Downloadable Publications

P.M. Woodworth, Information Theory and the Design of Radar Receivers Proceedings of the IRE. Vol 39, Num 12, pp 1521-1524 (1951)
P.M. Woodwarth, I.L. Davies, Information theory and inverse probability in telecommunication Proceedings of the IEE - Part III: Radio and Communication Engineering. Vol 99, Num 58, pp 37-44 (1952)
P.B. Borwein, R.A. Ferguson, A Complete description of Golay for lengths up to 100 Mathematics of Computation. Vol 73, Num 246, pp 967-985.
R. A. Altes, Optimum Waveforms for Sonar Velocity Discrimination, Proceedings of the IEEE, pp. 1615-1617, Nov. 1971
R. A. Altes, Some invariance properties of the wide-band ambiguity function, ESL Incorporated, Sunnyvale, CA, Dec. 1971
R. A. Altes, Target Position Estimation in Radar and Sonar, and Generalized Ambiguity Analysis for Maximum Likelihood Paramter Estimation, Proceedings of the IEEE, Vol. 67, No. 6, June 1979
L. Auslander, I. Gertner, Wide-Band Ambiguity Function and ax+b Group
M. R. Bell, Information theory and RADAR waveform design, IEEE Transactions on Information Theory, 1993
J. Benedetto, "Constructive approximation in waveform design" (book chapter), in Advances in Constructive Approximation Theory, M. Neamtu and E. Saff, editors, Nashboro Press, pp. 89-108, 2004
J. Benedetto, S. Datta, Construction of unimodular sequences with zero auto-correlation, Advances in Computational Mathematics 32, pp. 191 - 207, 2010
J. Benedetto, J. Donatelli, Ambiguity function and frame-theoretic properties of periodic zero autocorrelation waveforms, IEEE J. Select. Topics Signal Process., vol. 1, no. 1, pp. 6–20, June 2007
J. Benedetto, J. Donatelli, Frames and a vector-valued ambiguity function, in Proc. Asilomar Conf. Signals, Systems and Computers, Pacific Grove, CA, 2008
J. Benedetto, J. Donatelli, I. Konstantinidis, and C. Shaw, Zero autocorrelation waveforms: a Doppler statistic and multifunction problems, ICASSP, Toulouse, 2006, invited
J. Benedetto, J. Donatelli, I. Konstantinidis, C. Shaw, A Doppler statistic for zero autocorrelation waveforms, 40th Annual Conference on Information Sciences and Systems, pp. 1403 - 1407, March 2006
J. Benedetto, I. Konstantinidis, and M. Rangaswamy, Phase coded waveforms and their design - the role of the ambiguity function, IEEE Signal Processing Magazine, pp. 22-31, Jan. 2009
J. Benedetto, I. Kyriakides, I. Konstantinidis, D. Morrell, A. Papandreou-Suppappola, Target tracking using particle filtering and CAZAC sequences , IEEE International Waveform Diversity and Design, Pisa, (2007), invited
J. Benedetto, J. Sugar-Moore, Geometric properties of Shapiro–Rudin polynomials, Involve: A Journal of Mathematics, vol. 2, no. 4, pp. 449-468, 2009
J. Bertrand, P. Bertrand, Affine Time-Frequency Distributions
J. Bertrand, P. Bertrand,Microwave imaging of time-varying radar targets, Inverse Problems 13, pp. 621-645, 1997
J. Bertrand, P. Bertrand, The Concept of Hyperimage in Wide-Band Radar Imaging, IEEE Transactions on Geoscience and Remote Sensing, Vol. 34, No. 5, Sept. 1996
S. Datta, Construction of zero autocorrelation stochastic waveforms
V. P. Ipatov, Bindary Periodic Sequences with Low Sidelobe Suppression Loss, Izvestiya VUZ. Radioelektronika, Vol. 23, No. 1, pp. 20-25, 1980
P. Jaming, The Phase Retrieval Problem for the Radar Ambiguity Function and the Radar Ambiguity Function for the Phase Retrieval Problem, RADAR 2010, Washington, DC
George J. Linde, NRLabstracts Obituary, November 26, 2012
C. Nunn, G. Coxson, Best-Known Autocorrelation Peak Sidelobe Levels for Binary Codes of Length 71 to 105
C. Nunn, Constrained Optimization Applied To Pulse Compression Codes, And Filters
C. Nunn, G. Coxson, Polyphase Pulse Compression Codes with Optimal Peak and Integrated Sidelobes
J. Ovarlez, Cramer Rao Bound Computation for Velocity Estimation in the Broad-band Case Using the Mellin Transform, IEEE, 1993
J. Ovarlez, Optimum Signal Synthesis for Time-Scale Estimation, IEEE, 1998
A. Pezeshki, A. R. Calderbank, W. Moran, S. D. Howard, Doppler Resilient Waveforms with Perfect Autocorrelation
P. Stoica, H. He, J. Li , New Algorithms for Designing Unimodular Sequences with Good Correlation Properties
D. A. Swick, An Ambiguity Function Independent of Assumptions About Bandwidth and Carrier Frequency, NRL Report 6471
D. A. Swick, A Review of Wideband Ambiguity Functions, NRL Report 6994
P. M. Woodward, Information Theory and Inverse Probability in Telecommunication, Proceedings of the IEEE, Vol. 99, No. 58, pp. 37-44, March 1952
P. M. Woodward, Information Theory and the Design of Radar Receivers, Proceedings of the I.R.E., 1951
P. M. Woodward, Radar ambiguity analysis, Royal Radar Establishment, Malvern, U.K., Tech. Rep. RRE Tech. Note 731, 1967
P. M. Woodward, J.D. Lawson, The Theoretical Precision with which an Arbitrary Radiation-Pattern may be Obtained from a Source of Finite Size, 1948
P. M. Woodward, Theory of Radar Information

Additional References

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John J. Benedetto and Somantika Datta. Construction of infinite unimodular sequences with zero autocorrelation. Adv Comput Math, 32:191-207, 2010.
John J. Benedetto, Robert L. Benedetto, and Joseph T. Woodworth. Björck CAZACs: theory, geometry, implementation, and waveform ambiguity behavior. preprint, 2011.
John J. Benedetto, Robert L. Benedetto, and Joseph T. Woodworth. Optimal ambiguity functions and Weil's exponential sum bound. 2011.
John J. Benedetto, Ioannis Konstantinidis, and Muralidhar Rangaswamy. Phase coded waveforms and their design - the role of the ambiguity function. IEEE Signal Processing Magazine, 26:22-31, January 2009.
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Branislav M. Popovic. Generalized chirp-like polyphase sequences with optimum correlation properties. IEEE Transactions on Information Theory, 38(4):1406-1409, 1992.
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U. H. Rohrs and L. P. Linde. Some unique properties and applications of perfect squares minimum phase cazac sequences. In Proc. South African Symp. on Communications and Signal Processing, pages 155-160, 1992.
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Bahman Saffari. Oral and email communications, 2004-2010.
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John J. Benedetto and Paulo J. S. G. Ferreira, editors. Modern Sampling Theory. Applied and Numerical Harmonic Analysis. Birkhäuser Boston Inc., Boston, MA, 2001.
J. J. Benedetto and M. Fickus. Finite normalized tight frames. Adv. Comp. Math., 18(2-4):357-385, 2003.
J. J. Benedetto, A. Powell, and Ö. Yilmaz. Σ-Δ quantization and finite frames. IEEE Trans. Inform. Theory, 2006.
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Nadav Levanon. Radar Principles. John Wiley & Son Inc., 1988.
Nadav Levanon and Eli Mozeson. Radar Signals. Wiley Interscience, IEEE Press, 2004.
M. L. Long. Radar Reflectivity of Land and Sea. Artech House, 2001.
Bassem R. Mahafza and Atef Z. Elsherbeni. MATLAB Simulations for Radar Systems Design. Chapman & Hall/CRC, 2003.
F. E. Nathanson. Radar Design Principles - Signal Processing and the Environment. SciTech Publishing Inc., Mendham, NJ, 1999.
Mark A. Richards. Fundamentals of Radar Signal Processing. McGraw-Hill Book Company, 2005.
Mark A. Richards, James A. Scheer, and William A. Holm, editors. Principles of Modern Radar: Basic Principles. SciTech Publishing Inc., Raleigh, NC, 2010.
Merrill I. Skolnik. Introduction to Radar Systems. McGraw-Hill Book Company, 1980.
George W. Stimson. Airborne Radar. SciTech Publishing, Inc., Mendham, New Jersey, 1998.
David E. Vakman. Sophisticated Signals and the Uncertainty Principle in Radar. Springer-Verlag, New York, 1969.
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Presentation Slides

Greg Coxson, Existence Tests for Binary Complementary Sets Using Code Imbalance November 2014.