Global Minimum for Active Contour Models: A Minimal Path Approach

A new boundary detection approach for shape modeling is presented. It detects the global minimum of an active contour models energy between two end points. Initialization is made easier and the curve is not trapped at a local minimum by spurious edges. We modify the snake energy by including the internal regularization term in the external potential term. Our method is based on finding a path of minimal length in a Riemannian metric. We then make use of a new efficient numerical method to find this shortest path.It is shown that the proposed energy, though based only on a potential integrated along the curve, imposes a regularization effect like snakes. We explore the relation between the maximum curvature along the resulting contour and the potential generated from the image.The method is capable to close contours, given only one point on the objects' boundary by using a topology-based saddle search routine.We show examples of our method applied to real aerial and medical images.