Aiming at enlarging the class of symmetries of an SDE, we introduce a family of stochastic transformations able to change also the underlying probability measure exploiting Girsanov Theorem and we provide new determining equations for the infinitesimal symmetries of the SDE. The well-defined subset of the previous class of measure transformations given by Doob transformations allows us to recover all the Lie point symmetries of the Kolmogorov equation associated with the SDE. This gives the first stochastic interpretation of all the deterministic symmetries of the Kolmogorov equation. The general theory is applied to some relevant stochastic models
In this paper, we give a survey of results obtained over the past ten years on the path-independence...
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International audienceA diffusion process with smooth and nondegenerate elliptic infinitesimal gener...
The main aim of the thesis is a systematic application (via suitable generalizations) of Lie symmetr...
We study the invariance of stochastic differential equations under random diffeomorphisms and establ...
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We discuss W-symmetries of Ito stochastic differential equations, introduced in a recent paper by Ga...
In the deterministic realm, both differential equations and symmetry generators are geometrical obje...
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International audienceThe problem of extending state-feedback linearization methods of deterministic...
De nombreux phénomènes peuvent être modélisés par des processus stochastiques ou des pseudo-processu...
The mixture of Wiener and a Poisson processes are the primary tools used in creating jump-diffusion ...
Nesta tese, estudamos equações diferenciais estocásticas, sob o ponto de vista da teoria das simetri...
I will sketchily illustrate how the theory of symmetry helps in determining solutions of (determinis...
In this paper, we give a survey of results obtained over the past ten years on the path-independence...
We prove existence of invariant measures for the Markovian semigroup generated by the solution to a ...
International audienceA diffusion process with smooth and nondegenerate elliptic infinitesimal gener...
The main aim of the thesis is a systematic application (via suitable generalizations) of Lie symmetr...
We study the invariance of stochastic differential equations under random diffeomorphisms and establ...
Stochastic symmetries and related invariance properties of \ufb01nite dimensional SDEs driven by gen...
A new notion of stochastic transformation is proposed and applied to the study of both weak and stro...
We discuss W-symmetries of Ito stochastic differential equations, introduced in a recent paper by Ga...
In the deterministic realm, both differential equations and symmetry generators are geometrical obje...
A geometric reformulation of the martingale problem associated with a set of diffusion processes is ...
International audienceThe problem of extending state-feedback linearization methods of deterministic...
De nombreux phénomènes peuvent être modélisés par des processus stochastiques ou des pseudo-processu...
The mixture of Wiener and a Poisson processes are the primary tools used in creating jump-diffusion ...
Nesta tese, estudamos equações diferenciais estocásticas, sob o ponto de vista da teoria das simetri...
I will sketchily illustrate how the theory of symmetry helps in determining solutions of (determinis...
In this paper, we give a survey of results obtained over the past ten years on the path-independence...
We prove existence of invariant measures for the Markovian semigroup generated by the solution to a ...
International audienceA diffusion process with smooth and nondegenerate elliptic infinitesimal gener...