Title :
Classification trees with optimal multi-variate splits
Author :
Brown, Donald E. ; Pittard, Clarence Louis
Author_Institution :
Inst. for Parallel Comput., Virginia Univ., Charlottesville, VA, USA
Abstract :
Tree classifiers assign an observation to a class through a series of binary questions. This form of classification is very fast and easy to interpret. However, tree classifiers constructed using standard techniques, such as CART (classification and regression trees), have difficulties with multi-modal problems like the parity problem. In particular. CART produces a very inefficient tree for this class of problems, which can occur in a number of important applications. This paper examines the problems with CART and then presents a solution that yields trees that use the optimal multi-variate split at each node
Keywords :
decision theory; linear programming; pattern recognition; statistical analysis; trees (mathematics); CART; classification trees; linear programming; optimal multi-variate splits; regression trees; tree classifiers; Buildings; Classification algorithms; Classification tree analysis; Concurrent computing; Decision trees; Humans; Labeling; Partitioning algorithms; Sensor fusion; Systems engineering and theory;
Conference_Titel :
Systems, Man and Cybernetics, 1993. 'Systems Engineering in the Service of Humans', Conference Proceedings., International Conference on
Conference_Location :
Le Touquet
Print_ISBN :
0-7803-0911-1
DOI :
10.1109/ICSMC.1993.385057
