M
Mario Sigalotti
Researcher at University of Paris
Publications - 186
Citations - 2468
Mario Sigalotti is an academic researcher from University of Paris. The author has contributed to research in topics: Controllability & Exponential stability. The author has an hindex of 25, co-authored 180 publications receiving 2082 citations. Previous affiliations of Mario Sigalotti include Université Paris-Saclay & French Institute for Research in Computer Science and Automation.
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Controllability of the discrete-spectrum Schrödinger equation driven by an external field
TL;DR: In this paper, the authors prove approximate controllability of the bilinear Schrodinger equation in the case of the uncontrolled Hamiltonian having a discrete non-resonant spectrum.
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A Gauss-Bonnet-like formula on two-dimensional almost-Riemannian manifolds
TL;DR: In this article, a generalization of Riemannian geometry that naturally arises in the framework of control theory is considered, in particular those which concern the correlation between curvature, presence of conjugate points, and the topology of the manifold.
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A weak spectral condition for the controllability of the bilinear Schrödinger equation with application to the control of a rotating planar molecule
Ugo Boscain,Ugo Boscain,Ugo Boscain,Marco Caponigro,Thomas Chambrion,Thomas Chambrion,Mario Sigalotti +6 more
TL;DR: In this article, the authors prove an approximate controllability result for the bilinear Schrodinger equation for the problem of controlling the rotation of a bipolar rigid molecule confined on a plane by means of two orthogonal external fields.
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A Gauss-Bonnet-like Formula on Two-Dimensional Almost-Riemannian Manifolds
TL;DR: In this paper, a generalization of Riemannian geometry that naturally arises in the framework of control theory is considered, in particular for what concerns the relation between curvature, presence of conjugate points, and topology of the manifold.
Journal ArticleDOI
Adiabatic Control of the Schrödinger Equation via Conical Intersections of the Eigenvalues
TL;DR: This paper presents a constructive method to control the bilinear Schrödinger equation via two controls based on adiabatic techniques and works if the spectrum of the Hamiltonian admits eigenvalue intersections, and if the latter are conical.