - Christensen, Erik

PY - 2016

Y1 - 2016

N2 - Let D be a self-adjoint operator on a Hilbert space H and x a bounded operator on H. We say that x is n times weakly D−differentiable, if for any pair of vectors ξ, η from H the function 〈eitDxe−itDξ, η〉 is n times differentiable. We give several characterizations of n times weak dif-ferentiability, among which, one is original. These results are used to show that for a von Neumann algebra M on H the algebra of n times weakly D−differentiable operators in M has a natural representation as a reflexive subalgebra of B(H ⊗ ℂ(n+1)).

AB - Let D be a self-adjoint operator on a Hilbert space H and x a bounded operator on H. We say that x is n times weakly D−differentiable, if for any pair of vectors ξ, η from H the function 〈eitDxe−itDξ, η〉 is n times differentiable. We give several characterizations of n times weak dif-ferentiability, among which, one is original. These results are used to show that for a von Neumann algebra M on H the algebra of n times weakly D−differentiable operators in M has a natural representation as a reflexive subalgebra of B(H ⊗ ℂ(n+1)).

UR - http://www.ams.org/books/conm/671/

M3 - Book chapter

SN - 978-1-4704-1948-6

T3 - Contemporary Mathematics

SP - 69

EP - 83

BT - Operator Algebras and Their Applications

A2 - Doran, Robert S.

A2 - Park, Efton

PB - American Mathematical Society

ER -