Title :
The correlation between parity and quadratic polynomials mod 3
Author_Institution :
Dept. of Math. & Comput. Sci., Clark Univ., Worcester, MA, USA
fDate :
6/24/1905 12:00:00 AM
Abstract :
We prove exponentially small upper bounds on the correlation between parity and quadratic polynomials mod 3. One corollary of this is that in order to compute parity, circuits consisting of a threshold gate at the top, mod 3 gates in the middle, and AND gates of fan-in two at the inputs must be of size 2Ω(n). This is the first result of this type for general mod subcircuits with ANDs of fan-in greater than 1. This yields an exponential improvement over a recent result of Alon and Beigel (2001). The proof uses a novel inductive estimate of the relevant exponential sums introduced by Cai et al. (1996). The exponential sum bounds are tight
Keywords :
circuit complexity; logic gates; polynomials; AND gates; circuits; exponential sum bounds; exponential sums; exponentially small upper bounds; fan-in; general mod subcircuits; inductive estimate; mod 3 gates; parity; quadratic polynomials mod 3; threshold gate; Bismuth; Circuit simulation; Computer science; Frequency selective surfaces; Mathematics; Mercury (metals); Polynomials; Upper bound;
Conference_Titel :
Computational Complexity, 2002. Proceedings. 17th IEEE Annual Conference on
Conference_Location :
Montreal, Que.
Print_ISBN :
0-7695-1468-5
DOI :
10.1109/CCC.2002.1004341
