Sidelobe level reduction in ACF of NLFM waveform

In this paper, an iterative method is proposed for nonlinear frequency modulation (NLFM) waveform design based on a constrained optimization problem using Lagrangian method. To date, NLFM waveform design methods have been performed based on the stationary phase concept which we have already used it in a previous work. The proposed method has been implemented for six windows of Raised-Cosine, Taylor, Chebyshev, Gaussian, Poisson, and Kaiser. The results reveals that the peak sidelobe level of autocorrelation function reduces about an average of 5 dB in our proposed method compared with the stationary phase method, and an optimum peak sidelobe level is achieved. The minimum error of the proposed method decreases in each iteration which is demonstrated using mathematical relations and simulation. The trend decrement of minimum error guarantees convergence of the proposed method.

[1]  Iulian Constantin Vizitiu SIDELOBES REDUCTION USING SYNTHESIS OF SOME NLFM LAWS , 2013 .

[2]  Shruti Parwana,et al.  Analysis of LFM and NLFM Radar Waveforms and their Performance Analysis , 2015 .

[3]  Mohammad Ali Sebt,et al.  Phase Improvement Algorithm for NLFM Waveform Design to Reduction of Sidelobe Level in Autocorrelation Function , 2018 .

[4]  F. Popescu,et al.  The synthesis of some NLFM laws using the stationary phase principle , 2012, 2012 10th International Symposium on Electronics and Telecommunications.

[5]  Weining Lu,et al.  Matched NLFM pulse compression method with ultra-low sidelobes , 2008, 2008 European Radar Conference.

[6]  S. Boukeffa,et al.  Sidelobe reduction with nonlinear frequency modulated waveforms , 2011, 2011 IEEE 7th International Colloquium on Signal Processing and its Applications.

[7]  Charles E. Cook,et al.  Radar Signals: An Introduction to Theory and Application , 1967 .

[8]  Ugo Montanari,et al.  International Symposium on Programming , 1982, Lecture Notes in Computer Science.

[9]  Steven Kay,et al.  Iterative Method for Nonlinear FM Synthesis of Radar Signals , 2010, IEEE Transactions on Aerospace and Electronic Systems.

[10]  Florin Enache,et al.  Sidelobe reduction in pulse-compression radar using the stationary phase technique: An extended comparative study , 2014, 2014 International Conference on Optimization of Electrical and Electronic Equipment (OPTIM).

[11]  Steven M. Sussman,et al.  Least-square synthesis of radar ambiguity functions , 1962, IRE Trans. Inf. Theory.

[12]  Anuja D. Sarate,et al.  High Resolution Low Power Radar PulseCompression Techniques , 2014 .

[13]  J. Klauder,et al.  The theory and design of chirp radars , 1960 .

[14]  Robert D. Palmer,et al.  Optimized NLFM pulse compression waveforms for high-sensitivity radar observations , 2014, 2014 International Radar Conference.

[15]  A. C. Fairhead,et al.  Waveform design and doppler sensitivity analysis for nonlinear FM chirp pulses , 1986 .

[16]  Anuja D. Sarate,et al.  High Resolution Low Power Radar Pulse Compression Techniques , 2014 .

[17]  Mohammad Ali Sebt,et al.  Nonlinear FM waveform design to reduction of sidelobe level in autocorrelation function , 2016, 2017 Iranian Conference on Electrical Engineering (ICEE).

[18]  B. L. Prakash,et al.  Generation of Random NLFM Signals for Radars and Sonars and their Ambiguity Studies , 2016 .