Some Large Deviations Asymptotics in Small Noise Filtering Problems

We consider nonlinear filters for diffusion processes when the observation and signal noises are small and of the same order. As the noise intensities approach zero, the nonlinear filter can be approximated by a certain variational problem that is closely related to Mortensen’s optimization problem(1968). This approximation result can be made precise through a certain Laplace asymptotic formula. In this work we study probabilities of deviations of true filtering estimates from that obtained by solving the variational problem. Our main result gives a large deviation principle for Laplace functionals whose typical asymptotic behavior is described by Mortensen-type variational problems. Proofs rely on stochastic control representations for positive functionals of Brownian motions and Laplace asymptotics of the Kallianpur-Striebel formula.

[1]  G. B. Arous,et al.  Flow decomposition and large deviations , 1996 .

[2]  Mark H. A. Davis On a multiplicative functional transformation arising in nonlinear filtering theory , 1980 .

[3]  D. Stroock An Introduction to the Theory of Large Deviations , 1984 .

[4]  G. Kallianpur Stochastic Filtering Theory , 1980 .

[5]  G. Evensen,et al.  Data assimilation in the geosciences: An overview of methods, issues, and perspectives , 2017, WIREs Climate Change.

[6]  P. Krishnaprasad,et al.  Dynamic observers as asymptotic limits of recursive filters , 1982, 1982 21st IEEE Conference on Decision and Control.

[7]  P. Dupuis,et al.  Analysis and Approximation of Rare Events , 2019, Probability Theory and Stochastic Modelling.

[8]  A. Heunis NON-LINEAR FILTERING OF RARE EVENTS WITH LARGE SIGNAL-TO-NOISE RATIO , 1987 .

[9]  R. Mortensen Maximum-likelihood recursive nonlinear filtering , 1968 .

[10]  Asymptotic Bayesian Estimation of a First Order Equation with Small Diffusion , 1984 .

[11]  V. Maroulas,et al.  Large deviations for the optimal filter of nonlinear dynamical systems driven by Lévy noise , 2020 .

[12]  Mark H. A. Davis A Pathwise Solution of the Equations of Nonlinear Filtering , 1982 .

[13]  Large Deviation Principle for Optimal Filtering , 2003 .

[14]  P. Dupuis,et al.  A variational representation for certain functionals of Brownian motion , 1998 .

[15]  Ofer Zeitouni,et al.  Quenched Large Deviations for One Dimensional Nonlinear Filtering , 2004, SIAM J. Control. Optim..

[16]  H. Doss Un nouveau principe de grandes déviations en théorie du filtrage non linéaire , 1991 .

[17]  J. M. Clark The Design of Robust Approximations to the Stochastic Differential Equations of Nonlinear Filtering , 1978 .

[18]  M. James,et al.  Nonlinear filtering and large deviations:a pde-control theoretic approach , 1988 .

[19]  P. Dupuis,et al.  A VARIATIONAL REPRESENTATION FOR POSITIVE FUNCTIONALS OF INFINITE DIMENSIONAL BROWNIAN MOTION , 2000 .

[20]  V. Maroulas,et al.  Large deviations for optimal filtering with fractional Brownian motion , 2013 .