Title | Riemannian manifold learning |
Authors | Lin, Tong Zha, Hongbin |
Affiliation | Peking Univ, Sch EECS, Key Lab Machine Percept, Beijing 100871, Peoples R China. Peking Univ, Sch EECS, Key Lab Machine Percept, Sci Bldg, Beijing 100871, Peoples R China. |
Keywords | dimensionality reduction manifold learning manifold reconstruction Riemannian manifolds Riemannian normal coordinates NONLINEAR DIMENSIONALITY REDUCTION INTRINSIC DIMENSIONALITY DIFFUSION MAPS RECOGNITION FRAMEWORK EIGENMAPS DESIGN |
Issue Date | 2008 |
Publisher | ieee模式分析与机器智能汇刊 |
Citation | IEEE TRANSACTIONS ON PATTERN ANALYSIS AND MACHINE INTELLIGENCE.2008,30,(5),796-809. |
Abstract | Recently, manifold learning has been widely exploited in pattern recognition, data analysis, and machine learning. This paper presents a novel framework, called Riemannian manifold learning (RML), based on the assumption that the input high-dimensional data lie on an intrinsically low-dimensional Riemannian manifold. The main idea is to formulate the dimensionality reduction problem as a classical problem in Riemannian geometry, that is, how to construct coordinate charts for a given Riemannian manifold? We implement the Riemannian normal coordinate chart, which has been the most widely used in Riemannian geometry, for a set of unorganized data points. First, two input parameters (the neighborhood size k and the intrinsic dimension d) are estimated based on an efficient simplicial reconstruction of the underlying manifold. Then, the normal coordinates are computed to map the input high-dimensional data into a low-dimensional space. Experiments on synthetic data, as well as real-world images, demonstrate that our algorithm can learn intrinsic geometric structures of the data, preserve radial geodesic distances, and yield regular embeddings. |
URI | http://hdl.handle.net/20.500.11897/151884 |
ISSN | 0162-8828 |
DOI | 10.1109/TPAMI.2007.70735 |
Indexed | SCI(E) EI PubMed |
Appears in Collections: | 信息科学技术学院 机器感知与智能教育部重点实验室 |