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On weak approximations of (a, b)-invariant diffusions

✍ Scribed by Vigirdas Mackevičius

Publisher
Elsevier Science
Year
2007
Tongue
English
Weight
239 KB
Volume
74
Category
Article
ISSN
0378-4754

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✦ Synopsis

We consider scalar stochastic differential equations of the form

where B is a standard Brownian motion. Suppose that the coefficients are such that the solution X possesses the (a, b)-invariance b). The aim of this paper is constructing weak approximations of X that preserve the above property. The main idea is splitting the equation into two equations (deterministic and stochastic parts) d Xt = μ( Xt ) dt and Xt = σ( Xt ) dB t . If the exact solution of one of these equations is known, we use it as the initial condition for the approximate integration of the second one. Though the idea of splitting is not new and is rather widely used for 'domain-invariant' strong approximations, it seems to be not yet well developed for weak approximations.

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We prove uniqueness of "invariant measures," i.e., solutions to the equation L \* µ = 0 where L = ∆ + B • ∇ on R n with B satisfying some mild integrability conditions and µ being a probability measure on R n . This solves an open problem posed by S. R. S. Varadhan in 1980. The same conditions are s