Bicommutants and ranges of derivations

Abstract

Let V be a vector space over a field F, V* its dual space and L(V) the algebra of all linear operators on V. For an operator a∈ L(V) let a* be its adjoint acting on V*, and for a subset R of L(V) let R" be its bicommutant. If R is the subalgebra of L(V) generated by an operator a, we prove that the set Z:=b*: b∈ R" is contained in b*: b∈ R"; moreover Z is described. This inclusion is equality if V as a module over the polynomial algebra R=F[t] via t a is nice enough (say torsion, or injective, or if it contains a copy of R as a direct summand). Further, under the same assumption about V for any b∈ L(V), b∈(a)" if and only if the derivations da and db satisfy db(F(V))⊂eq da(F(V)), where F(V) is the set of all finite rank operators on V. The inclusion db(L(V))⊂eq da(L(V)) also holds under these conditions.