Title :
Width-bounded reducibility and binary search over complexity classes
Author :
Allender, Eric ; Wilson, Christopher
Author_Institution :
Dept. of Comput. Sci., Rutgers Univ., New Brunswick, NJ, USA
Abstract :
A notion of width-bounded reducibility is introduced. Width-bounded reducibility provides a circuit-based realization of Ruzzo-Simon-Tompa reducibility and allows that notion of reducibility to be generalized. It is shown that reductions of simultaneously restricted width and depth provide a characterization of binary search over complexity classes, as introduced by K. Wagner (1989) and S. Buss and L. Hay (1988). This allows the presentation of a circuit-based characterization of PNP[log]. Other results are presented that explore relationships among complexity classes, using width-bounded reductions as a tool
Keywords :
computational complexity; search problems; Ruzzo-Simon-Tompa reducibility; binary search; circuit-based realization; complexity classes; depth; width-bounded reducibility; Circuits; Complexity theory; Computer science; Information science; Routing; Turing machines; Wires;
Conference_Titel :
Structure in Complexity Theory Conference, 1990, Proceedings., Fifth Annual
Conference_Location :
Barcelona
Print_ISBN :
0-8186-6072-4
DOI :
10.1109/SCT.1990.113961
