DocumentCode
2844011
Title
Modeling of symbolic systems: Part II - Hilbert space construction for model identification and order reduction
Author
Yicheng Wen ; Ray, A. ; Chattopadhyay, I. ; Phoha, S.
Author_Institution
Pennsylvania State Univ., University Park, PA, USA
fYear
2011
fDate
June 29 2011-July 1 2011
Firstpage
5139
Lastpage
5144
Abstract
This paper, which is the second of two parts, is built upon the vector space of symbolic systems represented by probabilistic finite State automata (PFSA) reported in the first part. This second part addresses the Hilbert space construction for model identification, where order reduction is achieved via orthogonal projection. To this end, a family of inner products is constructed and the norm induced by an inner product is interpreted as a measure of information contained in the PFSA, which also quantifies the error due to model order reduction. A numerical example elucidates the process of model order reduction by orthogonal projection from the space of PFSA onto a subspace that belongs to the class of shifts of finite type.
Keywords
Hilbert spaces; finite state machines; probabilistic automata; reduced order systems; Hilbert space construction; PFSA; model identification; order reduction; orthogonal projection; probabilistic finite state automata; symbolic systems; vector space; Hilbert space; Manganese; Markov processes; Mathematical model; Numerical models; Probabilistic logic; White noise;
fLanguage
English
Publisher
ieee
Conference_Titel
American Control Conference (ACC), 2011
Conference_Location
San Francisco, CA
ISSN
0743-1619
Print_ISBN
978-1-4577-0080-4
Type
conf
DOI
10.1109/ACC.2011.5990620
Filename
5990620
Link To Document