On Itô formulas for jump processes

Gyöngy, István; Wu, Sizhou

doi:10.1007/s11134-021-09709-8

Queueing Syst

2021

DOI: 10.1007/s11134-021-09709-8

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On Itô formulas for jump processes

István Gyöngy

Sizhou Wu

Abstract: A well-known Itô formula for finite-dimensional processes, given in terms of stochastic integrals with respect to Wiener processes and Poisson random measures, is revisited and is revised. The revised formula, which corresponds to the classical Itô formula for semimartingales with jumps, is then used to obtain a generalisation of an important infinite-dimensional Itô formula for continuous semimartingales from Krylov (Probab Theory Relat Fields 147:583–605, 2010) to a class of $$L_p$$ … Show more

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2023

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On partially observed jump diffusions II: the filtering density

Davie,

Germ,

Gyöngy

2023

Stoch PDE: Anal Comp

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A partially observed jump diffusion $$Z=(X_t,Y_t)_{t\in [0,T]}$$ Z = ( X t , Y t ) t ∈ [ 0 , T ] given by a stochastic differential equation driven by Wiener processes and Poisson martingale measures is considered when the coefficients of the equation satisfy appropriate Lipschitz and growth conditions. Under general conditions it is shown that the conditional density of the unobserved component $$X_t$$ X t given the observations $$(Y_s)_{s\in [0,t]}$$ ( Y s ) s ∈ [ 0 , t ] exists and belongs to $$L_p$$ L p if the conditional density of $$X_0$$ X 0 given $$Y_0$$ Y 0 exists and belongs to $$L_p$$ L p .

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On partially observed jump diffusions II: the filtering density

Davie,

Germ,

Gyöngy

2023

Stoch PDE: Anal Comp

View full text Add to dashboard Cite

show abstract

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On Itô formulas for jump processes

Cited by 1 publication

References 19 publications

On partially observed jump diffusions II: the filtering density

On partially observed jump diffusions II: the filtering density

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