On the existence of a disk algebra basis
Signal Processing
On the behavior of disk algebra bases with applications
Signal Processing - Special section: Multimodal human-computer interfaces
Computer algorithm for spectral factorization of rational matrices
IBM Journal of Research and Development
IEEE Transactions on Signal Processing
On the uniform approximation of discrete-time systems bygeneralized Fourier series
IEEE Transactions on Signal Processing
MIMO decision feedback equalization from an H∞ perspective
IEEE Transactions on Signal Processing
Uncertainty principles and ideal atomic decomposition
IEEE Transactions on Information Theory
IEEE Transactions on Information Theory
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This paper investigates the behavior of causal projections. Such projections play an important role in filter design, system approximation and representation, spectral factorization, Wiener filter design, robust estimation, and in many more applications. The paper gives a complete characterization of function spaces for which the causal projections are continuous and bounded. This characterization is done in terms of the modulus of continuity of the functions. It is shown that the Riesz projector has the smallest operator norm among all causal projectors and that the Riesz projector is bounded precisely for those functions for which the modulus of continuity is upper bounded by a regular majorant. Moreover, in the second part of the paper, consequences of these results for the construction of bases, for robust approximations, for the behavior of numerical algorithms, and for filter design applications are discussed in detail.