# Subject description - XP35NES1

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XP35NES1 Nonlinear systems
Roles:S, PV Extent of teaching:2P+2C
Department:13135 Language of teaching:CS
Guarantors:Čelikovský S. Completion:ZK
Lecturers:Čelikovský S. Credits:4
Tutors:Čelikovský S. Semester:

Anotation:

The goal of this course is to help student develop a deeper and broader perspective on theory and applications of nonlinear systems. At the hearth of the course will be the so-called differential-geometric approach, which can be used for controllability and observability analysis of nonlinear systems, characterization of various types of exact feedback linearization and many other tasks. Great attention is paid to analysis of the structure of nonlinear systems from the perspective of control design. It follows from the state description of nonlinear systems and uses state transformations of the nonlinear model into a simpler form that is usable for control design. Differential-geometric conditions for existence of these transformations are studied in this course. Concepts of nonlinear controllability and observability are introduced in this course and their relation to stabilization and reconstruction is analyzed because it is not as clear as for linear systems. Some additional topics such nonsmooth stabilization and discontinuous stabilization will be covered. Examples of use of the presented theories in underactuated robotic walking, nonholonomic systems and optimization of biosystems will be given.

Content:

The goal of this course is to help student develop a deeper and broader perspective on theory and applications of nonlinear systems. At the hearth of the course will be the so-called differential-geometric approach, which can be used for controllability and observability analysis of nonlinear systems, characterization of various types of exact feedback linearization and many other tasks. Great attention is paid to analysis of the structure of nonlinear systems from the perspective of control design. It follows from the state description of nonlinear systems and uses state transformations of the nonlinear model into a simpler form that is usable for control design. Differential-geometric conditions for existence of these transformations are studied in this course. Concepts of nonlinear controllability and observability are introduced in this course and their relation to stabilization and reconstruction is analyzed because it is not as clear as for linear systems. Some additional topics such nonsmooth stabilization and discontinuous stabilization will be covered. Examples of use of the presented theories in underactuated robotic walking, nonholonomic systems and optimization of biosystems will be given.

Course outlines:

Mathematical foundations: vector fields, Lie derivative of a function with respect to a vector field, Lie bracket, Lie algebras and their properties. Controllability of nonlinear systems. Reachability, strong reachability, controllability, global controllability, local controllability, small-time local controllability and local-local controllability. Lie algebra of reachability and strong reachability. Conditions for various types of reachability and controllability and the properties of Lie algebras of reachability and strong reachability. Observability of nonlinear systems. Definitions of observability and its shortcomings in the nonlinear case. Algebra of observability and conditions of observability. Nonlinear canonical form of observability. Conditions for transformation of a nonlinear system into this form. Nonlinear observer canonical form. Conditions for transformation of a nonlinear system into this form. Necessary and sufficient conditions for exact feedback linearization, Relative degree of a nonlinear system with a single input and a single output and its vector version for systems with multiple inputs and multiple outputs. The problem of choosing an "auxiliary" linearizing output for exact feedback linearization. Distribution, its involutivity and integrability, Frobenius theorem. Using Frobenius theorem for determining necessary conditions of exact feedback linearization. Differential forms, exact differential forms, their relation with involutive distributions and use for search for an "auxiliary" linearizing output. Other open problems of theory of nonlinear control and examples of use. Nonsmooth and discontinous stabilization of nonlinear systems. Brockett condition of smooth and continuous stabilization. Controllability vs. stabilizatility for nonlinear systems. Nonholonomic systems, their controllability and stabilizability Using partial exact linearization for control of underactuated mechanical systems. The problem of walking robots. Optimal control of nonlinear systems. Pontryagin principle of maximum for the problem with a free right end. An application to the optimal production of algae.

Exercises outline:

Literature:

Compulsory literature:
 H. K. Khalil, Nonlinear Systems. Third edition. Prentice Hall 2002. ISBN-13: 978-0130673893 A. Isidori. Nonlinear Systems: Third Edition, Springer Verlag, Heidelberg, 1995. ISBN 978-1-4471-0549-7
Recommended literature:
 M. Vidyasagar, Nonlinear Systems Analysis, Second Edition. SIAM Classics in Applied Mathematiacs 42. SIAM 2002. ISBN 0-89871-526-1. R. Marino and P. Tomei: Nonlinear Control Design. Geometric, Adaptive and Robust Approach, Prentice Hall, Englewood Cli_s, NJ 1995. ISBN 0-13-342635-1

Requirements:

Subject is included into these academic programs:

 Program Branch Role Recommended semester DOKP Common courses S – DOKK Common courses S – DKYR_2020 Common courses PV –

 Page updated 24.7.2024 11:51:41, semester: Z,L/2024-5, Z,L/2023-4, Send comments about the content to the Administrators of the Academic Programs Proposal and Realization: I. Halaška (K336), J. Novák (K336)