DocumentCode
2933442
Title
Circuits and expressions with non-associative gates
Author
Berman, Joshua ; Drisko, Arthur ; Lemieu, F. ; Moore, Cristopher ; Thérien, Denis
Author_Institution
State Univ. of New York, Binghamton, NY, USA
fYear
1997
fDate
24-27 Jun 1997
Firstpage
193
Lastpage
203
Abstract
We consider circuits and expressions whose gates carry out multiplication in a non-associative groupoid such as loop. We define a class we call the polyabelian groupoids, formed by iterated quasidirect products of Abelian groups. We show that a loop can express arbitrary Boolean functions if and only if it is not polyabelian, in which case its EXPRESSION EVALUATION and CIRCUIT VALUE problems are NC1-complete and P-complete respectively. This is not true for groupoids in general, and we give a counter-example. We show that EXPRESSION EVALUATION is also NC1-complete if the groupoid has a non-solvable multiplication semigroup, but is in TC0 if the groupoid is both polyabelian and has a solvable multiplication semigroup. Thus, in the non-associative case, earlier results about the role of solvability in circuit complexity generalize in several different ways
Keywords
Boolean functions; computational complexity; CIRCUIT VALUE; EXPRESSION EVALUATION; NC1-complete; P-complete; arbitrary Boolean functions; multiplication; non-associative gates; non-associative groupoid; polyabelian groupoids; Boolean functions; Logic circuits; National security; Tree graphs;
fLanguage
English
Publisher
ieee
Conference_Titel
Computational Complexity, 1997. Proceedings., Twelfth Annual IEEE Conference on (Formerly: Structure in Complexity Theory Conference)
Conference_Location
Ulm
ISSN
1093-0159
Print_ISBN
0-8186-7907-7
Type
conf
DOI
10.1109/CCC.1997.612315
Filename
612315
Link To Document