DocumentCode
2932571
Title
Upper and lower bounds for some depth-3 circuit classes
Author
Beigel, Richard ; Maciel, Alexis
Author_Institution
Dept. of Comput. Sci., Maryland Univ., College Park, MD, USA
fYear
1997
fDate
24-27 Jun 1997
Firstpage
149
Lastpage
157
Abstract
We investigate the complexity of depth-3 threshold circuits with majority gates at the output, possibly negated AND gates at level two, and MODm gates at level one. We show that the fan-in of the AND gates can be reduced to O(log n) in the case where m is unbounded, and to a constant in the case where m is constant. We then use these upper bounds to derive exponential lower bounds for this class of circuits. In the unbounded m case, this yields a new proof of a lower bound of Grolmusz; in the constant m case, our result sharpens his lower bound. In addition, we prove an exponential lower bound if OR gates are also permitted on level two and m is a constant prime power
Keywords
computational complexity; logic design; logic gates; AND gates; complexity; depth-3 circuit classes; lower bounds; majority gates; negated AND gates; threshold circuits; upper bounds; Circuits; Computer science; Educational institutions; Laboratories; NASA; Polynomials; Upper bound;
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.1997.612310
Filename
612310
Link To Document