A new class of shift-varying operators, their shift-invariant equivalents, and multirate digital systems
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[1] G. Kranc,et al. Input-output analysis of multirate feedback systems , 1957 .
[2] F. J. Mullin,et al. The analysis of sampled-data control systems with a periodically time-varying sampling rate , 1959, IRE Transactions on Automatic Control.
[3] R. Kálmán,et al. A unified approach to the theory of sampling systems , 1959 .
[4] C. Sidney Burrus,et al. A unified analysis of multirate and periodically time-varying digital filters , 1975 .
[5] C. Burrus,et al. Design and implementation of multirate digital filters , 1976 .
[6] C. Desoer,et al. Feedback system design: The fractional representation approach to analysis and synthesis , 1979, 1979 18th IEEE Conference on Decision and Control including the Symposium on Adaptive Processes.
[7] Allen G. Lindgren,et al. Fast state-space decimator with very low round-off noise , 1981 .
[8] C. Barnes,et al. Multirate recursive digital filters--A general approach and block structures , 1983 .
[9] K. Poolla,et al. Robust control of linear time-invariant plants using periodic compensation , 1985 .
[10] M. Araki,et al. Multivariable multirate sampled-data systems: State-space description, transfer characteristics, and Nyquist criterion , 1986 .
[11] Peter M. Thompson,et al. Gain and phase margins of multi-rate sampled-data feedback systems† , 1986 .