Abstract
For i.i.d. data $(x_i, y_i)$, in which both $x$ and $y$ lie on a sphere, we consider flexible (non-rigid) regression models, in which solutions can be obtained for each location of the manifold, with (local) weights which are function of distance. By considering terms in a series expansion, a ``local linear'' model is proposed for rotations, and we explore an iterative procedure with connections to boosting. Further extensions to general shape matching are discussed.