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Teoriya Veroyatnostei i ee Primeneniya, 1978, Volume 23, Issue 2, Pages 414–419
(Mi tvp3052)
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This article is cited in 156 scientific papers (total in 156 papers)
Short Communications
A method of second order accuracy integration of stochastic differential equations
G. N. Mil'šteĭn Sverdlovsk
Abstract:
For the stochastic differential equation
$$
dX=a(t,X)\,dt+\sigma(t,X)\,dw,\qquad X(t_0)=x,\ t_0\le t\le t_0+T,
$$
the problem of approximate calculation of the expectation $\mathbf Mf(X_{t_0,x}(t_0+T))$ is considered.
Rather a simple method is proposed for recursive modeling of random variables
$$
\overline X_{t_0,x}(t_k);\quad k=0,1,\dots;\quad t_k=t_0+kh;\quad h=\frac{T}{m};
$$
such that
$$
\mathbf Mf(X_{t_0,x}(t_0+T))=\mathbf Mf(\overline X_{t_0,x}(t_0+T))+O(h^2).
$$
Received: 09.06.1976
Citation:
G. N. Mil'šteǐn, “A method of second order accuracy integration of stochastic differential equations”, Teor. Veroyatnost. i Primenen., 23:2 (1978), 414–419; Theory Probab. Appl., 23:2 (1979), 396–401
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https://www.mathnet.ru/eng/tvp3052 https://www.mathnet.ru/eng/tvp/v23/i2/p414
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