Book contents
- Frontmatter
- Contents
- Preface
- Acknowledgments
- 1 Introduction
- 2 Introduction to abstract algebra
- 3 Fast algorithms for the discrete Fourier transform
- 4 Fast algorithms based on doubling strategies
- 5 Fast algorithms for short convolutions
- 6 Architecture of filters and transforms
- 7 Fast algorithms for solving Toeplitz systems
- 8 Fast algorithms for trellis search
- 9 Numbers and fields
- 10 Computation in finite fields and rings
- 11 Fast algorithms and multidimensional convolutions
- 12 Fast algorithms and multidimensional transforms
- A A collection of cyclic convolution algorithms
- B A collection of Winograd small FFT algorithms
- Bibliography
- Index
1 - Introduction
Published online by Cambridge University Press: 03 May 2011
- Frontmatter
- Contents
- Preface
- Acknowledgments
- 1 Introduction
- 2 Introduction to abstract algebra
- 3 Fast algorithms for the discrete Fourier transform
- 4 Fast algorithms based on doubling strategies
- 5 Fast algorithms for short convolutions
- 6 Architecture of filters and transforms
- 7 Fast algorithms for solving Toeplitz systems
- 8 Fast algorithms for trellis search
- 9 Numbers and fields
- 10 Computation in finite fields and rings
- 11 Fast algorithms and multidimensional convolutions
- 12 Fast algorithms and multidimensional transforms
- A A collection of cyclic convolution algorithms
- B A collection of Winograd small FFT algorithms
- Bibliography
- Index
Summary
Algorithms for computation are found everywhere, and efficient versions of these algorithms are highly valued by those who use them. We are mainly concerned with certain types of computation, primarily those related to signal processing, including the computations found in digital filters, discrete Fourier transforms, correlations, and spectral analysis. Our purpose is to present the advanced techniques for fast digital implementation of these computations. We are not concerned with the function of a digital filter or with how it should be designed to perform a certain task; our concern is only with the computational organization of its implementation. Nor are we concerned with why one should want to compute, for example, a discrete Fourier transform; our concern is only with how it can be computed efficiently. Surprisingly, there is an extensive body of theory dealing with this specialized topic – the topic of fast algorithms.
Introduction to fast algorithms
An algorithm, like most other engineering devices, can be described either by an input/output relationship or by a detailed explanation of its internal construction. When one applies the techniques of signal processing to a new problem one is concerned only with the input/output aspects of the algorithm. Given a signal, or a data record of some kind, one is concerned with what should be done to this data, that is, with what the output of the algorithm should be when such and such a data record is the input.
- Type
- Chapter
- Information
- Fast Algorithms for Signal Processing , pp. 1 - 20Publisher: Cambridge University PressPrint publication year: 2010