Title :
KD trees and Delaunay-based linear interpolation for function learning: a comparison to neural networks with error backpropagation
Author :
Gross, Eric M. ; Wagner, David
Author_Institution :
Manuf. Eng. Res. Center, Toshiba Corp., Yokohama, Japan
fDate :
11/1/1996 12:00:00 AM
Abstract :
We illustrate how a KD tree data structure with Delaunay triangulation can be used for function learning. The example function is the inverse kinematics of a three degree-of-freedom (DOF) robot. The result can subsequently be used for kinematic control. The KD tree is used to efficiently extract a set number of nearest neighbors to a query point. Delaunay triangulation provides a good criterion for constructing a continuous linear approximation to the true function from neighborhood points of the query. For comparison purposes we solve the same problem with a neural network trained with error backpropagation. We conclude that the KD/Delaunay approach, in comparison to neural networks, can potentially yield a massive reduction in training time and significantly improve function estimate performance
Keywords :
approximation theory; computational geometry; decision theory; interpolation; learning (artificial intelligence); mesh generation; robot kinematics; trees (mathematics); Delaunay triangulation; KD trees; continuous linear approximation; error backpropagation; function learning; inverse kinematics; linear interpolation; nearest neighbors; neural networks; query point; robot; Backpropagation; Data mining; Interpolation; Kinematics; Linear approximation; Nearest neighbor searches; Neural networks; Robots; Tree data structures; Yield estimation;
Journal_Title :
Control Systems Technology, IEEE Transactions on
