由非、CNOT、2-CNOT栅极和少量附加输入组成的可逆电路的合成

IF 0.3 Q4 MATHEMATICS, APPLIED
D. Zakablukov
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引用次数: 0

摘要

摘要考虑了由NOT、CNOT和2-CNOT门组成的具有少量附加输入的可逆电路。对于这样一个实现映射f:Z2n的电路→Z2n,$f\colon\mathbb Z_2^n\to\mathbb Z_2^n,$我们研究了在附加输入数为q=O(n2)的条件下的Shannon复杂度函数L(n,q)。对于这个范围的q,证明了L(n,q)≍n2n/log2n$L(n,q→∞和n/ξ(n)−log2n→∞asn→∞. $\phi(n)\to\infty{\text{and}}\,n\mathop/\phi(n)-\log_2 n\to\infty \,{\ttext{as}}\,n\to \infty$
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On synthesis of reversible circuits consisting of NOT, CNOT, 2-CNOT gates with small number of additional inputs
Abstract Reversible circuits consisting of NOT, CNOT and 2-CNOT gates with small number of additional inputs are considered. For such a circuit implementing a map f:Z2n→Z2n, $f\colon \mathbb Z_2^n \to \mathbb Z_2^n,$we study the Shannon complexity function L(n, q) under the condition that the number of additional inputs is q = O(n2). For this range of q, it is shown that L(n,q)≍n2n/log2n. $L(n,q) \asymp n2^n \mathop / \log_2 n.$We show that L(n,q)≍n2n/log2(n+q) $L(n,q) \asymp n2^n \mathop / \log_2 (n+q)$for all q≲n2n−⌈n/ϕ(n)⌉, $q \lesssim n2^{n-\lceil n \mathop / \phi(n)\rceil},$where ϕ(n)→∞andn/ϕ(n)−log2n→∞asn→∞. $\phi(n) \to \infty {\text {and}} \,n \mathop / \phi(n) - \log_2 n \to \infty \,{\text {as}}\, n \to \infty.$
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来源期刊
CiteScore
0.60
自引率
20.00%
发文量
29
期刊介绍: The aim of this journal is to provide the latest information on the development of discrete mathematics in the former USSR to a world-wide readership. The journal will contain papers from the Russian-language journal Diskretnaya Matematika, the only journal of the Russian Academy of Sciences devoted to this field of mathematics. Discrete Mathematics and Applications will cover various subjects in the fields such as combinatorial analysis, graph theory, functional systems theory, cryptology, coding, probabilistic problems of discrete mathematics, algorithms and their complexity, combinatorial and computational problems of number theory and of algebra.
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