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Critical time for the observability of Kolmogorov-type equations

This paper is devoted to the observability of a class of two-dimensional Kolmogorov-type equations presenting a quadratic degeneracy. We give lower and upper bounds for the critical time. These bounds coincide in symmetric settings, giving a sharp result in these cases. The proof is based on Carleman estimates and on the spectral properties of a family of non-selfadjoint Schrödinger operators, in particular the localization of the first eigenvalue and Agmon type estimates for the corresponding eigenfunctions.

preprint2020arXivOpen access
Jérémi DardéJulien Royer
math.APmath.OCmath.SP
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Jérémi DardéJulien Royer

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