Sampling Theory in Fourier and Signal Analysis: Foundations - Rilegato

Recensione

...the text is written by use of LATEX and its beautiful graphics reveal the power and the advantages of this system. (Zentralblatt fuer Mathematik 827/97)

Contenuti

• 1: An introduction to sampling theory
• 1.1: General introduction
• 1.2: Introduction - continued
• 1.3: The seventeenth to the mid twentieth century - a brief review
• 1.4: Interpolation and sampling from the seventeenth century to the mid twentieth century - a brief review
• 1.5: Introduction - concluding remarks
• 2: Background in Fourier analysis
• 2.1: The Fourier Series
• 2.2: The Fourier transform
• 2.3: Poisson's summation formula
• 2.4: Tempered distributions - some basic facts
• 3: Hilbert spaces, bases and frames
• 3.1: Bases for Banach and Hilbert spaces
• 3.2: Riesz bases and unconditional bases
• 3.3: Frames
• 3.4: Reproducing kernel Hilbert spaces
• 3.5: Direct sums of Hilbert spaces
• 3.6: Sampling and reproducing kernels
• 4: Finite sampling
• 4.1: A general setting for finite sampling
• 4.2: Sampling on the sphere
• 5: From finite to infinite sampling series
• 5.1: The change to infinite sampling series
• 5.2: The Theorem of Hinsen and Kloösters
• 6: Bernstein and Paley-Weiner spaces
• 6.1: Convolution and the cardinal series
• 6.2: Sampling and entire functions of polynomial growth
• 6.3: Paley-Weiner spaces
• 6.4: The cardinal series for Paley-Weiner spaces
• 6.5: The space ReH1
• 6.6: The ordinary Paley-Weiner space and its reproducing kernel
• 6.7: A convergence principle for general Paley-Weiner spaces
• 7: More about Paley-Weiner spaces
• 7.1: Paley-Weiner theorems - a review
• 7.2: Bases for Paley-Weiner spaces
• 7.3: Operators on the Paley-Weiner space
• 7.4: Oscillatory properties of Paley-Weiner functions
• 8: Kramer's lemma
• 8.1: Kramer's Lemma
• 8.2: The Walsh sampling therem
• 9: Contour integral methods
• 9.1: The Paley-Weiner theorem
• 9.2: Some formulae of analysis and their equivalence
• 9.3: A general sampling theorem
• 10: Ireggular sampling
• 10.1: Sets of stable sampling, of interpolation and of uniqueness
• 10.2: Irregular sampling at minimal rate
• 10.3: Frames and over-sampling
• 11: Errors and aliasing
• 11.1: Errors
• 11.2: The time jitter error
• 11.3: The aliasing error
• 12: Multi-channel sampling
• 12.1: Single channel sampling
• 12.3: Two channels
• 13: Multi-band sampling
• 13.1: Regular sampling
• 13.2 Optimal regular sampling:
• 13.3: An algorithm for the optimal regular sampling rate
• 13.4: Selectively tiled band regions
• 13.5: Harmonic signals
• 13.6: Band-ass sampling
• 14: Multi-dimensional sampling
• 14.1: Remarks on multi-dimensional Fourier analysis
• 14.2: The rectangular case
• 14.3: Regular multi-dimensional sampling
• 15: Sampling and eigenvalue problems
• 15.1: Preliminary facts
• 15.2: Direct and inverse Sturm-Liouville problems
• 15.3: Further types of eigenvalue problem - some examples
• 16: Campbell's generalised sampling theorem
• 16.1: L.L. Campbell's generalisation of the sampling theorem
• 16.2: Band-limited functions
• 16.3: Non band-limited functions - an example
• 17: Modelling, uncertainty and stable sampling
• 17.1: Remarks on signal modelling
• 17.2: Energy concentration
• 17.3: Prolate Spheroidal Wave functions
• 17.4: The uncertainty principle of signal theory
• 17.5: The Nyquist-Landau minimal sampling rate