On the power of number-theoretic operations with respect to counting

Proceedings of Structure in Complexity Theory. Tenth Annual IEEE Conference Pub Date : 1995-06-19 DOI:10.1109/SCT.1995.514868

U. Hertrampf, H. Vollmer, K. Wagner

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引用次数: 45

Abstract

We investigate function classes /sub f/ which are defined as the closure of P under the operation f and a set of known closure properties of P, e.g. summation over an exponential range. First, we examine operations f under which P is closed (i.e., /sub f/=P) in every relativization. We obtain the following complete characterization of these operations: P is closed under f in every relativization if and only if f is a finite sum of binomial coefficients over constants. Second, we characterize operations f with respect to their power in the counting context in the unrelativized case. For closure properties f of P, we have /sub f/= P. The other end of the range is marked by operations f for which /sub f/ corresponds to the counting hierarchy. We call these operations counting hard and give general criteria for hardness. For many operations f we show that /sub f/ corresponds to some subclass C of the counting hierarchy. This will then imply that P is closed under f if and only if UP=C; and on the other hand f is counting hard if and only if C contains the counting hierarchy.

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论数论运算与计数的关系

我们研究了函数类/下标f/，它们被定义为P在运算f下的闭包和一组已知的P的闭包性质，例如指数范围上的和。首先，我们检查在每个相对化中P是封闭的操作f(即/下标f/=P)。我们得到了这些运算的完整表征:当且仅当f是常数上的二项式系数的有限和时，P在每一个相对化中都是闭于f下的。其次，我们根据运算f在非相对情况下的计数能力来描述运算f。对于闭包属性f (P)，我们有/sub f/= P。范围的另一端由操作f标记，其中/sub f/对应于计数层次结构。我们称这些操作为硬计数，并给出硬度的一般标准。对于许多操作f，我们证明/下标f/对应于计数层次结构的某个子类C。这就意味着P在f下闭合当且仅当UP=C;另一方面，f很难计数当且仅当C包含计数层次结构。

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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Proceedings of Structure in Complexity Theory. Tenth Annual IEEE Conference

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