Title :
Some lower and upper bounds for algebraic decision trees and the separation problem
Author_Institution :
Dept. of Math., Stat. & Comput. Sci., Illinois Univ., Chicago, IL, USA
Abstract :
The complexity of computing Boolean functions with algebraic decision trees over GF(2) and R is considered. Some lower and upper bounds for algebraic decision trees of various degrees are found. It is shown that over GF(2) decision trees of degree d are more powerful than trees of degree <d. For the case of decision trees over R, it is shown that decision trees of degree ⩾n/2-O(√n log O(1)n) are more powerful than trees of degree cn, with 0<c<1/2
Keywords :
Boolean functions; computational complexity; trees (mathematics); Boolean functions; GF(2) decision trees; algebraic decision trees; lower bounds; separation problem; upper bounds; Binary trees; Boolean functions; Classification tree analysis; Computer science; Decision trees; Input variables; Mathematics; Polynomials; Statistics; Upper bound;
Conference_Titel :
Structure in Complexity Theory Conference, 1992., Proceedings of the Seventh Annual
Conference_Location :
Boston, MA
Print_ISBN :
0-8186-2955-X
DOI :
10.1109/SCT.1992.215404
