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Paper detail

Third order open mapping theorems and applications to the end-point map

This paper is devoted to a third order study of the end-point map in sub-Riemannian geometry. We first prove third order open mapping results for maps from a Banach space into a finite dimensional manifold. In a second step, we compute the third order term in the Taylor expansion of the end-point map and we specialize the abstract theory to the study of length-minimality of sub-Riemannian strictly singular curves. We conclude with the third order analysis of a specific strictly singular extremal that is not length-minimizing.

preprint2019arXivOpen access
Francesco BoarottoRoberto MontiFrancesco Palmurella
math.OCmath.CAmath.DG
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Francesco BoarottoRoberto MontiFrancesco Palmurella

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