Computation and Verification of Lyapunov Functions

Giesl, Peter; Hafstein, Sigurður

doi:10.1137/140988802

Cited by 44 publications

(25 citation statements)

References 28 publications

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“…In particular, one could start with a coarse set of collocation points and refine, where the conditions of a contraction metric are not fulfilled. A further improvement could include a posteriori estimates, that can be obtained by using Taylor-type estimates or by interpolating with a CPA function, similar to [10] and [9] for Lyapunov functions. To determine a positively invariant set, one could first seek to compute a Lyapunov function.…”

Section: Conclusion and Further Workmentioning

confidence: 99%

Computation of a Contraction Metric for a Periodic Orbit Using Meshfree Collocation

Giesl¹

2019

SIAM J. Appl. Dyn. Syst.

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Contraction analysis uses a local criterion to prove the long-term behaviour of a dynamical system. We consider a contraction metric, i.e. a Riemannian metric with respect to which the distance between adjacent solutions contracts. If adjacent solutions in all directions perpendicular to the flow are contracted, then there exists a unique periodic orbit, which is exponentially stable. In this paper we propose a construction method using meshfree collocation to approximately solve a matrix-valued PDE problem. We derive error estimates and show that the approximation is itself a contraction metric if the collocation points are sufficiently dense. We apply the method to several examples.

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Section: Conclusion and Further Workmentioning

confidence: 99%

Computation of a Contraction Metric for a Periodic Orbit Using Meshfree Collocation

Giesl¹

2019

SIAM J. Appl. Dyn. Syst.

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“…Contraction analysis can be used to study the distance between trajectories, without reference to an attractor, establishing (exponential) attraction of adjacent trajectories, see [28,24], see also [20,Section 2.10]; it can be generalised to the study of a Finsler-Lyapunov function [14].…”

Section: Matrix-valued Theorymentioning

confidence: 99%

Kernel-Based Discretization for Solving Matrix-Valued PDEs

Giesl¹,

Wendland²

2018

SIAM J. Numer. Anal.

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In this paper, we discuss the solution of certain matrix-valued partial differential equations. Such PDEs arise, for example, when constructing a Riemannian contraction metric for a dynamical system given by an autonomous ODE. We develop and analyse a new meshfree discretisation scheme using kernel-based approximation spaces. However, since these approximation spaces have now to be matrix-valued, the kernels we need to use are fourth order tensors. We will review and extend recent results on even more general reproducing kernel Hilbert spaces. We will then apply this general theory to solve a matrix-valued PDE and derive error estimates for the approximate solution. The paper ends with a typical example from dynamical systems.

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“…Computing a Lyapunov function analytically is usually not feasible for a nonlinear system, therefore a plethora of numerical methods has been developed. To name a few, a sum of squared (SOS) polynomials Lyapunov function can be parameterized by using semidefinite programming [2,6,30,31] or with different methods [23,32,33], an approximate solution to the Zubov equation [38] can be obtained using series expansion [33,38] or by using radial basis functions (RBF) [8], or linear programming can be used to parameterize a continuous and piecewise affine (CPA) Lyapunov function [11,15,21,22,28] or to verify a Lyapunov function candidate computed by other methods [5,12,18].…”

Section: Introductionmentioning

confidence: 99%