A generalized sampling theory without band-limiting constraints

Michael Unser; Josiane Zerubia

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A generalized sampling theory without band-limiting constraints

机译：一种没有带限约束的广义采样理论

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We consider the problem of the reconstruction of a continuous-time function f(x) ∈ H from the samples of the responses of m linear shift-invariant systems sampled at 1/m the reconstruction rate. We extend Papoulis' generalized sampling theory intwo important respects. First, our class of admissible input signals (typ. H=L{sub}2) is considerably larger than the subspace of band-limited functions. Second, we use a more general specification of the reconstruction subspace V(φ), so that the outputof the system can take the form of a band-limited function, a spline, or a wavelet expansion. Since we have enlarged the class of admissible input functions, we have to give up Shannon and Papoulis' principle of an exact reconstruction. Instead, we seekan approximation f∈ V(φ) that is consistent in the sense that it produces exactly the same measurements as the input of the system. This leads to a generalization of Papoulis' sampling theorem and a practical reconstruction algorithm that takes the form of a multivariate filter. In particular, we show that the corresponding system acts as a projector from H onto V(φ). We then propose two complementary polyphase and modulation domain interpretations of our solution. The polyphase representation leads toa simple understanding of our reconstruction algorithm in terms of a perfect reconstruction filter bank. The modulation analysis, on the other hand, is useful in providing the connection with Papoulis' earlier results for the band-limited case. Finally,we illustrate the general applicability of our theory by presenting new examples of interlaced and derivative sampling using splines.

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《IEEE Transactions on Automatic Control》 |1998年第8期|959-969|共11页
作者
Michael Unser; Josiane Zerubia;
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A generalized sampling theory without band-limiting constraints

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