Titlebook: Geometric Control Theory and Sub-Riemannian Geometry; Gianna Stefani,Ugo Boscain,Mario Sigalotti Book 2014 Springer International Publishi

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https://doi.org/10.1007/978-3-8349-9494-3omposition for the solution of the equation, we can reduce the problem to the validity of a uniform observability inequality with respect to the Fourier frequency. Such an inequality is obtained by means of a suitable Carleman estimate, with an adapted spatial weight function. We thus show that null

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Zusammenfassung und Implikationen, the other, with the restrictions that they cannot instantaneously slip or spin one with respect to the other. On the way we show how this problem has profited from the development of intrinsic Riemannian geometry, from geometric control theory and sub-Riemannian geometry. We also mention how other

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Stellungnahme des Landesdenkmalpflegers,nifold with singular points. We first consider the case of a strongly equiregular submanifold, i. e., a smooth submanifold . for which the growth vector of the distribution . and the growth vector of the intersection of . with . are constant on .. In this case, we generalize the result in [.], which

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