Orthogonal Representations for Output System Pairs
Methodology
2019-11-19 v1 Systems and Control
Systems and Control
Statistics Theory
Statistics Theory
Abstract
A new class of canonical forms is given proposed in which is in Hessenberg observer or Schur form and output normal: . Here, is the measurement matrix and is the advance matrix. The stack is expressed as the product of orthogonal matrices, each of which depends on parameters. State updates require only operations and derivatives of the system with respect to the parameters are fast and convenient to compute. Restrictions are given such that these models are generically identifiable. Since the observability Grammian is the identity matrix, system identification is better conditioned than other classes of models with fast updates.
Cite
@article{arxiv.1803.06571,
title = {Orthogonal Representations for Output System Pairs},
author = {Andrew Mullhaupt and Kurt Riedel},
journal= {arXiv preprint arXiv:1803.06571},
year = {2019}
}
Comments
Work done in 200. Minor Revision 2001