On Asymptotic Behavior of Stochastic Differential Equation Solutions in Multidimensional Space
Abstract
Consider the multidimensional SDE d X(t) = a(X(t)) d t + b(X(t)) d W(t). We study the asymptotic behavior of its solution X(t) as t ∞, namely, we study sufficient conditions of transience of its solution X(t), stabilization of its multidimensional angle X(t)/|X(t)|, and asymptotic equivalence of solutions of the given SDE and the following ODE without noise: d x(t) = a(x(t)) d t.
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