Open AccessInverse problems for linear ill-posed differential-algebraic equations with uncertain parameters
Author(s) -
Sergiy Zhuk
Publication year - 2011
Publication title -
conference publications
Language(s) - English
Resource type - Book series
DOI - 10.3934/proc.2011.2011.1467
Subject(s) - mathematics , matrix pencil , bounded function , minimax , duality (order theory) , algebraic number , differential algebraic equation , mathematical optimization , mathematical analysis , differential equation , ordinary differential equation , pure mathematics , eigenvalues and eigenvectors , physics , quantum mechanics
This paper describes a minimax state estimation approach for linear differential-algebraic equations (DAEs) with uncertain parameters. The approach addresses continuous-time DAEs with non-stationary rectangular matrices and uncertain bounded deterministic input. An observation’s noise is supposed to be random with zero mean and unknown bounded correlation function. Main result is a Generalized Kalman Duality (GKD) principle, describing a dual control problem. Main consequence of the GKD is an optimal minimax state estimation algorithm for DAEs with non-stationary rectangular matrices. An algorithm is illustrated by a numerical example for 2D timevarying DAE with a singular matrix pencil.
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