Parameter estimation in nonlinear distributed systems-approximation theory and convergence results

• Published in: Applied mathematics letters Vol. 1; no. 3; pp. 211 - 216
• Main Authors: Banks, H.T., Reich, Simeon, Rosen, I.G.
• Format: Journal Article
• Language: English
• Published: Legacy CDMS Elsevier Ltd 1988
• Subjects: Numerical Analysis
• ISSN: 0893-9659; 1873-5452
• DOI: 10.1016/0893-9659(88)90077-8

An abstract approximation framework and convergence theory is described for Galerkin approximations applied to inverse problems involving nonlinear distributed parameter systems. Parameter estimation problems are considered and formulated as the minimization of a least-squares-like performance index over a compact admissible parameter set subject to state constraints given by an inhomogeneous nonlinear distributed system. The theory applies to systems whose dynamics can be described by either time-independent or nonstationary strongly maximal monotonic operators defined on a reflexive Banach space which is densely and continuously embedded in a Hilbert space. It is demonstrated that if readily verifiable conditions on the system's dependence on the unknown parameters are satisfied, and the usual Galerkin approximation assumption holds, then solutions to the approximating problems exist and approximate a solution to the original infinite-dimensional identification problem.