03606oam 2200613I 450 991064600110332120170822104946.00-367-65894-10-429-15871-81-4822-4185-410.1201/b17672 (CKB)2670000000567680(EBL)1718098(SSID)ssj0001368789(PQKBManifestationID)11710371(PQKBTitleCode)TC0001368789(PQKBWorkID)11279907(PQKB)11040146(MiAaPQ)EBC1718098(OCoLC)894169875(ScCtBLL)c9f86657-886b-4de2-9ff9-3345dcfbd8f1(CaSebORM)9781482241846(EXLCZ)99267000000056768020180331h20152015 uy 0engur|n|---|||||txtccrSignal processing a mathematical approach /Charles L. Byrne, University of Massachusetts Lowell, Lowell, Massachusetts, USA2nd ed.Boca Raton :CRC Press, Taylor & Francis Group,[2015]©20151 online resource (436 p.)Monographs and research notes in mathematicsA Chapman and Hall book.1-4398-6567-1 1-322-63845-4 1-4822-4184-6 Includes bibliographical references and index.Front Cover; Signal Processing: A Mathematical Approach, Second Edition; MONOGRAPHS AND RESEARCH NOTES IN MATHEMATICS; Dedication; Contents; Preface; Chapter 1 Introduction; Chapter 2 Fourier Series and Fourier Transforms; Chapter 3 Remote Sensing; Chapter 4 Finite-Parameter Models; Chapter 5 Transmission and Remote Sensing; Chapter 6 The Fourier Transform and Convolution Filtering; Chapter 7 Infinite Sequences and Discrete Filters; Chapter 8 Convolution and the Vector DFT; Chapter 9 Plane-Wave Propagation; Chapter 10 The Phase Problem; Chapter 11 Transmission TomographyChapter 12 Random SequencesChapter 13 Nonlinear Methods; Chapter 14 Discrete Entropy Maximization; Chapter 15 Analysis and Synthesis; Chapter 16 Wavelets; Chapter 17 The BLUE and the Kalman Filter; Chapter 18 Signal Detection and Estimation; Chapter 19 Inner Products; Chapter 20 Wiener Filtering; Chapter 21 Matrix Theory; Chapter 22 Compressed Sensing; Chapter 23 Probability; Chapter 24 Using the Wave Equation; Chapter 25 Reconstruction in Hilbert Space; Chapter 26 Some Theory of Fourier Analysis; Chapter 27 Reverberation and Echo Cancellation; Bibliography; Back CoverSignal Processing: A Mathematical Approach is designed to show how many of the mathematical tools the reader knows can be used to understand and employ signal processing techniques in an applied environment. Assuming an advanced undergraduate- or graduate-level understanding of mathematics-including familiarity with Fourier series, matrices, probability, and statistics-this Second Edition: Contains new chapters on convolution and the vector DFT, plane-wave propagation, and the BLUE and Kalman filtersExpands the material on Fourier analysis to three new chapters to provide additional backgroundMonographs and research notes in mathematics.Signal processingMathematicsSignal processingMathematics.621.38220151Byrne Charles L.1947,1275455FlBoTFGFlBoTFGBOOK9910646001103321Signal processing3005941UNINA