The present tutorial paper constitutes the second of a series of tutorials on manifold calculus with applications in system theory and control. The aim of the present tutorial, in particular, is to explain and illustrate some key concepts in manifold calculus such as covariant derivation and manifold curvature. Such key concepts are then applied to the formulation, to the control, and to the analysis of non-linear dynamical systems whose state-space are smooth (Riemannian) manifolds. The main flow of exposition is enriched by a number of examples whose aim is to clarify the notation used and the main theoretical findings through practical calculations
Linear as well as non-linear mathematical systems that exhibit an oscillatory behavior are ubiquitou...
The understanding of the long term behavior of solutions of nonlinear evolu-tionary systems is of gr...
This textbook demonstrates how differential calculus, smooth manifolds, and commutative algebra cons...
The present tutorial paper constitutes the second of a series of tutorials on manifold calculus with...
The aim of the present tutorial paper is to recall notions from manifold calculus and to illustrate ...
The aim of the present tutorial paper is to recall notions from manifold calculus and to illustrate ...
This paper outlines possible extensions of a classical proportional-integral-derivative (PID) scheme...
Abstract. Methods are presented for locally studying smooth nonlinear control systems on the manifol...
These lecture notce introduce some basic concepts concerning smooth manifolds and Lie groups, since ...
1.Introduction. LetM be a C ∞-manifold and TM the total space of the tangent bundle. A control syste...
Smooth manifolds are found everywhere: they appear in several branches of mathematics (beginning at ...
The objective of the paper is to contribute to the theory of error-based control systems on Riemanni...
MANIFOLDSIntroductionReview of topological conceptsSmooth manifoldsSmooth mapsTangent vectors and th...
A theoretical framework for the stabilization of control systems defined by a class of nonlinear dif...
Using recent characterisations of topologies of spaces of vector fields for gen-eral regularity clas...
Linear as well as non-linear mathematical systems that exhibit an oscillatory behavior are ubiquitou...
The understanding of the long term behavior of solutions of nonlinear evolu-tionary systems is of gr...
This textbook demonstrates how differential calculus, smooth manifolds, and commutative algebra cons...
The present tutorial paper constitutes the second of a series of tutorials on manifold calculus with...
The aim of the present tutorial paper is to recall notions from manifold calculus and to illustrate ...
The aim of the present tutorial paper is to recall notions from manifold calculus and to illustrate ...
This paper outlines possible extensions of a classical proportional-integral-derivative (PID) scheme...
Abstract. Methods are presented for locally studying smooth nonlinear control systems on the manifol...
These lecture notce introduce some basic concepts concerning smooth manifolds and Lie groups, since ...
1.Introduction. LetM be a C ∞-manifold and TM the total space of the tangent bundle. A control syste...
Smooth manifolds are found everywhere: they appear in several branches of mathematics (beginning at ...
The objective of the paper is to contribute to the theory of error-based control systems on Riemanni...
MANIFOLDSIntroductionReview of topological conceptsSmooth manifoldsSmooth mapsTangent vectors and th...
A theoretical framework for the stabilization of control systems defined by a class of nonlinear dif...
Using recent characterisations of topologies of spaces of vector fields for gen-eral regularity clas...
Linear as well as non-linear mathematical systems that exhibit an oscillatory behavior are ubiquitou...
The understanding of the long term behavior of solutions of nonlinear evolu-tionary systems is of gr...
This textbook demonstrates how differential calculus, smooth manifolds, and commutative algebra cons...