Transversally exponentially stable Euclidean space extension technique for discrete time systems
We propose a modification technique for discrete time systems for exponentially fast convergence to compact sets. The extension technique allows us to use tools defined on Euclidean spaces to systems evolving on manifolds by modifying the dynamics of the system such that the manifold is an attractor set. We show the stability properties of this technique using the simulation of the rigid body rotation system on the unit sphere $S^3$. We also show the improvement afforded due to this technique on a Luenberger like observer designed for the rigid body rotation system on $S^3$.
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