English

Universal Algebraic Controllers and System Identification

Numerical Analysis 2020-01-31 v1 Numerical Analysis Systems and Control Systems and Control Operator Algebras Optimization and Control

Abstract

In this document, some structured operator approximation theoretical methods for system identification of nearly eventually periodic systems, are presented. Let Cn×m\mathbb{C}^{n\times m} denote the algebra of n×mn\times m complex matrices. Given ε>0\varepsilon>0, an arbitrary discrete-time dynamical system (Σ,T)(\Sigma,\mathcal{T}) with state-space Σ\Sigma contained in the finite dimensional Hilbert space Cn\mathbb{C}^n, whose state-transition map T:Σ×([0,)Z)Σ\mathcal{T}:\Sigma\times ([0,\infty)\cap \mathbb{Z})\to \Sigma is unknown or partially known, and needs to be determined based on some sampled data in a finite set Σ^={xt}1tmΣ\hat{\Sigma}=\{x_t\}_{1\leq t\leq m}\subset \Sigma according to the rule T(xt,1)=xt+1\mathcal{T}(x_t,1)=x_{t+1} for each 1tm11\leq t\leq m-1, and given xΣ^x\in \hat{\Sigma}. We study the solvability of the existence problems for two triples (p,A,φ)(p,A,\varphi) and (p,Aη,Φ)(p,A_\eta,\Phi) determined by a polynomial pC[z]p\in \mathbb{C}[z] with deg(p)m\deg(p)\leq m, a matrix root ACm×mA\in\mathbb{C}^{m\times m} and an approximate matrix root AηCr×rA_\eta\in\mathbb{C}^{r\times r} of p(z)=0p(z)=0 with rmr\leq m, two completely positive linear multiplicative maps φ:Cm×mCn×n\varphi:\mathbb{C}^{m\times m}\to \mathbb{C}^{n\times n} and Φ:Cr×rCn×n\Phi:\mathbb{C}^{r\times r}\to \mathbb{C}^{n\times n}, such that T(x,t)φ(At)xε\|\mathcal{T}(x,t)-\varphi(A^t)x\|\leq\varepsilon and Φ(Aηt)xφ(At)xε\|\Phi(A_\eta^t)x-\varphi(A^t)x\|\leq\varepsilon, for each integer t1t\geq 1 such that T(x,t)yε\|\mathcal{T}(x,t)-y\|\leq \varepsilon for some yΣ^y\in \hat{\Sigma}. Some numerical implementations of these techniques for the reduced-order predictive simulation of dynamical systems in continuum and quantum mechanics, are outlined.

Keywords

Cite

@article{arxiv.2001.11133,
  title  = {Universal Algebraic Controllers and System Identification},
  author = {Fredy Vides},
  journal= {arXiv preprint arXiv:2001.11133},
  year   = {2020}
}
R2 v1 2026-06-23T13:24:37.934Z