On Geometric Properties of Triangularizations for Nonlinear Control Systems

Markus Schöberl; Kurt Schlacher

doi:10.1007/978-3-319-20988-3_13

On Geometric Properties of Triangularizations for Nonlinear Control Systems

Institut für Regelungstechnik

Publikation: Beitrag in Buch/Bericht/Konferenzband › Konferenzbeitrag › Begutachtung

Abstract

We consider triangular decompositions for nonlinear control systems. For systems that are exactly linearizable by static feedback it is well known that a triangular structure exists in adapted coordinates using the Frobenius theorem to straighten out a nested sequence of involutive distributions. This triangular form is based on explicit ordinary differential equations from which it can be easily seen that exactly linearizable systems are also flat. We will analyze this triangularization also from a dual perspective using a Pfaffian system representation. This point of view allows the introduction of a triangular form corresponding to implicit ordinary differential equations. For systems that are flat but not exactly linearizable by static feedback, this modified triangular form turns out to be useful in setting up a constructive algorithm to compute so-called 1-flat outputs.

Originalsprache	Englisch
Titel	Mathematical Control Theory I - Nonlinear and Hybrid Control Systems
Herausgeber*innen	M. Kanat Camlibel, Ramkrishna Pasumarthy, A. Agung Julius, Jacquelien M.A. Scherpen, Jacquelien M.A. Scherpen, M. Kanat Camlibel, A. Agung Julius, Ramkrishna Pasumarthy, A. Agung Julius, Ramkrishna Pasumarthy, Jacquelien M.A. Scherpen, M. Kanat Camlibel
Verlag	Springer International Publishing
Seiten	237-255
Seitenumfang	19
Band	461
ISBN (Print)	9783319209876, 9783319209876, 9783319209876
DOIs	https://doi.org/10.1007/978-3-319-20988-3_13
Publikationsstatus	Veröffentlicht - Aug. 2015

Publikationsreihe

Name	Lecture Notes in Control and Information Sciences
Band	461
ISSN (Print)	0170-8643

Wissenschaftszweige

202017 Embedded Systems
203015 Mechatronik
101028 Mathematische Modellierung
202 Elektrotechnik, Elektronik, Informationstechnik
202003 Automatisierungstechnik
202027 Mechatronik
202034 Regelungstechnik

JKU-Schwerpunkte

Mechatronics and Information Processing

Zugriff auf Dokument

10.1007/978-3-319-20988-3_13

Andere Dateien und Links

Verknüpfung zur Publikation in Scopus

Dieses zitieren

Schöberl, M., & Schlacher, K. (2015). On Geometric Properties of Triangularizations for Nonlinear Control Systems. in M. K. Camlibel, R. Pasumarthy, A. A. Julius, J. M. A. Scherpen, J. M. A. Scherpen, M. K. Camlibel, A. A. Julius, R. Pasumarthy, A. A. Julius, R. Pasumarthy, J. M. A. Scherpen, & M. K. Camlibel (Hrsg.), Mathematical Control Theory I - Nonlinear and Hybrid Control Systems (Band 461, S. 237-255). (Lecture Notes in Control and Information Sciences; Band 461). Springer International Publishing. https://doi.org/10.1007/978-3-319-20988-3_13

Schöberl, Markus ; Schlacher, Kurt. / On Geometric Properties of Triangularizations for Nonlinear Control Systems. Mathematical Control Theory I - Nonlinear and Hybrid Control Systems. Hrsg. / M. Kanat Camlibel ; Ramkrishna Pasumarthy ; A. Agung Julius ; Jacquelien M.A. Scherpen ; Jacquelien M.A. Scherpen ; M. Kanat Camlibel ; A. Agung Julius ; Ramkrishna Pasumarthy ; A. Agung Julius ; Ramkrishna Pasumarthy ; Jacquelien M.A. Scherpen ; M. Kanat Camlibel. Band 461 Springer International Publishing, 2015. S. 237-255 (Lecture Notes in Control and Information Sciences).

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title = "On Geometric Properties of Triangularizations for Nonlinear Control Systems",

abstract = "We consider triangular decompositions for nonlinear control systems. For systems that are exactly linearizable by static feedback it is well known that a triangular structure exists in adapted coordinates using the Frobenius theorem to straighten out a nested sequence of involutive distributions. This triangular form is based on explicit ordinary differential equations from which it can be easily seen that exactly linearizable systems are also flat. We will analyze this triangularization also from a dual perspective using a Pfaffian system representation. This point of view allows the introduction of a triangular form corresponding to implicit ordinary differential equations. For systems that are flat but not exactly linearizable by static feedback, this modified triangular form turns out to be useful in setting up a constructive algorithm to compute so-called 1-flat outputs.",

author = "Markus Sch{\"o}berl and Kurt Schlacher",

year = "2015",

month = aug,

doi = "10.1007/978-3-319-20988-3\_13",

language = "English",

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series = "Lecture Notes in Control and Information Sciences",

publisher = "Springer International Publishing",

pages = "237--255",

editor = "Camlibel, \{M. Kanat\} and Ramkrishna Pasumarthy and Julius, \{A. Agung\} and Scherpen, \{Jacquelien M.A.\} and Scherpen, \{Jacquelien M.A.\} and Camlibel, \{M. Kanat\} and Julius, \{A. Agung\} and Ramkrishna Pasumarthy and Julius, \{A. Agung\} and Ramkrishna Pasumarthy and Scherpen, \{Jacquelien M.A.\} and Camlibel, \{M. Kanat\}",

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Schöberl, M & Schlacher, K 2015, On Geometric Properties of Triangularizations for Nonlinear Control Systems. in MK Camlibel, R Pasumarthy, AA Julius, JMA Scherpen, JMA Scherpen, MK Camlibel, AA Julius, R Pasumarthy, AA Julius, R Pasumarthy, JMA Scherpen & MK Camlibel (Hrsg.), Mathematical Control Theory I - Nonlinear and Hybrid Control Systems. Bd. 461, Lecture Notes in Control and Information Sciences, Bd. 461, Springer International Publishing, S. 237-255. https://doi.org/10.1007/978-3-319-20988-3_13

On Geometric Properties of Triangularizations for Nonlinear Control Systems. / Schöberl, Markus ; Schlacher, Kurt.
Mathematical Control Theory I - Nonlinear and Hybrid Control Systems. Hrsg. / M. Kanat Camlibel; Ramkrishna Pasumarthy; A. Agung Julius; Jacquelien M.A. Scherpen; Jacquelien M.A. Scherpen; M. Kanat Camlibel; A. Agung Julius; Ramkrishna Pasumarthy; A. Agung Julius; Ramkrishna Pasumarthy; Jacquelien M.A. Scherpen; M. Kanat Camlibel. Band 461 Springer International Publishing, 2015. S. 237-255 (Lecture Notes in Control and Information Sciences; Band 461).

Publikation: Beitrag in Buch/Bericht/Konferenzband › Konferenzbeitrag › Begutachtung

TY - GEN

T1 - On Geometric Properties of Triangularizations for Nonlinear Control Systems

AU - Schöberl, Markus

AU - Schlacher, Kurt

PY - 2015/8

Y1 - 2015/8

N2 - We consider triangular decompositions for nonlinear control systems. For systems that are exactly linearizable by static feedback it is well known that a triangular structure exists in adapted coordinates using the Frobenius theorem to straighten out a nested sequence of involutive distributions. This triangular form is based on explicit ordinary differential equations from which it can be easily seen that exactly linearizable systems are also flat. We will analyze this triangularization also from a dual perspective using a Pfaffian system representation. This point of view allows the introduction of a triangular form corresponding to implicit ordinary differential equations. For systems that are flat but not exactly linearizable by static feedback, this modified triangular form turns out to be useful in setting up a constructive algorithm to compute so-called 1-flat outputs.

AB - We consider triangular decompositions for nonlinear control systems. For systems that are exactly linearizable by static feedback it is well known that a triangular structure exists in adapted coordinates using the Frobenius theorem to straighten out a nested sequence of involutive distributions. This triangular form is based on explicit ordinary differential equations from which it can be easily seen that exactly linearizable systems are also flat. We will analyze this triangularization also from a dual perspective using a Pfaffian system representation. This point of view allows the introduction of a triangular form corresponding to implicit ordinary differential equations. For systems that are flat but not exactly linearizable by static feedback, this modified triangular form turns out to be useful in setting up a constructive algorithm to compute so-called 1-flat outputs.

UR - https://www.scopus.com/pages/publications/84983516584

U2 - 10.1007/978-3-319-20988-3_13

DO - 10.1007/978-3-319-20988-3_13

M3 - Conference proceedings

SN - 9783319209876

VL - 461

T3 - Lecture Notes in Control and Information Sciences

SP - 237

EP - 255

BT - Mathematical Control Theory I - Nonlinear and Hybrid Control Systems

A2 - Camlibel, M. Kanat

A2 - Pasumarthy, Ramkrishna

A2 - Julius, A. Agung

A2 - Scherpen, Jacquelien M.A.

A2 - Camlibel, M. Kanat

A2 - Julius, A. Agung

A2 - Pasumarthy, Ramkrishna

A2 - Julius, A. Agung

A2 - Pasumarthy, Ramkrishna

A2 - Scherpen, Jacquelien M.A.

A2 - Camlibel, M. Kanat

PB - Springer International Publishing

ER -

Schöberl M , Schlacher K. On Geometric Properties of Triangularizations for Nonlinear Control Systems. in Camlibel MK, Pasumarthy R, Julius AA, Scherpen JMA, Scherpen JMA, Camlibel MK, Julius AA, Pasumarthy R, Julius AA, Pasumarthy R, Scherpen JMA, Camlibel MK, Hrsg., Mathematical Control Theory I - Nonlinear and Hybrid Control Systems. Band 461. Springer International Publishing. 2015. S. 237-255. (Lecture Notes in Control and Information Sciences). doi: 10.1007/978-3-319-20988-3_13