TITLE:
Localization of Unbounded Operators on Guichardet Spaces
AUTHORS:
Jihong Zhang, Caishi Wang, Lina Tian
KEYWORDS:
Stochastic Gradient Operator, Skorohod Integral Operator, Localization, Ex-Ponential Vector, Guichardet Spaces
JOURNAL NAME:
Journal of Applied Mathematics and Physics,
Vol.3 No.7,
June
30,
2015
ABSTRACT:
As stochastic gradient and Skorohod
integral operators, is an adjoint pair of
unbounded operators on Guichardet Spaces. In this paper, we define an adjoint
pair of operator , where with being the conditional expectation
operator. We show that (resp.) is essentially a kind of localization of the stochastic gradient
operators (resp. Skorohod integral operators δ). We examine that and satisfy a local CAR
(canonical ani-communication relation) and forms a mutually
orthogonal operator sequence although each is not a projection operator.
We find that is s-adapted operator
if and only if is s-adapted operator.
Finally we show application exponential vector formulation of QS calculus.