Michał Kisielewicz (1999)
Discussiones Mathematicae, Differential Inclusions, Control and Optimization
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The definition and some existence theorems for stochastic differential inclusion dZₜ ∈ F(Zₜ)dXₜ, where F and X are set valued stochastic processes, are given.
Michał Kisielewicz (1997)
Discussiones Mathematicae, Differential Inclusions, Control and Optimization
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The definition and some existence theorems for stochastic differential inclusions depending only on selections theorems are given.
M. Métivier, J. Pellaumail (1976)
Publications mathématiques et informatique de Rennes
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J. Gani (1966-1967)
Publications mathématiques et informatique de Rennes
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Fabio Bagarello (2006)
Banach Center Publications
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Sridharan, V., Kalyani, T.V. (2005)
APPS. Applied Sciences
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M. Métivier, J. Pellaumail (1977)
Publications mathématiques et informatique de Rennes
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Artstein, Zvi, Wets, Roger J.B. (1995)
Journal of Convex Analysis
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Micha Kisielewicz (2003)
Discussiones Mathematicae, Differential Inclusions, Control and Optimization
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The Girsanov's theorem is useful as well in the general theory of stochastic analysis as well in its applications. We show here that it can be also applied to the theory of stochastic differential inclusions. In particular, we obtain some special properties of sets of weak solutions to some type of these inclusions.
S.V. Azarina, Yu.E. Gliklikh (2007)
Discussiones Mathematicae, Differential Inclusions, Control and Optimization
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We introduce and investigate a new sort of stochastic differential inclusions on manifolds, given in terms of mean derivatives of a stochastic process, introduced by Nelson for the needs of the so called stochastic mechanics. This class of stochastic inclusions is ideologically the closest one to ordinary differential inclusions. For inclusions with forward mean derivatives on manifolds we prove some results on the existence of solutions.
Benoit Truong-Van, Truong Xuan Duc Ha (1997)
Discussiones Mathematicae, Differential Inclusions, Control and Optimization
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For the stochastic viability problem of the form dx(t) ∈ F(t,x(t))dt+g(t,x(t))dW(t), x(t) ∈ K(t), where K, F are set-valued maps which may have nonconvex values, g is a single-valued function, we establish the existence of solutions under the assumption that F and g possess Lipschitz property and satisfy some tangential conditions.
Ivo Vrkoč (1969)
Czechoslovak Mathematical Journal
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Michał Kisielewicz (2001)
Discussiones Mathematicae Probability and Statistics
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Some special selections theorems for stochastic set-valued integrals with respect to the Lebesgue measure are given.
Władysław Sosulski (2001)
Discussiones Mathematicae, Differential Inclusions, Control and Optimization
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We present the concepts of set-valued stochastic integrals in a plane and prove the existence of a solution to stochastic integral inclusions of the form
Z. Ivković, J. Vukmirović (1976)
Matematički Vesnik
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