A SPECTRAL RESOLVING METHOD FOR ANALYZING LINEAR RANDOM VIBRATIONS WITH VARIABLE PARAMETERS

Applied Mathematics and Mechanics (English Edition) ›› 1984, Vol. 5 ›› Issue (1): 1091-1096.

A SPECTRAL RESOLVING METHOD FOR ANALYZING LINEAR RANDOM VIBRATIONS WITH VARIABLE PARAMETERS

金问鲁

Hangzhou Design Institute, Hangzhou

收稿日期:1983-03-07 出版日期:1984-01-18 发布日期:1984-01-18

A SPECTRAL RESOLVING METHOD FOR ANALYZING LINEAR RANDOM VIBRATIONS WITH VARIABLE PARAMETERS

Jin Wen-lu

Hangzhou Design Institute, Hangzhou

Received:1983-03-07 Online:1984-01-18 Published:1984-01-18

摘要/Abstract

摘要： This paper is a development of ref. [1]. Consider the following random equation: Z(t)+2βZ(t)+ω₀²Z(t)=(a⁰+a¹Z(t))I(t)+c in which excitation I(t) and response Z(y) are both random processes, and it is proposed that they are mutually independent. Suppose that a(t) is a known function of time and I(t) is a stationary random process. In this paper, the spectral resolving form of the random equation stated above, the numerical solving method and the solutions in some special cases are considered.

关键词: boundary layer stability, nonlinear evolution, nonparallelism, T-S disturbance wave, compact scheme, spatial mode, parabolized stability equation

Abstract: This paper is a development of ref. [1]. Consider the following random equation: Z(t)+2βZ(t)+ω₀²Z(t)=(a⁰+a¹Z(t))I(t)+c in which excitation I(t) and response Z(y) are both random processes, and it is proposed that they are mutually independent. Suppose that a(t) is a known function of time and I(t) is a stationary random process. In this paper, the spectral resolving form of the random equation stated above, the numerical solving method and the solutions in some special cases are considered.

Key words: boundary layer stability, nonlinear evolution, nonparallelism, T-S disturbance wave, compact scheme, spatial mode, parabolized stability equation

金问鲁. A SPECTRAL RESOLVING METHOD FOR ANALYZING LINEAR RANDOM VIBRATIONS WITH VARIABLE PARAMETERS[J]. Applied Mathematics and Mechanics (English Edition), 1984, 5(1): 1091-1096.

Jin Wen-lu. A SPECTRAL RESOLVING METHOD FOR ANALYZING LINEAR RANDOM VIBRATIONS WITH VARIABLE PARAMETERS[J]. Applied Mathematics and Mechanics (English Edition), 1984, 5(1): 1091-1096.

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A SPECTRAL RESOLVING METHOD FOR ANALYZING LINEAR RANDOM VIBRATIONS WITH VARIABLE PARAMETERS

A SPECTRAL RESOLVING METHOD FOR ANALYZING LINEAR RANDOM VIBRATIONS WITH VARIABLE PARAMETERS

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