화학공학소재연구정보센터
International Journal of Control, Vol.93, No.9, 2177-2186, 2020
Finite dimensional estimation algebras with state dimension 3 and rank 2, Mitter conjecture
In this paper, we study the structure of finite dimensional estimation algebras with state dimension 3 and rank 2 arising from a nonlinear filtering system by using the theories of the Euler operator and under-determined partial differential equations. It is proved that if the estimation algebra contains a degree two polynomial, then the Wong omega-matrix must be a constant matrix. Moreover, all functions in the estimation algebra must be linear functions.