Stability and error analysis of the anti-causal realization of periodic inverse systems
Xiaofang Chen, Cishen Zhang, Jingxin Zhang
A causal realization of an inverse system can be unstable and an anti-casual realization is to deal with this problem to provide a numerically stable procedure to inverse the system and compute its input signal. In this paper, we consider the anti-causal realization of the inverse of discrete time linear periodic systems obtained by an outer-inner factorization approach. It is shown that the outer-inner factorization can result in a stable anti-causal realization. It also derives a formula of the inversion error, which can show that the inversion error is inevitable due to the anti-causal reversal operation.