在一般图上使用凸松弛的带连通性约束的树形先验

Jan Stühmer, P. Schröder, D. Cremers
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引用次数: 53

摘要

在这项工作中,我们提出了一种基于有向图的二值标记的新方法,该方法将连接预先包含在图像分割中,在这种情况下是测地线最短路径树。具体来说,我们做出了两个贡献:首先,我们构建了一个测地线最短路径树,该树具有与图像数据和树中每条路径的弯曲能量相关的距离度量。其次,我们在分割模型中包含了一个连接性,它不仅可以分割单个细长结构,还可以分割整个连接的分支树。由于分割模型和连通性约束都是凸的,因此可以找到全局最优解。为此,我们将最近的一种用于连续凸优化的原始对偶算法推广到任意图结构。为了验证我们的方法,我们给出了血管造影和视网膜血管分割的医学成像数据的结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Tree Shape Priors with Connectivity Constraints Using Convex Relaxation on General Graphs
In this work we propose a novel method to include a connectivity prior into image segmentation that is based on a binary labeling of a directed graph, in this case a geodesic shortest path tree. Specifically we make two contributions: First, we construct a geodesic shortest path tree with a distance measure that is related to the image data and the bending energy of each path in the tree. Second, we include a connectivity prior in our segmentation model, that allows to segment not only a single elongated structure, but instead a whole connected branching tree. Because both our segmentation model and the connectivity constraint are convex a global optimal solution can be found. To this end, we generalize a recent primal-dual algorithm for continuous convex optimization to an arbitrary graph structure. To validate our method we present results on data from medical imaging in angiography and retinal blood vessel segmentation.
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