Open AccessComparative Analysis of Kernel Methods for Statistical Shape Learning
Author(s) -
Yogesh Rathi,
Samuel Dambreville,
Allen Tannenbaum
Publication year - 2006
Publication title -
lecture notes in computer science
Language(s) - English
Resource type - Book series
SCImago Journal Rank - 0.249
H-Index - 400
eISSN - 1611-3349
pISSN - 0302-9743
ISBN - 3-540-46257-0
DOI - 10.1007/11889762_9
Subject(s) - computer science , shape analysis (program analysis) , heat kernel signature , embedding , artificial intelligence , active shape model , kernel (algebra) , pattern recognition (psychology) , segmentation , point distribution model , image segmentation , set (abstract data type) , mathematics , static analysis , combinatorics , programming language
Prior knowledge about shape may be quite important for image segmentation. In particular, a number of different methods have been proposed to compute the statistics on a set of training shapes, which are then used for a given image segmentation task to provide the shape prior. In this work, we perform a comparative analysis of shape learning techniques such as linear PCA, kernel PCA, locally linear embedding and propose a new method, kernelized locally linear embedding for doing shape analysis. The surfaces are represented as the zero level set of a signed distance function and shape learning is performed on the embeddings of these shapes. We carry out some experiments to see how well each of these methods can represent a shape, given the training set.
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