Itō diffusion

In mathematics — specifically, in stochastic analysis — the Green measure is a measure associated to an Itō diffusion. There is an associated Green formula representing suitably smooth functions in terms of the Green measure and first exit times of the diffusion. The concepts are named after the British mathematician George Green and are generalizations of the classical Green's function and Green formula to the stochastic case using Dynkin's formula.

Notation

Let X be an Rⁿ-valued Itō diffusion satisfying an Itō stochastic differential equation of the form

${\displaystyle \mathrm{d}{X}_t=b(X_t)\mathrm{d}t+\sigma (X_t)\mathrm{d}{B}_t.}$

Let P^x denote the law of X given the initial condition X₀ = x, and let E^x denote expectation with respect to P^x. Let L_X be the infinitesimal generator of X, i.e.

${\displaystyle L_X=\sum _i{b}_i\frac{\partial }{\partial x_i}+\frac{1}{2}\sum _{i,j}(\sigma {\sigma }^{\mathrm{\top }}{)}_{i,j}\frac{{\partial }^2}{\partial x_i\partial x_j}.}$

Let D ⊆ Rⁿ be an open, bounded domain; let τ_D be the first exit time of X from D:

${\displaystyle {\tau }_D:=\inf \{t\ge 0|X_t\in ̸D\}.}$

The Green measure

Intuitively, the Green measure of a Borel set H (with respect to a point x and domain D) is the expected length of time that X, having started at x, stays in H before it leaves the domain D. That is, the Green measure of X with respect to D at x, denoted G(x, ·), is defined for Borel sets H ⊆ Rⁿ by

${\displaystyle G(x,H)={\mathbf{E}}^x[{\displaystyle \underset{0}{\overset{{\tau }_D}{\int }}}{\chi }_H(X_s)\mathrm{d}s],}$

or for bounded, continuous functions f : D → R by

${\displaystyle \underset{D}{\int }f(y)G(x,\mathrm{d}y)={\mathbf{E}}^x[{\displaystyle \underset{0}{\overset{{\tau }_D}{\int }}}f(X_s)\mathrm{d}s]}$

The name "Green measure" comes from the fact that if X is Brownian motion, then

${\displaystyle G(x,H)=\underset{H}{\int }G(x,y)\mathrm{d}y,}$

where G(x, y) is Green's function for the operator L_X (which, in the case of Brownian motion, is ½Δ, where Δ is the Laplace operator) on the domain D.

The Green formula

Suppose that E^x[τ_D] < +∞ for all x ∈ D, and let f : Rⁿ → R be of smoothness class C² with compact support. Then

${\displaystyle f(x)={\mathbf{E}}^x\left[f\right(X_{{\tau }_D}\left)\right]-\underset{D}{\int }{L}_{X}f(y)G(x,\mathrm{d}y).}$

In particular, for C² functions f with support compactly embedded in D,

${\displaystyle f(x)=-\underset{D}{\int }{L}_{X}f(y)G(x,\mathrm{d}y).}$

The proof of Green's formula is an easy application of Dynkin's formula and the definition of the Green measure:

${\displaystyle {\mathbf{E}}^x\left[f\right(X_{{\tau }_D}\left)\right]}$

${\displaystyle =f(x)+{\mathbf{E}}^x[{\displaystyle \underset{0}{\overset{{\tau }_D}{\int }}}{L}_{X}f(X_s)\mathrm{d}s]}$

${\displaystyle =f(x)+\underset{D}{\int }{L}_{X}f(y)G(x,\mathrm{d}y).}$

References

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