K. Zhang scite author profile

K. Zhang

2Publications

14Citation Statements Received

51Citation Statements Given

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Hefei University of Technology

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On the reflected wave superposition method for a travelling string with mixed boundary supports

Chen

Zhang

Ferguson

et al. 2019

Journal of Sound and Vibration

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An analytical vibration response in the time domain for an axially translating and laterally vibrating string with mixed boundary conditions is considered in this paper. The domain of the string is a constant, dependent upon the general initial conditions. The translating tensioned strings possess different types of mixed boundary conditions, such as fixed dashpot, fixed spring-dashpot, fixed mass-spring-dashpot. An analytical solution using a reflected wave superposition method is presented for a finite translating string. Firstly, the cycle of boundary reflection for strings is provided, which is dependent upon the string length. Each cycle is divided into three time intervals according to the travelling speed and direction of the string. Applying D'Alembert's principle and the reflection properties, expressions for the reflected waves under three different non-classical boundary conditions are derived. Then, the vibrational response of the axially translating string is solved for three time intervals by using a reflected wave superposition method. The accuracy and efficiency of the proposed method are confirmed numerically by comparison to simulations produced using a Newmark-β method solution. The energy expressions for a travelling string with a fixed dashpot boundary condition is obtained and the time domain curves for the total energy and the change of energy at the boundaries are given.

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A wave solution for energy dissipation and exchange at nonclassical boundaries of a traveling string

Chen

Yuan

Ferguson

et al. 2021

Mechanical Systems and Signal Processing

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K. Zhang

On the reflected wave superposition method for a travelling string with mixed boundary supports

A wave solution for energy dissipation and exchange at nonclassical boundaries of a traveling string

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