Title :
Topological gradient for a fourth order PDE and application to the detection of fine structures in 2D and 3D images
Author :
Drogoul, Audric ; Aubert, Gilles ; Auroux, Didier
Author_Institution :
LJAD, Univ. de Nice Sophia Antipolis, Nice, France
Abstract :
In this paper we describe a new variational approach for the detection of fine structures in an image (like filaments in 2D). This approach is based on the computation of the topological gradient associated to a cost function defined from a regularized version of the data (possibly noisy and / or blurred). We get this approximation by solving a fourth order PDE. The study of the topological sensitivity is made in the case of a crack. We give the numerical algorithm to compute this topological gradient and we illustrate our approach by giving several experimental results in 2D and 3D images.
Keywords :
approximation theory; gradient methods; image restoration; image segmentation; partial differential equations; topology; variational techniques; 2D images; 3D images; blurred data; cost function; fine structure detection; fourth-order PDE; noisy data; numerical algorithm; regularized data; topological gradient; topological sensitivity; variational approach; Calculus; Cost function; Image edge detection; Image segmentation; Noise measurement; Roads; Three-dimensional displays; Calculus of variations; Fine structures; Image segmentation; Object detection; Topological Gradient;
Conference_Titel :
Image Processing (ICIP), 2014 IEEE International Conference on
Conference_Location :
Paris
DOI :
10.1109/ICIP.2014.7025341
