论文信息 - Exponential Size Lower Bounds for Some Depth Three Circuits

Exponential Size Lower Bounds for Some Depth Three Circuits

Exponential size lower bounds are obtained for some depth three circuits computing conjunction using one layer each of gates which compute Boolean functions of low total degree when expressed as polynomials, parity modulo-2 gates, and parity-modulo-q gates, where q is prime. One of these results implies a special case of the constant degree hypothesis of Barrington et al. The lower bounds are obtained from an algebraic characterization of the functions computed by the circuits: it is shown that certain integer multiples of these functions can be expressed as the sum of a lattice element and a function of small value. It is conjectured that this characterization can be used to resolve the constant degree hypothesis.

I. Parberry | P.Y. Yan

[1] Miklós Ajtai,et al. ∑11-Formulae on finite structures , 1983, Ann. Pure Appl. Log..

[2] Johan Håstad,et al. On the power of small-depth threshold circuits , 1990, Proceedings [1990] 31st Annual Symposium on Foundations of Computer Science.

[3] A. Razborov. Lower bounds on the size of bounded depth circuits over a complete basis with logical addition , 1987 .

[4] Johan Håstad,et al. Almost optimal lower bounds for small depth circuits , 1986, STOC '86.

[5] Andrew Chi-Chih Yao,et al. Separating the Polynomial-Time Hierarchy by Oracles (Preliminary Version) , 1985, FOCS.

[6] Michael Sipser,et al. Borel sets and circuit complexity , 1983, STOC.

[7] Georg Schnitger,et al. Relating Boltzmann machines to conventional models of computation , 1987, Neural Networks.

[8] Denis Thérien,et al. Non-Uniform Automata Over Groups , 1987, Inf. Comput..

[9] Pavel Pudlák,et al. Threshold circuits of bounded depth , 1987, 28th Annual Symposium on Foundations of Computer Science (sfcs 1987).

[10] Roman Smolensky,et al. Algebraic methods in the theory of lower bounds for Boolean circuit complexity , 1987, STOC.

[11] Andrew Chi-Chih Yao. Circuits and local computation , 1989, STOC '89.

[12] Ian Parberry,et al. Lower bound techniques in some parallel models of computation , 1989 .