Taking the convergence study of iterative hybrid testing as an example,this study utilized the second type of Volterra integral equations to iteratively approximate relevant theories,investigated the convergence and uniqueness of it-erative results for linear structural iterative hybrid testing,and validated the correctness of the research through numerical simulations.The results show that iterative hybrid testing for linear structures can unconditionally converge and there is an inherent connection between integral equations and iterative hybrid testing.This research indicates that the theory of in-tegral equations can provide new insights for the research and development of iterative hybrid testing.
iterative hybrid testingintegral equationssecond-type Volterra integral equationsconvergencetheoretical analysis
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