Title :
Nonlinear dimensionality reduction for structural discovery in image processing
Author :
Floyd, David ; Cloutier, Robert ; Zigh, Teresa
Author_Institution :
Draper Lab., Cambridge, MA, USA
Abstract :
Nonlinear dimensionality reduction techniques are a thriving area of research in many fields, including pattern recognition, statistical learning, medical imaging, and statistics. This is largely driven by our need to collect, represent, manipulate, and understand high-dimensional data in practically all areas of science. Here we define “high-dimensional” to be where dimension d > 10, and in many applications d ≫ 10. In this paper we discuss several nonlinear dimensionality reduction techniques and compare their characteristics, with a focus on applications to improve tractability and provide low-dimensional structural discovery for image processing.
Keywords :
image processing; learning (artificial intelligence); pattern recognition; high-dimensional data; image processing; low-dimensional structural discovery; medical imaging; nonlinear dimensionality reduction techniques; pattern recognition; statistical learning; Eigenvalues and eigenfunctions; Image analysis; Laplace equations; Manifolds; Nonlinear distortion; Streaming media; Vectors; changed data; diffusion maps; generalization; kernel eigenmaps; temporal graph evolution; vector;
Conference_Titel :
Applied Imagery Pattern Recognition Workshop (AIPR): Sensing for Control and Augmentation, 2013 IEEE
Conference_Location :
Washington, DC
DOI :
10.1109/AIPR.2013.6749319
