Title :
Circuits, matrices, and nonassociative computation
Author :
Beaudry, Martin ; Mckenzie, Pierre
Author_Institution :
Dept. de Math. et d´´Inf., Sherbrooke Univ., Que., Canada
Abstract :
It is shown that the formula and circuit evaluation problems in the nonassociative context capture natural complexity classes up to NP, thus extending the known result that the word problem over a groupoid is LOGCFL-complete. The problem of multiplying together matrices whose elements are taken from an algebraic structure more general than a semiring is defined and studied. It is shown that natural variants of this problem are complete for complexity classes such as NL, NCk , ACk, SCk, and NP. In particular, the iterated multiplication problems involving O(logk n) matrices over a structure (S; +,.) in which (S ; +) is a monoid or an aperiodic monoid are complete for NCk+1 and for ACk respectively, and an iterated multiplication problem variant involving matrices of size O(log k n) is complete for SCk
Keywords :
computational complexity; group theory; logic circuits; matrix algebra; ACk; LOGCFL-complete; NCk; NL; NP; SCk; algebraic structure; aperiodic monoid; groupoid; iterated multiplication; matrix multiplication; natural complexity classes; nonassociative computation; word problem; Algebra; Binary trees; Circuit simulation; Context modeling; Polynomials;
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.1992.215384
