The psychological scaffolding of arithmetic.

IF 5.1 1区 心理学 Q1 PSYCHOLOGY
Psychological review Pub Date : 2024-03-01 Epub Date: 2023-06-26 DOI:10.1037/rev0000431
Matt Grice, Simon Kemp, Nicola J Morton, Randolph C Grace
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引用次数: 0

Abstract

Where does arithmetic come from, and why are addition and multiplication its fundamental operations? Although we know that arithmetic is true, no explanation that meets standards of scientific rigor is available from philosophy, mathematical logic, or the cognitive sciences. We propose a new approach based on the assumption that arithmetic has a biological origin: Many examples of adaptive behavior such as spatial navigation suggest that organisms can perform arithmetic-like operations on represented magnitudes. If so, these operations-nonsymbolic precursors of addition and multiplication-might be optimal due to evolution and thus identifiable according to an appropriate criterion. We frame this as a metamathematical question, and using an order-theoretic criterion, prove that four qualitative conditions-monotonicity, convexity, continuity, and isomorphism-are sufficient to identify addition and multiplication over the real numbers uniquely from the uncountably infinite class of possible operations. Our results show that numbers and algebraic structure emerge from purely qualitative conditions, and as a construction of arithmetic, provide a rigorous explanation for why addition and multiplication are its fundamental operations. We argue that these conditions are preverbal psychological intuitions or principles of perceptual organization that are biologically based and shape how humans and nonhumans alike perceive the world. This is a Kantian view and suggests that arithmetic need not be regarded as an immutable truth of the universe but rather as a natural consequence of our perception. Algebraic structure may be inherent in the representations of the world formed by our perceptual system. (PsycInfo Database Record (c) 2024 APA, all rights reserved).

算术的心理支架。
算术从何而来,为什么加法和乘法是算术的基本运算?尽管我们知道算术是真实的,但从哲学、数理逻辑或认知科学中却找不到符合科学严谨性标准的解释。我们基于算术起源于生物的假设,提出了一种新的方法:许多适应性行为(如空间导航)的例子表明,生物可以对所表示的大小进行类似算术的运算。如果是这样的话,这些运算--加法和乘法的非符号前身--可能是进化过程中的最佳运算,因此可以根据适当的标准进行识别。我们将此作为一个元数学问题,并使用阶序理论标准证明了四个定性条件--单调性、凸性、连续性和同构性--足以从不可计数的无限可能运算中唯一地识别出实数上的加法和乘法。我们的结果表明,数和代数结构产生于纯粹的定性条件,并且作为算术的一种构造,为为什么加法和乘法是其基本运算提供了严格的解释。我们认为,这些条件是前语言心理直觉或感知组织原则,它们以生物学为基础,塑造了人类和非人类感知世界的方式。这是一种康德式的观点,它表明不需要将算术视为宇宙永恒不变的真理,而应将其视为我们感知的自然结果。代数结构可能是我们的感知系统形成的世界表象所固有的。(PsycInfo Database Record (c) 2024 APA, 版权所有)。
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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来源期刊
Psychological review
Psychological review 医学-心理学
CiteScore
9.70
自引率
5.60%
发文量
97
期刊介绍: Psychological Review publishes articles that make important theoretical contributions to any area of scientific psychology, including systematic evaluation of alternative theories.
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