Operator Lie Algebras of Rotations and Transformations in White Noise

Abstract

The infinitesimal generator of a one-parameter subgroup of the infinite dimensional rotation group associated with the complex Gelfand triple (E) ⊂ L2(E*, μ) ⊂ (E)* is of the form R = ∫T× T (s,t) (as* at - at* as) ds dt where ∈ E E* is a skew-symmetric distribution. Hence R is twice the conservation operator associated with a skew-symmetric operator S. The Lie algebra containing R, identity operator, annihilation operator, creation operator, number operator, (generalized) Gross Laplacian is discussed. We show that this Lie algebra is associated with the orbit of the skew-symmetric operator S.