Abstract

The micromotion feature extraction method based on track-before-detect (TBD) can save the radar resource and improve the real-time performance of micromotion feature extraction by implementing target detecting, tracking, and micromotion feature extraction simultaneously. Usually, multitargets will exist in different areas, and the limited radar resources should be allocated for different areas to achieve the maximal performance of radar. For single-beam phased array radar, an adaptive resource allocation optimization model is established according to the processing steps of the micromotion feature extraction method based on TBD, and an adaptive resource allocation strategy is proposed. With the method, the radar efficiency can be significantly improved. The effectiveness of the proposed method is demonstrated by simulations.

1. Introduction

With the beam agile ability, multifunction phased array radar (MFPAR) can control the transmit beam pointing flexibly by selecting the most appropriate target area for observation. Reasonable and effective resource scheduling algorithms are important for exploiting the high adaptive potential of MFPARs [1].

Recently, the study on radar resource allocation has drawn extensive attention of scholars [2–10]. In [2], an adaptive ISAR imaging-considered task scheduling algorithm is proposed, which can improve the radar efficiency by allocating resource for target detecting, tracking, and imaging simultaneously. A time window-based task scheduling approach for MFPAR is proposed in [3], with a simple but predictive heuristic approach, the latency in the schedules of lateness-sensitive tasks can be reduced and the probability of target losses can be lessened. Based on a maximal pulse interleaving technique, an adaptive resource management method for MFPAR is proposed, which can improve the overall capacity of the radar system [4]. Focused on target detecting and tracking, the comparison of two different radar task scheduling methods [5, 6] showed that prioritization is a key component to determining overall performance; thus, a knowledge-based fuzzy logic approach for prioritizing radar tasks was introduced and a resource management method is proposed [7]. With the consideration of both the radial cumulative detection probability and tangential cumulative detection probability, a resource scheduling algorithm for phased array radar in searching mode is proposed in [8], which can minimize the total resource consumption under the guarantee of searching performance. In [9], in terms of multitarget tracking, the radar resource is allocated adaptively according to the tracking accuracy, which can make the actual tracking accuracy approach the expected one. Aimed at the micromotion feature extraction of the target, a radar resource allocation method is proposed in [10], where the micromotion feature of the target can be extracted using tracking pulses with adaptive update rate; thus, the efficiency of the radar system can be improved.

So far, the existing adaptive resource scheduling methods can be classified into two categories [1–11]: for single-type task and for multitype tasks. For single-type task, the resource allocation optimization models are usually established according to the corresponding performance metrics (such as the detection probability for the detecting tasks and the tracking accuracy for the tracking tasks). For multitype tasks, the source allocation optimization models are usually established according to the priority, the expected execution time, the dwell time, the time window, and data update rate of different type tasks.

To save the radar resource and improve the real-time performance of micromotion feature extraction, we have proposed a novel micromotion feature extraction method based on track-before-detect (TBD) by establishing an information feedback loop [12], with which the micromotion feature parameters of space target can be extracted concurrently with implementing the target detecting and tracking, both the detection probability and micromotion feature extraction precision are much higher than the traditional methods.

However, multitargets may exist in different areas, and the detecting, tracking, and micromotion feature extraction need to be implemented for different areas simultaneously. In this case, the limited radar resources will be not sufficient to be allocated for every area, and then the allocation contradiction of radar resources becomes serious. A reasonable and effective resource allocation strategy is important for exploiting the performance advantages of the micromotion feature extraction method based on TBD [12]. From the available related works, almost all existing resource scheduling methods are aimed at the traditional radar tasks (such as detecting tasks, tracking tasks, and imaging tasks), and for different radar tasks, the resource allocation model is different which depended on the signal processing steps of different radar tasks. Obviously, the signal processing steps of the micromotion feature extraction method based on TBD is different from that of the traditional radar tasks, because it integrates the detecting, tracking, and micromotion feature extraction together. Therefore, the existing adaptive resource scheduling methods will be not usable. In this paper, according to the processing steps of the micromotion feature extraction method in [12], an adaptive resource allocation strategy is proposed, where the performance of detecting, tracking, and micromotion feature extraction is all considered to establish the resource allocation optimization model. By solving the resource allocation optimization model with intelligent optimization algorithms [13, 14]; the reasonable and effective resource allocation can be achieved.

This paper is organized as follows. The brief recap of the micromotion feature extraction method based on TBD is given in Section 2. The relationship between the performances of target detecting, tracking, and micromotion feature extraction and the radar resource consumption is analyzed in Section 3. The resource allocation optimization model is established and solved in Section 4. Simulations are presented in Section 5 and some conclusions are made in the last section.

2. Micromotion Feature Extraction Method Based on TBD

In this section, the brief principles of the micromotion feature extraction method based on TBD are reviewed, which is the foundation of this paper. The main idea is that micromotion feature parameters are estimated from the acquired curve information based on TBD technology, and in return, the state transition set of TBD has been updated adaptively according to these extracted feature parameters. A single conical target contains a fixed scatterer and two slide scatterers and have been taken as an example, as shown in Figure 1, where , , , , , , and are the precession angle, precession frequency, angle between line of sight (LOS) and -axis, radius of the base circle, distance between the target centroid and scatterer , vertical distance between the target centroid and the base circle, and target velocity, respectively.

Figure 1 

The geometry of conical target with precession.

The projection of , , and in the line of sight direction at time can be represented as , , and , respectively. A feedback loop between micromotion feature extraction and TBD of the target is established, the main steps can be described as follows. The monitoring area is divided into grids according to the range and azimuthal angle with stepped increasement of and , and each grid is denoted as a state . Assume the target consists of observable scatterers. At the kth scan, for each azimuthal angle , selecting any states to form an expanded state , the measured value of is defined as where is the measured value of state . The cumulative energy can be calculated as where is the state transition set, which contains all the possible state which can transit to state . Assume that the number of the cumulative energy which is larger than the detection threshold is . Thus, state sequences will be obtained, and each state sequence contains range trajectories and angle trajectories . Obviously, for the cone-tip scatterer , the range trajectory should be equal to , for the cone-base scatterers and , the estimated range trajectories should be equal to and , respectively. Therefore, the micromotion feature parameters can be extracted via fitting the obtained range trajectory according to the mathematical expression of m-D effect (, , and ) with the Levenberg–Marquardt method. In turn, the extracted micromotion feature parameters are utilized to update the parameters of TBD adaptively. The state will belong to the state transition set (i.e., ) when it satisfies where represents the consistency of the micromotion feature parameter vectors between the k − 1th scan and kth scan, , , and are the estimated movement of the three scatters according to the estimated micromotion feature parameters.

In the micromotion feature extraction method based on TBD, the energy accumulation value and the precision of micromotion feature extraction are both taken into full consideration to declare the presence of a target, where the precision of micromotion feature extraction is described by the consistency of the extracted micromotion feature parameter vectors and fitting error . Assume the minimum and maximum total number of scans that are jointly processed in TBD are and , respectively. Two detection thresholds are set: the lower detection threshold and the higher detection threshold . In the kth () scan, if the cumulative energy is larger than , we declare the presence of a target and the micromotion feature parameters can be obtained via fitting the obtained range trajectories. On the other hand, if the cumulative energy is larger than and smaller than , extract the micromotion feature parameter vector at kth scan, which goes on to cumulate energy for the data of scan, and extract the micromotion feature parameters at k + 1th scan. If and are both relatively small (satisfies and ), we can declare the presence of a target and get the micromotion feature parameters. The energy accumulation is no longer needed. Otherwise, updating the state transition set according to the extracted micromotion feature parameters (3) and the energy accumulation of the data of k + 2th scan is needed. Repeat the steps described above until it satisfies and or , or when it reached the scan.

3. Performance Analysis with Respect to Resource Consumption

Usually, multitargets may exist in different areas, and the limited resources should be allocated for each area according to the performance of detecting, tracking, and micromotion feature extraction. That means more resources should be allocated for the area which is of higher probability of target existence, and if the energy accumulation value or the precision of micromotion feature extraction is high enough to declare the presence of the target and obtain the accurate micromotion parameters, less resources will be further allocated to the area. Therefore, to achieve the adaptive resource allocation, the performance of detecting, tracking, and micromotion feature extraction with respect to resource consumption should be analyzed firstly.

The probability density function of cumulative energy can be calculated, respectively, under two different conditions: one is that only noise exists in the searching gate, the other is that target exists in the searching gate.

The size of is denoted as that means there are states in the searching gate which can transit to state . If the state is noise, the probability density function of measured value is denoted as . If the state is the target, the probability density function of measured value is denoted as .

For the first condition (i.e., only noise exists), all the states in are noise states. Assume that is independent and identically distributed for each , and the distribution function is denoted as . The distribution function of can be represented as , and the corresponding probability density function can be calculated by derivation:

Without loss of generality, and are independent; thus, the probability density function of can be calculated as where denotes convolution operation.

For the second condition (i.e., target exists), contains noise states and one target state. The target state is denoted as , the probability density function of is denoted as , and the corresponding distribution function is . The noise states are independent and identically distributed with the distribution function of . Then, the probability density function of can be calculated as

Thus, the probability density function of can be calculated as

In theory, the expression of the probability density function can be obtained according to (4), (5), (6), and (7). However, the analytical expression of is too complicated; thus, it is difficult to be calculated. Therefore, assume obeys the normal distribution [14], and the mean and variance of for the two conditions above can be calculated as follows.

For the first condition, assume the measured value of the noise state obeys the standard normal distribution, where the mean and the variance . Assume the cumulative energy of the noise state obeys the normal distribution, where the mean and variance are denoted as and , respectively. The mean and variance of the maximum of random variables which are independent and identically distributed with are denoted as and , it holds where where and are the probability density function and the distribution function of the standard normal distribution, respectively. Similarly, it holds where

According to (2), the recurrence formulas of the mean and variance of can be obtained as

At the first scan, is equal to ; therefore, it holds and . Then, the mean and variance of at each scan can be calculated according to (12) and (13), it means the probability density function of can be obtained and denoted as .

For the second condition, assume the measured value of the target state obeys the normal distribution, where the mean is and the variance is . Assume the cumulative energy of the target state obeys the normal distribution, where the mean and variance are denoted as and , respectively. Assume the cumulative energy of the noise state obeys the normal distribution, where the mean and variance are denoted as and , respectively. The defined variables as follows:

According to (2), the recurrence formulas of the mean and variance of can be obtained as

At the first scan, it holds and . Then, the probability density function of the cumulative energy of target state at each scan can be obtained and denoted as.

A binary probability hypothesis is defined as follows:

Obviously, the prior probability of can be obtained and denoted as and according to and . When , where is a very small neighborhood radius, and can be calculated as

Further, the posterior probability of can be calculated according to Bayesian theory where and are the prior probability of target exist and target not exist, respectively. When and are known, the posterior probability of target existence can be calculated according to . However, in practice, and are usually unknown. Therefore, the posterior probability of target existence is described by in this paper. Divide (19) by (20):

Obviously, the larger the is, the higher posterior probability of target existence is. Because of and , when , decreases monotonically and increases monotonically over . Therefore, increases monotonically, and we can think that the higher is, the higher posterior probability of target existence is. When or , the monotonic of is uncertain. Assume that there are H areas that need to be observed, the cumulative energy of the hth area is denoted as . Normalize and define the posterior probability of target existence in each area as

In fact, the posterior probability of the target existence in each area is calculated to guide the resource allocation strategy, that is, we want to allocate more resource for the area in which the posterior probability of target existence is higher. For the areas in which the cumulative energy satisfies , we can think that the higher means the higher posterior probability of target existence due to the monotonic increasing of , and more resources should be allocated; thus, is in proportion to as shown in (22). However, for the areas in which the cumulative energy satisfies , it is hard to determine the posterior probability of target existence according to because the monotonic of is uncertain. Therefore, for these areas, the equal distribution strategy of radar resource is considered, and the of these areas are equal to each other as shown in (22), which means the same resource will be allocated. Similarly, the equal distribution strategy is utilized for the areas in which the cumulative energy satisfies .

It should be noticed that the posterior probability of target existence shown as (22) is calculated with the only consideration of the cumulative energy . However, in the micromotion feature extraction method based on TBD, the energy accumulation value and the precision of micromotion feature extraction are both taken into full consideration to declare the presence of a target. Therefore, the final assessment function of target existence should include two aspects: one is the posterior probability of target existence shown in (22) which is calculated according to the energy accumulation value, and the other is the precision of micromotion feature extraction.

The micromotion feature parameters are extracted by fitting the obtained range trajectory according to the mathematical expression of mD effect. Thus, the performance of micromotion feature extraction depends on the target tracking performance. At the kth scan, the range state of target scatters can be represented as , the measured value of is denoted as , and the measured value vector of range state can be represented as . All the measured value vectors of the former k scans are denoted as , then the posterior probability of can be represented as where

Equations (23), (24), and (25) describe a recursion solving method to obtain , and we can see that the factors which will influence the posterior probability are and , where is the probability density function of the measured value of range state and is the probability density function of range state transition. Both and obey normal distribution: where is the variance of measurement of the pth observable scatterer, and is the correlation coefficient between the measurements of the p₁th and p₂th observable scatterer. Without loss of generality, the measurement of each observable scatterer has the same variance; thus, we can denote , and the Cramer-Rao lower bound (CRLB) of can be represented as where is the velocity of electromagnetic wave, is the mean square bandwidth, and is the SNR of the echo signal, which is proportional to the dwell time .