Title :
Parallel Projections for Manifold Learning
Author :
Strange, Harry ; Zwiggelaar, Reyer
Author_Institution :
Dept. of Comput. Sci., Aberystwyth Univ., Aberystwyth, UK
Abstract :
Manifold learning is a widely used statistical tool which reduces the dimensionality of a data set while aiming to maintain both local and global properties of the data. We present a novel manifold learning technique which aligns local hyper planes to build a global representation of the data. A Minimum Spanning Tree provides the skeleton needed to traverse the manifold so that the local hyper planes can be merged using parallel projections to build a global hyper plane of the data. We show state of the art results when compared against existing manifold learning algorithm on both artificial and real world image data.
Keywords :
data reduction; image processing; learning (artificial intelligence); statistical analysis; trees (mathematics); artificial image data; data set dimensionality; global data representation; global property; local hyper planes; local property; manifold learning algorithm; manifold learning technique; minimum spanning tree; parallel projections; real world image data; statistical tool; Kernel; Laplace equations; Manifolds; Principal component analysis; Projection algorithms; Strips; Video sequences; Dimensionality Reduction; Manifold Learning; Statistical Learning;
Conference_Titel :
Machine Learning and Applications (ICMLA), 2010 Ninth International Conference on
Conference_Location :
Washington, DC
Print_ISBN :
978-1-4244-9211-4
DOI :
10.1109/ICMLA.2010.54
