Elastic Splines I: Existence

Abstract

Given interpolation points P1,P2,…,Pn in the plane, it is known that there does not exist an interpolating curve with minimal bending energy, unless the given points lie sequentially along a line. We say than an interpolating curve is admissable if each piece, connecting two consecutive points Pi and Pi+1, is an s-curve, where an s-curve is a planar curve which first turns at most 180 in one direction and then turns at most 180 in the opposite direction. Our main result is that among all admissable interpolating curves there exists a curve with minimal bending energy. We also prove, in a very constructive manner, the existence of an s-curve, with minimal bending energy, which connects two given unit tangent vectors.