J
Juliette Leblond
Researcher at French Institute for Research in Computer Science and Automation
Publications - 59
Citations - 1308
Juliette Leblond is an academic researcher from French Institute for Research in Computer Science and Automation. The author has contributed to research in topics: Hardy space & Inverse problem. The author has an hindex of 20, co-authored 58 publications receiving 1250 citations. Previous affiliations of Juliette Leblond include APICS.
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Journal ArticleDOI
Shortest paths of bounded curvature in the plane
TL;DR: This work proposes a new solution to the problem of determining the shortest paths of bounded curvature joining two oriented points in the plane based on the minimum principle of Pontryagin.
Book ChapterDOI
Shortest paths of bounded curvature in the plane
TL;DR: Given two oriented points in the plane, the authors determine and compute the shortest paths of bounded curvature joining them and propose a solution based on the minimum principle of Pontryagin.
A note on shortest paths in the plane subject to a constraint on the derivative of the curvature
TL;DR: This work considers the class of C 2 , piecewise C 3 , planar paths joining two given conngurations (position, orientation, and curvature) X 0 and X f, and along which the derivative of the curvature remains bounded.
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Logarithmic stability estimates for a Robin coefficient in two-dimensional Laplace inverse problems
TL;DR: In this article, the authors established some global stability results together with logarithmic estimates in Sobolev norms for the inverse problem of recovering a Robin coefficient on part of the boundary of a smooth 2D domain from overdetermined measurements on the complementary part of a solution to the Laplace equation in the domain, using tools from analytic function theory.
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Recovery of pointwise sources or small inclusions in 2D domains and rational approximation
TL;DR: In this article, the inverse problems of locating pointwise or small size conductivity defaults in a plane domain, from overdetermined boundary measurements of solutions to the Laplace equation, are considered.