Home
Analysis and PDE
Analysis and PDE Seminar

Controllability of Shapes through Landmark Manifolds

Speaker: Sylvie Vega-Molino, Postdoc, Department of Mathematics, UiB

Controllability of Shapes through Landmark Manifolds
Photo:
DeepAI

Main content

Abstract: Landmark manifolds consist of distinct points that are often used to describe shapes. We show that in the Euclidean space, we can preselect two vector fields such that their flows will be able to take any n-landmark to another, regardless of the number of points n. This is a joint work with Erlend Grong.