利用多分数相位处理七种多分数振动器的静态正弦响应

Symmetry Pub Date : 2024-09-11 DOI:10.3390/sym16091197
Ming Li
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引用次数: 0

摘要

本文的新颖性和主要贡献体现在四个方面。首先,我们在定理 1 中引入了多分式相位。其次,我们分别在定理 2、12、22、32、43、54 和 65 中提出了七种多分式振动器的运动相位方程。第三,我们分别在定理 10、20、30、41、52、63 和 74 中提出了七种多分频振动器响应相位的解析表达式。第四,我们分别在定理 11、21、31、42、53、64 和 75 中提出了七种多分式振动器静态正弦响应的解析表达式。此外,利用多分式相位,我们提出了七种多分式振动器的振动参数(等效质量、等效阻尼、等效刚度、等效阻尼比、等效阻尼自由固有角频率、等效阻尼固有角频率、等效频率比)和频率传递函数的解析表达式。结果表明,多分频阶数对这些多分频振动器的静态正弦响应影响很大。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Dealing with Stationary Sinusoidal Responses of Seven Types of Multi-Fractional Vibrators Using Multi-Fractional Phasor
The novelty and main contributions of this paper are reflected in four aspects. First, we introduce multi-fractional phasor in Theorem 1. Second, we propose the motion phasor equations of seven types of multi-fractional vibrators in Theorems 2, 12, 22, 32, 43, 54, and 65, respectively. Third, we present the analytical expressions of response phasors of seven types of multi-fractional vibrators in Theorems 10, 20, 30, 41, 52, 63, and 74, respectively. Fourth, we bring forward the analytical expressions of stationary sinusoidal responses of seven types of multi-fractional vibrators in Theorems 11, 21, 31, 42, 53, 64, and 75, respectively. In addition, by using multi-fractional phasor, we put forward the analytical expressions of vibration parameters (equivalent mass, equivalent damping, equivalent stiffness, equivalent damping ratio, equivalent damping free natural angular frequency, equivalent damped natural angular frequency, equivalent frequency ratio) and frequency transfer functions of seven types of multi-fractional vibrators. Demonstrations exhibit that the effects of multi-fractional orders on stationary sinusoidal responses of those multi-fractional vibrators are considerable.
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