Lower bounds for approximations by low degree polynomials over Z/sub m/

N. Alon, R. Beigel
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引用次数: 42

Abstract

We use a Ramsey-theoretic argument to obtain the first lower bounds for approximations over Z/sub m/ by nonlinear polynomials: (i) A degree-2 polynomial over Z/sub m/ (m odd) must differ from the parity function on at least a 1/2-1/2((log n)/sup /spl Omega/(1)/) fraction of all points in the Boolean n-cube. A degree-O(1) polynomial over Z/sub m/ (m odd) must differ from the parity function on at least a 1/2-o(1) fraction of all points in the Boolean n-cube. These nonapproximability results imply the first known lower bounds on the top fanin of MAJoMOD/sub m/oAND/sub O(1)/ circuits (i.e., circuits with a single majority-gate at the output node, MOD/sub m/-gates at the middle level, and constant-fanin AND-gates at the input level) that compute parity: (i) MAJoMOD/sub m/oAND/sub 2/ circuits that compute parity must have top fanin 2((log n)/sup /spl Omega/(1)/). (ii) Parity cannot be computed by MAJoMODmoAND/sub O(1)/ circuits with top fanin O(1). Similar results hold for the MOD/sub q/ function as well.
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Z/下标m/上的低次多项式近似的下界
我们使用ramsey理论论证来获得非线性多项式在Z/sub m/上近似的第一下界:(i)在Z/sub m/ (m奇数)上的2次多项式必须与奇偶函数至少在布尔n立方中所有点的1/2-1/2((log n)/sup /spl Omega/(1)/)分数上不同。在Z/下标m/ (m奇数)上的o(1)次多项式必须在布尔n立方中所有点的至少1/2-o(1)个分数上与奇偶校验函数不同。这些非近似性结果意味着计算奇偶性的MAJoMOD/sub m/oAND/sub O(1)/电路(即输出节点具有单个多数门,中间电平具有MOD/sub m/-门,输入电平具有恒定fanin and门的电路)的顶部fanin的第一个已知下界:(i)计算奇偶性的MAJoMOD/sub m/oAND/sub 2/电路必须具有顶部fanin 2((log n)/sup /spl Omega/(1)/)。(ii)通过MAJoMODmoAND/sub O(1)/ top fanin O(1)电路无法计算奇偶校验。类似的结果也适用于MOD/ subq /函数。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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