THE RECOGNITION COMPLEXITY OF DECIDABLE THEORIES

IF 0.6 Q3 MATHEMATICS Eurasian Mathematical Journal Pub Date : 2019-07-10 DOI:10.32523/2077-9879-2022-13-1-44-68
I. V. Latkin
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引用次数: 1

Abstract

We will find a lower bound on the recognition complexity of the theories that are nontrivial relative to some equivalence relation (this relation may be equality), namely, each of these theories is consistent with the formula, whose sense is that there exist two non-equivalent elements. However, at first, we will obtain a lower bound on the computational complexity for the first-order theory of Boolean algebra that has only two elements. For this purpose, we will code the long-continued deterministic Turing machine computations by the relatively short-length quantified Boolean formulae; the modified Stockmeyer and Meyer method will appreciably be used for this simulation. Then, we will transform the modeling formulae of the theory of this Boolean algebra to the simulation ones of the first-order theory of the only equivalence relation in polynomial time. Since the computational complexity of these theories is not polynomial, we obtain that the class $\mathbf{P}$ is a proper subclass of $\mathbf{PSPACE}$ (Polynomial Time is a proper subset of Polynomial Space). Keywords: Computational complexity, the theory of equality, the coding of computations, simulation by means formulae, polynomial time, polynomial space, lower complexity bound
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可判定理论的识别复杂性
我们会发现,相对于某些等价关系(这种关系可能是相等的),非平凡理论的识别复杂性有一个下界,即这些理论中的每一个都与公式一致,其意义是存在两个非等价元素。然而,首先,我们将获得只有两个元素的布尔代数的一阶理论的计算复杂度的下界。为此,我们将通过相对较短长度的量化布尔公式对长连续的确定性图灵机计算进行编码;改进的Stockmeyer和Meyer方法将明显地用于该模拟。然后,我们将布尔代数理论的建模公式转换为多项式时间上唯一等价关系的一阶理论的模拟公式。由于这些理论的计算复杂度不是多项式,我们得到类$\mathbf{P}$是$\mathbf{PSPACE}$的适当子类(多项式时间是多项式空间的适当子集)。关键词:计算复杂性,等式理论,计算编码,通过公式模拟,多项式时间,多项式空间,复杂性下限
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来源期刊
CiteScore
1.70
自引率
50.00%
发文量
2
期刊介绍: Publication of carefully selected original re­search papers in all areas of mathematics written by mathematicians first of all from Europe and Asia. However papers by mathematicians from other continents are also welcome. From time to time Eurasian Mathematical Journal will also publish survey papers.
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