Parameter identifiability for partial differential equations

We investigate a general method for estimating numerical values for the parameters which occur in certain partial differential equations. The method uses direct approximations of the solution and selects parameters to match the differential equation. Several numerical examples are presented to illu

## Abstract In this paper we discuss a couple of situations, where algebraic equations are to be attached to a system of one‐dimensional partial differential equations. Besides of models leading directly to algebraic equations because of the underlying practical background, for example in case of s

The identification of parameters in partial differential equations from experimental output data is investigated. It is assumed that a physical process can be represented by a system of nonlinear hyperbolic or parabolic partial differential equations of known form but containing unknown parameters.

The sequential estimation of the states of a process described by a set of nonlinear hyperbolic or parabolic partial differential equations subject to both stochastic input disturbances and measurement errors is considered. A functional partial differential equation of Hamilton-Jacobi type is derive