Ornstein–Uhlenbeck operator

Not to be confused with Ornstein–Uhlenbeck process.

In mathematics, the Ornstein–Uhlenbeck operator is a generalization of the Laplace operator to an infinite-dimensional setting. The Ornstein–Uhlenbeck operator plays a significant role in the Malliavin calculus.

Introduction: the finite-dimensional picture

The Laplacian

Consider the gradient operator acting on scalar functions f : Rn  R; the gradient of a scalar function is a vector field v = f : Rn  Rn. The divergence operator div, acting on vector fields to produce scalar fields, is the adjoint operator to . The Laplace operator Δ is then the composition of the divergence and gradient operators:

\Delta = \mathrm{div} \circ \nabla,

acting on scalar functions to produce scalar functions. Note that A = Δ is a positive operator, whereas Δ is a dissipative operator.

Using spectral theory, one can define a square root (1  Δ)1/2 for the operator (1  Δ). This square root satisfies the following relation involving the Sobolev H1-norm and L2-norm for suitable scalar functions f:

\big\| f \big\|_{H^{1}}^{2} = \big\| (1 - \Delta)^{1/2} f \big\|_{L^{2}}^{2}.

The Ornstein–Uhlenbeck operator

Often, when working on Rn, one works with respect to Lebesgue measure, which has many nice properties. However, remember that the aim is to work in infinite-dimensional spaces, and it is a fact that there is no infinite-dimensional Lebesgue measure. Instead, if one is studying some separable Banach space E, what does make sense is a notion of Gaussian measure; in particular, the abstract Wiener space construction makes sense.

To get some intuition about what can be expected in the infinite-dimensional setting, consider standard Gaussian measure γn on Rn: for Borel subsets A of Rn,

\gamma^{n} (A) := \int_{A} (2 \pi)^{-n/2} \exp ( - | x |^{2} / 2) \, \mathrm{d} x.

This makes (Rn, B(Rn), γn) into a probability space; E will denote expectation with respect to γn.

The gradient operator acts on a (differentiable) function φ : Rn  R to give a vector field φ : Rn  Rn.

The divergence operator δ (to be more precise, δn, since it depends on the dimension) is now defined to be the adjoint of in the Hilbert space sense, in the Hilbert space L2(Rn, B(Rn), γn; R). In other words, δ acts on a vector field v : Rn  Rn to give a scalar function δv : Rn  R, and satisfies the formula

\mathbb{E} \big[ \nabla f \cdot v \big] = \mathbb{E} \big[ f \delta v \big].

On the left, the product is the pointwise Euclidean dot product of two vector fields; on the right, it is just the pointwise multiplication of two functions. Using integration by parts, one can check that δ acts on a vector field v with components vi, i = 1, ..., n, as follows:

\delta v (x) = \sum_{i = 1}^{n} \left( x_{i} v^{i} (x) - \frac{\partial v^{i}}{\partial x_{i}} (x) \right).

The change of notation from div to δ is for two reasons: first, δ is the notation used in infinite dimensions (the Malliavin calculus); secondly, δ is really the negative of the usual divergence.

The (finite-dimensional) Ornstein–Uhlenbeck operator L (or, to be more precise, Lm) is defined by

L := - \delta \circ \nabla,

with the useful formula that for any f and g smooth enough for all the terms to make sense,

\delta ( f \nabla g) = - \nabla f \cdot \nabla g - f L g.

The Ornstein–Uhlenbeck operator L is related to the usual Laplacian Δ by

L f (x) = \Delta f (x) - x \cdot \nabla f (x).

The Ornstein–Uhlenbeck operator for a separable Banach space

Consider now an abstract Wiener space E with Cameron-Martin Hilbert space H and Wiener measure γ. Let D denote the Malliavin derivative. The Malliavin derivative D is an unbounded operator from L2(E, γ; R) into L2(E, γ; H) in some sense, it measures how random a function on E is. The domain of D is not the whole of L2(E, γ; R), but is a dense linear subspace, the Watanabe-Sobolev space, often denoted by \mathbb{D}^{1,2} (once differentiable in the sense of Malliavin, with derivative in L2).

Again, δ is defined to be the adjoint of the gradient operator (in this case, the Malliavin derivative is playing the role of the gradient operator). The operator δ is also known the Skorokhod integral, which is an anticipating stochastic integral; it is this set-up that gives rise to the slogan stochastic integrals are divergences. δ satisfies the identity

\mathbb{E} \big[ \langle \mathrm{D} F, v \rangle_{H} \big] = \mathbb{E} \big[ F \delta v \big]

for all F in \mathbb{D}^{1,2} and v in the domain of δ.

Then the Ornstein–Uhlenbeck operator for E is the operator L defined by

L := - \delta \circ \mathrm{D}.

References

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