Infinite dimensional parameter identification for stochastic parabolic systems

This paper considers the problem of obtaining accurate estimates of multivariate systems with reasonable computations. To avoid the structural identification problem which is associated with multivariate systems, we observe the system by a linear combination of the outputs. The two stage least squar

When the observation process can be written as a Banach space-valued semimartingale form, we consider the statistical estimation of parameters occurring in it.

This paper studies the parameter identification problem of nonlinear abstract parabolic distributed parameter systems via variational method [1]. Based on the fundamental optimal control theory and the transposition method studied in [2], the existence of optimal parameter is proved, and the necessa

The identification of parameters in parabolic systems is formulated as a constrained minimization problem combining the output least squares and the equation error method. The minimization problem is then proved to be equivalent to the saddle-point problem of an augmented Lagrangian.