In the field of airborne radar resource management, one of the most accessible solutions to enhance the power of modern radar system is to save target tracking time as much as possible. During the target tracking process, it is effective to utilize the prior knowledge of the radar cross section (RCS) of the target to save airborne radar resource. Since the target RCS is sensitive to frequency and attitude angle, it is difficult to predict the target RCS accurately. This paper proposes an effective way to save airborne radar time resource in the target tracking process by changing radiation frequency of airborne radar to tolerate certain RCS fluctuation. Firstly, based on the tolerable fluctuation range of the target RCS, this paper designs an effective search algorithm to minimize the frequency set while maximizing the average RCS within the limited fluctuation range. Secondly, the detection probability prediction phase is renewed by taking the RCS fluctuation into account in order to reduce the radar dwell time. Finally, by using interactive multiple model Kalman filter (IMMKF) algorithm, a target tracking procedure with the minimum dwell time prediction method is proposed. Simulation results show that the proposed method is effective. As for target tracking simulation of three different trajectories, the proposed method can save at best 81.35% more dwell time than the fixed frequency method.
Natural Science Foundation of Jiangsu ProvinceBK20180423National Natural Science Foundation of China61801212Aeronautics Science Foundation of China201727520192017ZC520361. Introduction
As for radar resource management, power and time are two fundamental resources which determine the search space, detection range, and the number of targets that could be tracked simultaneously. Therefore, many methods that can reduce radar radiation power and time are studied, in which minimizing dwell time and maximizing illumination interval are two fundamental ways. The utilization of prior knowledge of target radar cross section (RCS) and then controlling the dwell time of radar radiation can raise the detection probability, thus the illumination interval maximization can be achieved.
As the development of modern computational electromagnetics, taking advantage of the RCS of target becomes accessible to improve radar target detection probability. However, the higher the radar radiation frequency is, the more serious the angular glint will be. Then, the accurate target RCS value is difficult to be determined during the radar target tracking process. During recent years, the study to reveal the relationship between RCS and detection probability has attracted more and more attention. Richards analyzed radar detection probabilities corresponding to chi-square distribution using different Swerling models to describe RCS fluctuation; simulations showed that the radar detection probability would decrease when the RCS fluctuation was dramatic [1]. Using the physical optical principle, Song et al. showed that both Swerling III and IV models could be approximately expressed by Rician distribution, which provided an alternative and reasonable way to model RCS fluctuation distribution of air target [2]. Sun et al. took multiple-input and multiple-output (MIMO) radar into account, assuming that the bistatic RCS of target between an emitter and a receiver of MIMO radar could be predicted in real time to guide the radar to change radiation parameter; the simulations depicted that the tracking performance can be improved if a large number of well-separated antennas were used [3]. Liu et al. compared the influence of RCS fluctuation on radar detection probability and showed that the detection probability of simulated RCS fluctuation value with electromagnetic model of target is higher than that with traditional RCS fluctuation models [4]. Väilä et al. proposed to simulate target RCS at first and then took advantage of the predicted entry trajectory to locate early warning radar stations to extend the early warning time [5]. Tan et al. took RCS fluctuation as a target feature and proposed an adaptive radiation waveform design method based on cognitive radar to realize target recognition [6]. Divyalakshmi et al. further proved that the radar detection probability was able to be improved if the target RCS is known [7].
The target RCS and its fluctuation property have been applied to many subjects, such as detection, tracking, and recognition. Radiation waveform design corresponding to the RCS and its fluctuation should be studied in order to increase the detection probability. Bell presented the fundamental information theory for radar waveform design and guided the development of radar waveform design [8]. Recently, Liu et al. analyzed the target RCS property in clutter and proposed an algorithm with the prior knowledge of environment to maximize the target detection performance [9]. Shi et al. assumed that the bistatic RCS fluctuation of the target was limited and proposed an optimal model to balance the low probability of interception performance and the target detection probability by distributed multiple-radar system [10]. Since the wideband radar waveform can be used for imaging and the narrowband radar waveform can be used for detecting, Zhu et al. proposed a technique to design the narrowband waveform with the one-dimensional high-resolution range profile of the target [11]. The utilization of target RCS calculation can not only improve radar detection probability but also save radar resources during the target tracking process.
Radar resource management is always an important subject and has been studied for decades. In recent years, Zhang and Tian assumed that the radar power and time resources could be changed based on radar network and the strength of clutter and proposed an optimal resource allocation model to save the total power and time resources of radar network [12]. They extended the power allocation of radar network based on sensor selection algorithm into multiple-target tracking scenario with the constraint of predetermined mutual information [13]. She et al. also showed that the minimum mean-square error could replace the mutual information to select sensors in radar network [14]. As for the complicated electromagnetic environment, Shi et al. introduced game theory to minimize the required radar power [15]. Shi et al. also proposed an optimal model to minimize radar power using orthogonal frequency division multiplex waveform when radar and communication systems were in coexistence [16]. The idea was introduced into the bistatic radar scenarios [17]. Wang et al. proposed that reducing radar dwell time was an important step to prevent radar signal from being tracked by the eavesdropper equipped with a jammer [18].
Based on the previous analysis, RCS fluctuation has been paid more and more attention recently. As far as we know, there are many radar waveform design algorithms utilizing calculated target RCS. The RCS fluctuation models, such as Swerling models, are applied in target tracking process to save radar time resources. However, there has been no paper to study radar signal which could tolerate the calculated target RCS fluctuation, and the existing target tracking algorithms do not take the calculated target RCS fluctuation into account. Since the radar detection probability is proportional to the average RCS, it can be helpful to improve the average RCS by using the appropriate radar waveform carrier frequency.
The purpose of this paper is to reduce radar dwell time during target tracking process using the target RCS prediction method and then improve radar detection probability. The RCS derived from HPEM model is utilized in the process, which in not included in paper [12]. Firstly, by taking the calculated target RCS at all azimuths and all frequency bins into account, a search algorithm is adopted to minimize the corresponding carrier frequency set of radar signal under the constraints of maximizing average RCS and limited RCS fluctuation in continuous azimuths. Secondly, the detection probability prediction phase renewed by different methods, such as optimized method by principle component analysis and optimized method by this paper, is compared. Finally, the prediction step of radar detection probability is applied into the interactive multiple model Kalman filter (IMMKF) algorithm to minimize radar dwell time under the same tracking performance constraint.
2. Problem Scenario
An important method to improve radar target detection probability during the target tracking process is to utilize the prior knowledge of target as much as possible. Though the optimal narrowband radiation parameter design of radar carrier frequency based on the knowledge of high resolution range profile (HRRP) of the target is reasonable to improve radar target detection probability in ideal environment, it does not take the observation error into account. The wideband waveform design can be robust to the limited fluctuation of target echo, but it is not suitable for target detection because the signal-to-noise ratio (SNR) is inversely proportional to the bandwidth. The high-precision electromagnetic model (HPEM) of the target is applied to calculate the RCS using high-frequency electromagnetic algorithm, and the database that consists of those RCS results can be set up. A radiation frequency design method based on the target RCS fluctuation constraint is considered; then, the relationship between the RCS fluctuation amplitude and the radar detection probability can be analyzed.
Radar targets in the optical region can be regarded as the combination of multiple scatters so that the target RCS can be calculated with the HPEM model. However, a little movement or a small deformation of the target may lead to random changes of the RCS. Väilä et al. [5] took RCS fluctuation into account and then transform radar detection equation into
(1)Pr=PtGtGrλ2σ4π3LsLfR4,where Pr is received echo power; Pt denotes radar transmission power; Gt and Gr denote transmitter antenna gain and receiver antenna gain, respectively; λ denotes wavelength; σ is target RCS value; Ls and Lf are system loss and target RCS fluctuation loss, respectively; and R is the distance between the radar and target.
Equation (1) can be rewritten as
(2)Pr=Kλ2σLfR4,where K=PtGtGr/4π3Ls, with the definition that Pr=A2/2, and the probability density function Pdr of the envelope of Pr obeys the generalized Rayleigh distribution
(3)Pdr=rσ02exp−r2+A22σ02I0rAσ02,where r is the envelope of the signal plus noise, σ02 is the system noise power, σ02=kFnT0BnM, k=1.38×10−23 is the Boltzmann constant, Fn is the receiver noise, T0 is the absolute temperature, Bn denotes receiver bandwidth, M is the modulation factor, and I0 is zero-order modified Bessel function.
Then, there is
(4)Pd=∫2σ02ln1/Pfa∞rσ02exp−r2LfR4+Kλ2σσ02LfR4I0rλσ02R22KσLfdr,where Pfa is predetermined false alarm probability.
According to Equation (4), the trends of the RCS fluctuation loss versus detection probability are shown in Figure 1 under different Swerling models. Taking Swerling I model as an example [19], in order to maintain the detection probability of 0.9, an additional 8 dB SNR (signal-to-noise ratio) increment is needed to compensate the fluctuation loss. This shows that if the fluctuation can be controlled within a limited range, the SNR can be improved, which can help reduce the radar dwell time.
The change of detection probability based on RCS fluctuation loss.
3. Optimization of Radar Carrier Frequency Set
Based on the analysis of Section 2, the radar detection performance can be affected by the fluctuation loss of the target RCS, so it can be beneficial to design the matching radar transmission carrier frequency based on the target RCS. If the attitude angle of target is known or predictable, the optimal transmission carrier frequency can be designed by selecting the largest frequency response corresponding to the target.
However, in practical applications, the target RCS is sensitive to attitude angle and the optimal radar carrier frequency design requires too much storage space. Then, this paper proposes a radiation frequency design method based on the target RCS fluctuation constraint. Taking the RCS fluctuation along azimuth angle as an example, the RCS results lower than the preset fluctuation constraint value are classified into one group, and different transmission frequencies for each group are designed to improve the average target detection probability.
Suppose that the target corresponds to the radar transmission frequency f and the RCS with azimuth angles of j and k are σj,f and σk,f, respectively, where k is the reference original azimuth of the ith angle span xi. The set that can satisfy the target RCS fluctuation loss constraint σj,f−σk,f≤δ is
(5)xi=j∣σj,f−σk,f≤δwhere δ is RCS fluctuation loss constraint and
(6)j=k+Δ,Δ=1,2,⋯,wi,X=x1,x2,⋯,xM,∑i=1Mwi≥WID,i=1,2,⋯,M,where wi is the width of the xi span, WID represents the interested total azimuth, M represents that WID is partitioned to M span, and X represents a set that meets the requirement of RCS fluctuation loss constraint.
Assuming the radar transmit frequency corresponding to the set X consists of a set of transmit frequencies F=f1,f2,⋯,fM, fi is the radar transmission frequency corresponding to the ith azimuth span. Let F denote the total number of elements of the set F; the radiation frequency design algorithm based on the target RCS fluctuation loss constraint is as follows:
Read the target RCS database
Set the RCS fluctuation loss constraint value δ, the interested azimuth angle set, the transmission frequency set, the starting search angle jm, and the starting search frequency fn
Let the width of the ith angle span be wi=0and m=1 (starting from the beginning of the interest angle field)
Compare σjm,fn−σjwi−1,fn and δ size, σjm,fn−σjwi−1,fn≤δ. Then, update the search angle to jm−1 and wi+1, otherwise wi
Compare σjwi+1,fn−σjm,fn and δ size, σjm,fn−σjwi+1,fn≤δ Then update the search angle to jm+1, and wi+1, otherwise wi
When wi is unchanged, record wi, update the search frequency to fn+1, and repeat steps (4) to (6) until all frequency searches are completed
Record the maximum span of the ith angle span wi and the corresponding frequency f
Let jm be jwi, repeat steps (2) to (8) until all interested azimuth angle set search are completed
4. Minimum Dwell Time Design Based on RCS Estimation4.1. Prediction of Detection Probability
Take the center of the target as the origin of the target coordinate system, then the X-axis along the nose direction, the Y-axis is perpendicular to the X-axis and is parallel to the left wing of the target, and the Z-axis is perpendicular to the XOY plane. The target attitude angles are the azimuth φand the elevation angle θ of line of sight of radar in a target body coordinate. Define the azimuth φ as the projection of radar line of sight on the XOY plane and set the angles to [−180°, 180°]. The nose direction is 0°, left wing direction is 90°, and right wing direction is −90°. Define the elevation angle θ as the angle between the radar line of sight and Z-axis and set the angles to [0°, 360°]. The view from the top of the target is 0°; the nose cone direction is 90°. The angles are shown in Figure 2.
The coordinate system of the target.
When a target maneuvers in the radar coordinate system, the radar line of sight changes as time and its attitude vary and the RCS value of the target changes. The transformation process from the radar coordinate system to the target coordinate system is as follows:
(7)xTtyTtzTt=p11p12p13p21p22p23p31p32p33⋅x−xRty−yRtz−zRt=P⋅x−xRty−yRtz−zRt,where [x, y, z] are the coordinates of a point in the radar coordinate system, xRt,yRt,zRt are the coordinates of target track in radar coordinate system, xTt,yTt,zTt are the coordinate of the point [x, y, z] in the target coordinate system, and P is the transformation matrix, and the elements in the matrix are
(8)p11=cosαt⋅cosγt+sinαt⋅sinγt⋅sinηt,p12=sinαt⋅cosηt,p13=−cosαt⋅sinγt+sinαt⋅cosγt⋅sinηt,p21=−sinαt⋅cosγt+cosαt⋅sinγt⋅sinηt,p22=cosαt⋅cosηt,p23=sinαt⋅sinγt+cosαt⋅cosγt⋅sinηt,p31=sinγt⋅cosηt,p32=−sinηt,p33=cosγt⋅cosηt,where αt, γt, and ηt are yaw angle, pitch angle, and roll angle of the target, respectively. By substituting radar coordinates, then
(9)xT0tyT0tzT0t=−P⋅xRtyRtzRt.
This is the coordinate of the radar in the target coordinate system. From Equation (9), the azimuth angle can be obtained as
(10)φt=arctanyT0txT0t.
Assume that the azimuth angle of time k predicted at time k−1 by target state prediction is φ^kk−1 from Equation (10). The RCS corresponding to the target is obtained from the target RCS database. Azimuth variance σa,k∣k−12 can be obtained from [12], and the corresponding SNR is estimated as
(11)DSNR¯k∣k−1=DSNR¯0kB2μφ^k∣k−1,fB2+8ln2σa,k∣k−12,whereB represents bandwidth, μφ^k∣k−1,f is the RCS value corresponding to φ^kk−1 and carrier frequency f, and DSNR¯0k=DSNRcalTkd/Tcaldlk∣k−1/lcal−4. For the dwell time Tkd, the calibration parameters DSNRcal, Tcald, and lcal parameters are set to 3 dB, 1 ms, and 60 km, respectively; then, the detection probability estimation is
(12)pd,k∣k−1=pfa1/1+DSNR¯k∣k−1,where pfa is false alarm probability. With (11) and (12), the target tracking algorithms based on adaptively sampling interval and dwell time design could be simulated again to further save radar time resource.
4.2. Minimum Dwell Time Design by Interactive Multiple Model Kalman Filter
This paper introduces data set from Section 3 and equations from (10), (11), (12) into the interactive multiple model Kalman filter (IMMKF) algorithm to minimize dwell time. The steps of the algorithm are as follows:
Initialization
Set sampling interval sequence ΔT=ΔTmin,2ΔTmin,⋯,ΔTmax and dwell time sequence τ=τmin,2τmin,⋯,τmax.
Constructing expected covariance matrix Pdes
Estimation predicted error covariance matrix Ppre
Constructing an objective function, for example, let Pdes≈Ppre
Minimizing radar dwell time
Radar first estimates the dwell time based on the predicted RCS and the target distance to satisfy required detection probability in (12). Since the predicted values of distance and RCS are not exactly accurate, the predicted dwell time could not always meet the requirement. If the current dwell time does not meet the requirement, which might happen for the random variables during tracking process, such as observation error in (10) and noise, the radar will continue to illuminate the target for τmin until the real echo detection probability is equal or greater than the expected detection probability in (12). Besides equations from (10), (11), (12), the detailed IMMKF process is shown in [18].
Status update
5. Simulations
This section depicts that the proposed method based on limited RCS fluctuations can be beneficial to the applications in radar target detection and target tracking.
5.1. Simulations to Illustrate Section 3
The RCS data are loaded from simulated RCS database of the target in advance. Figure 3 shows the example of search results of different radar frequencies using the algorithm introduced in Section 3. Taking Figure 3(a) as an example, the blue line represents the target RCS at a certain azimuth when carrier frequency is 8.35 GHz, and the red line represents a continuous azimuth in which the fluctuation of target RCS is constrained to 5 dB. Compared with other different frequencies at the same azimuth, such as (b)–(d) in Figure 3, the red line in (a) depicts that the corresponding RCS values have the average maximum values.
Partition examples constrained by RCS fluctuation loss.
By using the simulated RCS calculated by the HPEM model, Figure 3 also illustrates that the corresponding data are calculated using the algorithm in Section 3, including RCS fluctuation, carrier frequencies, and the span of continuous azimuth. Based on the search results in Figures 3 and 4 shows the partition parameters under different RCS fluctuation constraints, which illustrate that the number of azimuth spans is proportional to the number of required carrier frequencies and is inversely proportional to the tolerate increment of RCS fluctuation.
Partition parameters constrained by RCS fluctuation loss.
In addition, Figure 4 also shows that the minimum azimuth span is almost unchanged under different RCS fluctuation constraints. The reason is that there is a dramatic RCS fluctuating, so the average RCS is difficult to be predicted. Meanwhile, the maximum azimuth span will increase as the toleration of RCS fluctuation increases, which indicates that most of the attitude fluctuations of target RCS are in an acceptable range. Therefore, it is possible to use limited RCS fluctuation to save time resources during target tracking process in many cases.
5.2. Simulations to Illustrate Section 4.1
Using the data set simulated in Figure 4, this paper establishes a simple scenario. Supposing that the initial coordinates (unit: km) of target 1 is (80, 30, 8) and this target is moving towards the radar, the velocity and acceleration of the target are 250 m/s and 0 m/s2, respectively; the radar is located at the coordinates (0, 0, 8); the transmitting power is 20 kW; both the antenna gains of the transmitter and receiver are 30 dB; the false alarm probability is 10−6; the system loss is 5 dB; the receiver noise is 5 dB; and the receiver bandwidth is 1 MHz. The detection probability of the target is calculated according to Equation (4).
To illustrate the improvement of detection probability, this paper compares the proposed algorithm with two other methods. One is the fixed carrier frequency method which is used at 8 GHz, and the other is the principal component analysis (PCA) method. The PCA method is used to design a carrier frequency which is suitable for each azimuth of a fixed span, so that the target RCS is averaged in that fixed azimuth span. The method proposed in this paper is to design the carrier frequency in an adaptive azimuth span in which the RCS fluctuation is limited. The performance of different methods is shown by detection probability and dwell time from Figures 5–8.
Detection probability when classification number is 15.
Detection probability when classification number is 20.
Dwell time when detection probability is 0.8 and classification number is 15.
Dwell time when detection probability is 0.8 and classification number is 20.
The number of azimuth spans is set to 15 and 20 in order to design the carrier frequency in different azimuth spans within which the RCS fluctuation is limited, and the spans are corresponding to the RCS fluctuation limitation of 5 dB and 4 dB in Figure 4. Apparently, this paper takes more prior knowledge of the target RCS calculated by the HPEM model. And the more prior knowledge is utilized, the dwell time will be shorter; thus, the detection probability will be higher.
5.3. Simulations to Illustrate Section 4.2
Besides the simple maneuvering scenario simulated in Section 5.2, this paper takes two other maneuvering trajectories into account to illustrate that the dwell time reduction using the limited RCS fluctuation method. The maneuvering trajectories of target 2 and target 3 are shown in Table 1; they are in the same initial state as target 1.
Maneuvering model of targets 2 and 3.
Time (s)
Motion model of target 2
Time (s)
Motion model of target 3
0-10
Uniform
11-20
Acceleration (10 m/s2)
21-30
Acceleration (-20 m/s2)
0-10
Uniform
31-40
Acceleration (20 m/s2)
11-30
Acceleration (30 m/s2)
41-60
Uniform
31-100
Uniform
61-80
Acceleration (20 m/s2)
81-100
Acceleration (-40 m/s2)
The relevant parameters in Section 5.2 are set as follows: sampling interval sequence ΔT=5 s and dwell time sequence τmin=1 ms, ∣Pdes∣=240. And the RCS fluctuation is set to 4 dB.
After 500-time Monte Carlo experiments on the three targets, Figures 9–11 compare the simulation results based on fixed dwell time, adaptive dwell time with fixed radiation frequency, adaptive dwell time with limited RCS fluctuation, adaptive dwell time with Swerling I-1, and adaptive dwell time with Swerling I-2. Both Swerling I-1 and Swerling I-2 are Rayleigh models, and their variances are equal to 1, and the expectation of Swerling I-1 is 0.5, and the expectation of Swerling I-2 is 1.
Dwell time comparison on target 1.
Dwell time comparison on target 2.
Dwell time comparison on target 3.
As is shown in Figures 9–11, the dwell time with fixed radiation frequency is less than the fixed dwell time, and the dwell time with limited RCS fluctuation constraint is the shortest. Table 2 shows the statistical average dwell time of target 1, target 2, and target 3.
Dwell time of target 1 to target 3 (ms).
Target index
Fixed dwell time
Swerling I-1
Swerling I-2
Fixed frequency
Fluctuation constraint
1
30
26.5
26.2
22.2
19.4
2
30
27.1
27.7
24.1
19.3
3
30
26.7
26.1
24.4
20.9
Compared with the method of fixed dwell time, adaptive dwell time algorithm incorporated with the Swerling model, fixed radiation frequency, and fluctuation constraint require less dwell time. The fixed frequency method can save 7.8 ms, 5.9 ms, and 5.6 ms of dwell time than the fixed dwell time method. Meanwhile, the fluctuation constraint method can save 10.6 ms, 10.7 ms, and 9.1 ms of dwell time than the fixed dwell time method. So the method proposed by this paper can save as much as 35.90%, 81.35%, and 62.5% more dwell time than the fixed frequency method during the tracking process.
6. Conclusions
This paper proposes a novel method to apply the target RCS calculated by the HPEM model into radar target tracking process, which is effective to save radar time resources. The variable target RCS is considered during the detection probability estimation procedure of the target tracking algorithm, and an adaptive dwell time design is achieved based on the covariance control method. Then, the IMMKF tracking algorithm is improved based on the airborne radar radiation frequency design method. Simulation results illustrate that the proposed method can save average dwell time more effectively during the tracking process compared with other existing methods.
Data Availability
The data used to support the conclusion of this study are available in Section 5.
Conflicts of Interest
The authors declare that they have no competing interests.
Authors’ Contributions
All authors equally contributed to this paper.
Acknowledgments
This research is supported by the Aeronautics Science Foundation of China (Grant No. 2017ZC52036, No. 20172752019), National Natural Science Foundation of China under Grant 61801212, and Natural Science Foundation of Jiangsu Province under Grant BK20180423.
RichardsM.2017BeijingPublishing House of Electronics IndustrySongX.BlairW. D.WillettP.ZhouS.Dominant-plus-Rayleigh models for RCS: Swerling III/IV versus Rician20134932058206410.1109/TAES.2013.65580402-s2.0-84880549902SunB.WangX.MoranB.Target tracking using range and RCS measurements in a MIMO radar networkIET International Radar Conference 2013April 2013China1610.1049/cp.2013.05002-s2.0-84894531555LiuJ.FangN.BaoF.XieY.A novel dynamic RCS simulation and analysis method considering attitude perturbation2015291411810.1080/09205071.2015.10511892-s2.0-84940713191VäiläM.JylhäJ.VaisanenV.PeralaH.VisaA.HarjuM.VirtanenK.A RCS model of complex targets for radar performance prediction2017 IEEE Radar Conference (RadarConf)May 2017Seattle, WA, USA43043510.1109/radar.2017.79442412-s2.0-85021430041TanJ.RomeroR.JennD.Target recognition with adaptive waveforms in cognitive radar using practical target RCS responses2018 IEEE Radar Conference (RadarConf18)2018Oklahoma City, OK, USA60661110.1109/radar.2018.83786282-s2.0-85049943517DivyalakshmiA.BhuvanaA.BabuG. V.Analysis of radar cross section and detection201811916469477BellM. R.Information theory and radar waveform design19933951578159710.1109/18.2596422-s2.0-0027663186LiuJ.WangK.LiuX.Waveform design for target detection based on priori characteristics2013 IEEE International Geoscience and Remote Sensing Symposium - IGARSSJuly 2013Melbourne, VIC, Australia4010401310.1109/igarss.2013.67237122-s2.0-84894258610ShiC.WangF.SellathuraiM.ZhouJ.ZhangH.Robust transmission waveform design for distributed multiple-radar systems based on low probability of intercept2016381708010.4218/etrij.16.0114.12302-s2.0-84964969205ZhuZ.KayS.RaghavanR. S.Information-theoretic optimal radar waveform design201724327427810.1109/LSP.2017.26558792-s2.0-85015154655ZhangZ.TianY.A novel resource scheduling method of netted radars based on Markov decision process during target tracking in clutter201620161610.1186/s13634-016-0309-32-s2.0-84957812203SheJ.WangF.ZhouJ.A novel sensor selection and power allocation algorithm for multiple-target tracking in an LPI radar network20161612219310.3390/s161221932-s2.0-8500710943428009819SheJ.ZhouJ.WangF.LiH.LPI optimization framework for radar network based on minimum mean-square error estimation201719839710.3390/e190803972-s2.0-85028502657ShiC.SalousS.WangF.ZhouJ.Power allocation for target detection in radar networks based on low probability of intercept: a cooperative game theoretical strategy20175281030104510.1002/2017RS0063322-s2.0-85029623780ShiC.WangF.SellathuraiM.ZhouJ.SalousS.Power minimization-based robust OFDM radar waveform design for radar and communication systems in coexistence20186651316133010.1109/TSP.2017.27700862-s2.0-85033677411ShiC.WangF.SalousS.ZhouJ.Low probability of intercept based multicarrier radar jamming power allocation for joint radar and wireless communications systems201711580281110.1049/iet-rsn.2016.03622-s2.0-85018347163WangF.YuS.ShiC.SellathuraiM.LPI time-based TMS against high-sensitivity ESM201812121509151610.1049/iet-rsn.2018.50972-s2.0-85058182133SkolnikM.20103rdBeijingPublishing House of Electronics Industry