用简单的频率和周期比率作为坐标的二维和弦表示

IF 0.5 2区 数学 Q4 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
I. Nemoto, M. Kawakatsu
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引用次数: 0

摘要

音乐的和弦起着至关重要的作用,特别是在西方音乐中,相应的和-不和谐音对比和情感连续仍然是心理声学和神经生理学研究的目标。在本研究中,我们定义了频率比的简洁性和周期比的简洁性,并提出这些措施应作为平面上绘制和弦的两个坐标轴。在这个平面上,大调和弦和小调和弦是对角线上彼此的反射。另一对具有相同关系的和弦是大小七度(属七度)和半降七度和弦。其他的三和弦和七和弦没有这样的不同类别的和弦对。研究还发现,至少在三和弦中,总和和差异似乎分别对应于主观和谐和忧郁/悲伤情绪评级。讨论了这些发现的意义。提出的简单表示可能有助于解释和模拟和弦的心理声学和神经生理学结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A two-dimensional representation of musical chords using the simplicity of frequency and period ratios as coordinates
Musical chords play an essential role, especially in Western music, and the corresponding consonance–dissonance contrasts and emotional continua are still the targets of investigation in psychoacoustics and neurophysiology. In the present study, we define the simplicity of frequency ratios and simplicity of period ratios for the constituents of a chord and propose that those measures should be used as the two coordinate axes in the plane for plotting chords. In this plane, the major and minor chords are reflections of each other with respect to the diagonal . The other chord pair in the same relationship is the major–minor seventh (dominant seventh) and the half-diminished seventh chords. The other triads and seventh chords do not make such pairs of different categories of chords. It was also found that at least for triads, the sum and the difference seem to correspond to subjective consonance and the melancholic/sad emotional ratings, respectively. Implications of these findings are discussed. The proposed simple presentation may help interpret and model psychoacoustic and neurophysiological results on musical chords.
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来源期刊
Journal of Mathematics and Music
Journal of Mathematics and Music 数学-数学跨学科应用
CiteScore
1.90
自引率
18.20%
发文量
18
审稿时长
>12 weeks
期刊介绍: Journal of Mathematics and Music aims to advance the use of mathematical modelling and computation in music theory. The Journal focuses on mathematical approaches to musical structures and processes, including mathematical investigations into music-theoretic or compositional issues as well as mathematically motivated analyses of musical works or performances. In consideration of the deep unsolved ontological and epistemological questions concerning knowledge about music, the Journal is open to a broad array of methodologies and topics, particularly those outside of established research fields such as acoustics, sound engineering, auditory perception, linguistics etc.
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