转发和使用请注明来源,以下为本人精心整理,还请尊重本人劳动成果与产权!由于本人现有知识和能力有限,如存在错误之处请指正!下面为正文内容:
1.S-CFAR检测算法(Switching,开关CFAR)
S-CFAR检测算法是通过参考单元内数据确定筛选门限,将小于筛选门限的参考单元划分至S0,将大于筛选门限的参考单元划分至S1,当S0的单元数目n0大于抗干扰数目时,可用S0来估计杂波背景功率水平。
实现的步骤具体可以分为三步:
(1)根据CA的思想求解出门限水平$T=\alpha Z$,其中$\alpha$为衰减系数(通过人为选择)。
(2)根据(1)中求解得到的门限水平T分别与参考窗内每个单元采样值$x_i$进行比较,如果$x_i>T$则将$x_i$放入$S_1$序列,否则将$x_i$放入$S_0$序列中。
(3)如果$S_0$序列中单元数目$n_0$超过整数门限$N_T$,那么采用$S_0$中的样本估计阈值,反之则利用全体参考单元的样本估计阈值。参考单元中是否存在目标的判决规则如下:
$x>\frac{\beta_0}{n_0}\Sigma_{x_i=S_0} x_i,n_0>N_T$
$x>\frac{\beta_1}{2N}\Sigma_{i=1}^{2N} x_i,n_0 <= N_T$
其中,S-CFAR检测算法的检测性能与$\alpha$、$\beta_0$、$\beta_1$和$N_T$有关。S-CFAR的设计流程中可以简化设计使$\beta_0=\beta_1=\beta$,其余参数的设计如下:(1)设计干扰目标数目(最大可容纳的干扰目标数量)为$N_i$,整数门限$N_T$满足关系$N_T=2N-N_i-1$.(2)在选定$N_T$以后,对每个区间的$\alpha$值,根据$P_{fa}$式可以计算出来门限系数$\beta$。
改进的SOS-CFAR算法中,更新了判决规则为如下,其中$k$为选择序号。
$x>\beta_0 x(k) x_i,n_0>N_T$
$x>\frac{\beta_1}{2N}\Sigma_{i=1}^{2N} x_i,n_0 <= N_T$
比较S-CFAR与SOS-CFAR两种算法的区别主要在于更新了$n_0>N_T$时的判决规则(门限水平估计准则),这两种算法的框图可以如下图表示(图片绘制较粗糙,但可以反映原理)。
为什么会出现上述两种判决规则,如何理解$n_0$与整数门限$N_T$间的关系呢?我的理解是,如果背景杂波占据了$N_t/N$比例(这个比例比较大)的参考窗,那么可以用这部分的参考单元即$S
_0$的采样值作为功率水平的估计(估计方式可以采用CA,OS等);反之如果背景杂波占据的比例非常小,其强度可以忽略不计,则可以用参考窗内全体采样值的平均进行估计(准确地说此时参考窗内被强杂波占据)。
理解判决规则后自然需要推导出S-CFAR算法的虚警概率$P_{FA}$,经典版本S-CFAR的虚警概率具体形式如下:
$$
P\left( N,N_T,\alpha ,\beta _0,\beta _1 \right) =\frac{1}{1+\sigma}\sum_{n_0=0}^{N_t}{\sum_{m=M_0}^{min\left( M,n_0 \right)}{\sum_{n=0}^{n_0-m}{\sum_{k=0}^m{\left( \begin{array}{c}
M\\
m\\
\end{array} \right)}}}}\left( \begin{array}{c}
2N-M\\
n_0-m\\
\end{array} \right) \left( \begin{array}{c}
n_0-m\\
n\\
\end{array} \right) \left( \begin{array}{c}
m\\
k\\
\end{array} \right) \frac{\left( -1 \right) ^{k+n}V\left( k,n \right)}{\left( 1+\sigma _I \right) ^M}+\frac{1}{1+\sigma}\sum_{n_0=N_t+1}^{2N}{\sum_{m=M_0}^{min\left( M,n_0 \right)}{\sum_{n=0}^{n_0-m}{\sum_{k=0}^m{\left( \begin{array}{c}
M\\
m\\
\end{array} \right)}}}}\left( \begin{array}{c}
2N-M\\
n_0-m\\
\end{array} \right) \left( \begin{array}{c}
n_0-m\\
n\\
\end{array} \right) \left( \begin{array}{c}
m\\
k\\
\end{array} \right) \frac{\left( -1 \right) ^{k+n}W\left( k,n \right)}{\left( 1+\sigma _I \right) ^m}
$$
其中,$W(k,n)$的具体形式如下:
$$
\boldsymbol{W}\left( \boldsymbol{k},\boldsymbol{n} \right) =\frac{\boldsymbol{\xi }_{\boldsymbol{k},\boldsymbol{n}}^{\boldsymbol{n}_0}\left[ 1-\frac{\boldsymbol{\xi }_{k,\boldsymbol{N}}\boldsymbol{\sigma }_{\boldsymbol{I}}}{\left( 1+\sigma _I \right) \left( \boldsymbol{\xi }_{k,\boldsymbol{n}}+\boldsymbol{\rho }_{k,\boldsymbol{n}}+\left( 1+\sigma \right) ^{-1} \right)} \right] ^{-\boldsymbol{m}}}{\left( \boldsymbol{\rho }_{k,\boldsymbol{n}}+\left( 1+\sigma \right) ^{-1} \right) \left( \boldsymbol{\xi }_{k,\boldsymbol{n}}+\boldsymbol{\rho }_{k,\boldsymbol{n}}+\left( 1+\sigma \right) ^{-1} \right) ^{\boldsymbol{n}_0}}
\\
\boldsymbol{\xi }_{k,\boldsymbol{n}}=\boldsymbol{n}_0\beta _0^{-1}-\left( \boldsymbol{k}+\boldsymbol{n} \right) \alpha \geqslant 0
\\
\boldsymbol{\rho }_{k,\boldsymbol{n}}=\alpha \left[ \frac{\boldsymbol{M}-\boldsymbol{m}+\boldsymbol{k}}{1+\sigma _I}+2\boldsymbol{N}-\boldsymbol{M}-\boldsymbol{n}_0+\boldsymbol{m}+\boldsymbol{n} \right]
$$
其中,$V(k,n)$的具体形式如下:
$$
\boldsymbol{V}\left( \boldsymbol{k},\boldsymbol{n} \right) =\frac{\boldsymbol{\xi }_{\boldsymbol{k},\boldsymbol{n}}^{2\boldsymbol{N}}\left[ 1-\frac{\boldsymbol{\xi }_{k,\boldsymbol{N}}\boldsymbol{\sigma }_{\boldsymbol{I}}}{\left( 1+\sigma _I \right) \left( \boldsymbol{\xi }_{k,\boldsymbol{n}}+\boldsymbol{\rho }_{k,\boldsymbol{n}}+\left( 1+\sigma \right) ^{-1} \right)} \right] ^{-\boldsymbol{M}}}{\left( \boldsymbol{\rho }_{k,\boldsymbol{n}}+\left( 1+\sigma \right) ^{-1} \right) \left( \boldsymbol{\xi }_{k,\boldsymbol{n}}+\boldsymbol{\rho }_{k,\boldsymbol{n}}+\left( 1+\sigma \right) ^{-1} \right) ^{2\boldsymbol{N}}}
\\
\boldsymbol{\xi }_{k,\boldsymbol{n}}=2\boldsymbol{N}\beta _{1}^{-1}-\left( 2\boldsymbol{N}-\boldsymbol{n}_0+\boldsymbol{k}+\boldsymbol{n}+\alpha \right) \geqslant 0
\\
\boldsymbol{\rho }_{k,\boldsymbol{n}}=\alpha \left[ \frac{\boldsymbol{M}-\boldsymbol{m}+\boldsymbol{k}}{1+\sigma _I}+2\boldsymbol{N}-\boldsymbol{M}-\boldsymbol{n}_0+\boldsymbol{m}+\boldsymbol{n} \right]
$$
上述虚警概率和相关公式主要参考了“Constant false-alarm rate algorithm based on test cell information”等论文(可在谷歌学术上搜索得到),具体公式推导由于篇幅问题不再展开。从虚警概率公式可见,该公式与先前的恒虚警率检测算法的虚警概率公式(多为关于门限系数$\alpha$的闭合函数形式)不同,由多个变量(包含衰减系数$\alpha$,整数门限$N_t$,门限系数$\beta$,功率系数$\sigma$)共同作用,因此采用二分法求解门限系数显得困难,故多篇论文中采用了交叉验证的方式来求解合适的门限系数$\beta$。
设置功率系数$\sigma_1$和$\sigma$为0,参考窗长度$2N=64$即$N=32$,设置整数门限$N_t=32$,设置衰减系数$\alpha$为[0.1,1]并且步进为0.1,设置门限系数$\beta$和$\beta_1$为[10:50]并且步进为0.1,代入上述的虚警概率公式中求解并取对数形式,可以得到虚警概率关于不同门限系数和衰减系数的曲线如下图所示.可以看到当衰减系数从1降低至0.1时,S-CFAR的虚警概率曲线逐渐偏离CA-CFAR的虚警概率曲线,这意味着要实现相同的检测性能时S-CFAR需要花销比CA-CFAR更大的门限系数代价,同时在均匀背景下为实现相同的性能S-CFAR需要有更多的CFAR损失;而衰减系数更大时其逼近CA,这不利于多目标背景下的目标检测。因此在衰减系数的选择上需要进行折中选择,这里可以选择门限系数$\alpha=0.3$.
选择完合适的衰减系数后需要进一步确定整数门限$N_t$,整数门限的选择影响着最大可容纳干扰数目($N_i=nN-N_t-1$)。从图中可见,随着整数门限的下降,虚警概率$P_{fa}$关于门限系数$\beta$的曲线会逐渐偏离$N_t=32$时的曲线。整数门限越大,意味着参考窗内可容纳干扰数目越小,对多目标背景下目标检测越不利。因此,选择合适的整数门限,对多目标背景检测是有意义的。这里可以选择整数门限$N_t=17$。
综上分析,这里可以选择的参数为:虚警概率$p_{fa}=10^{-5}$,衰减系数$\alpha=0.3$,整数门限$N_t=17$,门限系数$\beta=15.03$.
以上程序的代码如下所示。
%% S-CFAR的虚警概率计算
clc;clear;close all; %% 参数设置
sigma = 0;
sigmaI = 0;
alpha_array = 0.1:0.1:1.0; %衰减系数
beta_array = 10:0.1:50;
M = 0;
N = 32;
Nt = 17;
Pfa = zeros(length(alpha_array),length(beta_array)); %% 计算虚警概率
for index = 1:length(alpha_array)
alpha = alpha_array(index);
for index1 = 1:length(beta_array)
beta0 = beta_array(index1);
Qn0 = 0;
for n0 = 0:Nt
M0 = max(0,n0 - 2 * N + M);
for m = M0:min(n0,M)
for n = 0:(n0-m)
for k = 0:m
rou = alpha * ((M - m + k) / (1 + sigmaI) + 2 * N - M - n0 + m + n);
phy = 2 * N / beta0 - (2 * N - n0 + k + n) * alpha;
if(phy < 0)
break;
else
V = phy^(2*N) * (1-(phy*sigmaI/(1+sigmaI)/(phy+rou+(1+sigma)^(-1)))^(-M)) / (rou+(1+sigma)^(-1)) / (phy+rou+(1+sigma)^(-1))^(2*N);
Qn0 = Qn0 + 1 / (1+sigma) * nchoosek(M,m) * nchoosek(2*N-M,n0-m) * nchoosek(n0-m,n) * nchoosek(m,k) * (-1)^(k+n) / (1+sigmaI)^M * V;
end
end
end
end
end Pn0 = 0;
for n0 = Nt+1:2*N
M0 = max(0,n0 - 2 * N + M);
for m = M0:min(M,n0)
for n = 0:n0-m
for k = 0:m
phy = n0 / beta0 - (k + n) * alpha;
rou = alpha * ((M - m + k) / (1 + sigmaI) + 2* N - M - n0 + m + n);
if phy < 0
break;
else
W = phy^n0 * (1 - (phy*sigmaI/(1+sigmaI))/(phy+rou+(1+sigma)^(-1)))^(-m)/(rou +(1+sigma)^(-1))/(phy + rou + (1+sigma)^(-1))^n0;
Pn0 = Pn0 + 1 / (1+sigma) * nchoosek(M,m) * nchoosek(2*N-M,n0-m) * nchoosek(n0-m,n) * nchoosek(m,k) * (-1)^(k+n) * W / (1+sigmaI)^m;
end
end
end
end
end
Pfa(index,index1) = Pn0 + Qn0;
end
end
Pfa_ca = (1+beta_array/2/N).^(-2*N);
%% 绘制曲线
plot(beta_array,log10(Pfa_ca),'Color','#FFD700','LineWidth',2,'Marker','<','MarkerIndices',2:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(1,:)),'Color','#DC143C','LineWidth',2,'Marker','+','MarkerIndices',4:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(2,:)),'Color','#FF1493','LineWidth',2,'Marker','*','MarkerIndices',6:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(3,:)),'Color','#8B008B','LineWidth',2,'Marker','v','MarkerIndices',8:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(4,:)),'Color','#483D8B','LineWidth',2,'Marker','^','MarkerIndices',10:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(5,:)),'Color','#0000FF','LineWidth',2,'Marker','o','MarkerIndices',12:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(6,:)),'Color','#6495ED','LineWidth',2,'Marker','d','MarkerIndices',14:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(7,:)),'Color','#00BFFF','LineWidth',2,'Marker','p','MarkerIndices',16:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(8,:)),'Color','#00CED1','LineWidth',2,'Marker','s','MarkerIndices',18:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(9,:)),'Color','#00FA9A','LineWidth',2,'Marker','x','MarkerIndices',20:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(10,:)),'Color','#DAA520','LineWidth',2,'Marker','>','MarkerIndices',22:4:length(beta_array));hold on;
h = legend('CA','\alpha=0.1','\alpha=0.2','\alpha=0.3','\alpha=0.4','\alpha=0.5','\alpha=0.6','\alpha=0.7','\alpha=0.8','\alpha=0.9','\alpha=1.0','NumColumns',2);
set(h,'edgecolor','none');
xlabel('\beta');
ylabel('log_{10}Pfa');
grid minor;
%% S-CFAR的虚警概率计算
clc;clear;close all; %% 参数设置
sigma = 0;
sigmaI = 0;
alpha = 0.3; %衰减系数
beta_array = 5:0.1:50;
M = 0;
N = 32;
Nt_array = 12:5:32;
Pfa = zeros(length(Nt_array),length(beta_array)); %% 计算虚警概率
for index = 1:length(Nt_array)
Nt = Nt_array(index);
for index1 = 1:length(beta_array)
beta0 = beta_array(index1);
Qn0 = 0;
for n0 = 0:Nt
M0 = max(0,n0 - 2 * N + M);
for m = M0:min(n0,M)
for n = 0:(n0-m)
for k = 0:m
rou = alpha * ((M - m + k) / (1 + sigmaI) + 2 * N - M - n0 + m + n);
phy = 2 * N / beta0 - (2 * N - n0 + k + n) * alpha;
if(phy < 0)
break;
else
V = phy^(2*N) * (1-(phy*sigmaI/(1+sigmaI)/(phy+rou+(1+sigma)^(-1)))^(-M)) / (rou+(1+sigma)^(-1)) / (phy+rou+(1+sigma)^(-1))^(2*N);
Qn0 = Qn0 + 1 / (1+sigma) * nchoosek(M,m) * nchoosek(2*N-M,n0-m) * nchoosek(n0-m,n) * nchoosek(m,k) * (-1)^(k+n) / (1+sigmaI)^M * V;
end
end
end
end
end Pn0 = 0;
for n0 = Nt+1:2*N
M0 = max(0,n0 - 2 * N + M);
for m = M0:min(M,n0)
for n = 0:n0-m
for k = 0:m
phy = n0 / beta0 - (k + n) * alpha;
rou = alpha * ((M - m + k) / (1 + sigmaI) + 2* N - M - n0 + m + n);
if phy < 0
break;
else
W = phy^n0 * (1 - (phy*sigmaI/(1+sigmaI))/(phy+rou+(1+sigma)^(-1)))^(-m)/(rou +(1+sigma)^(-1))/(phy + rou + (1+sigma)^(-1))^n0;
Pn0 = Pn0 + 1 / (1+sigma) * nchoosek(M,m) * nchoosek(2*N-M,n0-m) * nchoosek(n0-m,n) * nchoosek(m,k) * (-1)^(k+n) * W / (1+sigmaI)^m;
end
end
end
end
end
Pfa(index,index1) = Pn0 + Qn0;
end
end %% 绘制曲线
plot(beta_array,log10(Pfa(1,:)),'Color','#DC143C','LineWidth',2,'Marker','+','MarkerIndices',2:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(2,:)),'Color','#FF1493','LineWidth',2,'Marker','*','MarkerIndices',4:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(3,:)),'Color','#8B008B','LineWidth',2,'Marker','v','MarkerIndices',6:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(4,:)),'Color','#483D8B','LineWidth',2,'Marker','^','MarkerIndices',8:4:length(beta_array));hold on;
plot(beta_array,log10(Pfa(5,:)),'Color','#0000FF','LineWidth',2,'Marker','o','MarkerIndices',10:4:length(beta_array));hold on;
h = legend('Nt=12','Nt=17','Nt=22','Nt=27','Nt=32','NumColumns',1);
set(h,'edgecolor','none');
xlabel('\beta');
ylabel('log_{10}Pfa');
grid minor;
将S-CFAR在邻近单目标背景下进行仿真,随机产生在200个距离单元内产生信杂比分别为15dB、20dB的邻近目标,经典均值类ML-CFAR和有序统计类OS-CFAR以及S-CFAR的检测结果如下图所示,OS-CFAR和S-CFAR成功检测除了邻近目标,具有较好的多目标检测性能。
具体代码如下所示。
clc;clear;close all;
%% 均匀背景
% % lambda = 1; %指数分布参数
% % dB = 20; %背景杂波功率
% % SCR = 15; %信杂比
% % num = [1,1024]; %距离单元设置
% % [x,target] = uniform_background(lambda,dB,SCR,num); %产生均匀背景 %% 多目标背景
lambda = 1; %指数分布参数
dB = 20; %背景杂波功率
SCR1 = 15; %信杂比
SCR2 = 20; %信杂比
num = [1,200]; %距离单元设置
localRule = [20,3,10]; %距离规则
[x,target] = multi_background(lambda,dB,SCR1,SCR2,num,localRule); %产生邻近单目标背景 %% CFAR参数
Pfa = 1e-6; %虚警概率
NSlide = 32;%滑动单元大小
Pro_cell = 4; %保护单元大小 %% 绘图参数
len = num(2);
plotNum = 2;
markersize = 5;
LineWidth = 1.5;
figure(1);
plot(target(:,1),form_Power_P2DB(target(:,2)),'s','Color',[1 0 1],'MarkerSize',markersize+2,'LineWidth',LineWidth),hold on;
plot(form_Power_P2DB(x),'Color','[0.5 0.5 1]','LineWidth',LineWidth),hold on; %% 恒虚警率检测算法测试
Nt = 17;beta = 15.03;
rate = 0.75; %选择序号
alpha(1,1) = ca_threhold(Pfa,NSlide); %CA-CFAR标称因子计算
alpha(2,1) = go_threhold(Pfa,NSlide); %GO-CFAR标称因子计算
alpha(3,1) = so_threhold(Pfa,NSlide); %SO-CFAR标称因子计算
alpha(4,1) = os_threhold(Pfa,NSlide,rate); %OS-CFAR标称因子计算 [result_S] = func_cfar_s(x,beta,NSlide,Nt,Pro_cell); %求解S-CFAR门限
[result_CA] = func_cfar_ca(x,alpha(1,1),NSlide,Pro_cell); %求解CA-CFAR门限
[result_GO] = func_cfar_go(x,alpha(2,1),NSlide,Pro_cell); %求解GO-CFAR门限
[result_SO] = func_cfar_so(x,alpha(3,1),NSlide,Pro_cell); %求解SO-CFAR门限
[result_OS] = func_cfar_os(x,alpha(4,1),NSlide,Pro_cell,rate); %求解OS-CFAR门限
%% 绘制检测曲线
[T_opt] = T_opt_solve(Pfa,lambda,dB,num); %求解理想门限
plot(form_Power_P2DB(T_opt),'Color','#3CB371','Marker','+','MarkerIndices',2:plotNum:len,'LineWidth',LineWidth);
hold on;
plot(form_Power_P2DB(result_CA{1,2}),'Color','#DC143C','Marker','*','MarkerIndices',4:plotNum:len,'LineWidth',LineWidth);
hold on;
plot(form_Power_P2DB(result_GO{1,2}),'Color','#ADFF2F','Marker','v','MarkerIndices',6:plotNum:len,'markersize',markersize,'LineWidth',LineWidth);
hold on;
plot(form_Power_P2DB(result_SO{1,2}),'Color','#8A2BE2','Marker','^','MarkerIndices',8:plotNum:len,'markersize',markersize,'LineWidth',LineWidth);
hold on;
plot(form_Power_P2DB(result_OS{1,2}),'Color','#0000CD','Marker','o','MarkerIndices',10:plotNum:len,'markersize',markersize,'LineWidth',LineWidth);
hold on;
plot(form_Power_P2DB(result_S{1,2}),'Color','#7CFC00','Marker','p','MarkerIndices',12:plotNum:len,'markersize',markersize,'LineWidth',LineWidth);
hold on
grid minor;
xlabel('\fontname{宋体}距离单元');
ylabel('\fontname{宋体}功率值\fontname{Times New Roman}(dB)');
ylim([0 50]);
h = legend('TARGET','CLUTTER','OPT','CA-CFAR','GO-CFAR','SO-CFAR','OS-CFAR','S-CFAR','Location','SouthEast','NumColumns',1);
set(h,'edgecolor','none')
%% 本程序主要实现S-CFAR恒虚警率检测算法的函数形式
function result = func_cfar_s(x,beta,NSlide,Nt,Pro_cell)
%x:原始杂波数据
%alpha:标称因子
%Nslide:滑动窗大小
%Pro_cell:保护单元大小
%Nt:整数门限 persistent left;
persistent right;
persistent Half_Slide;
persistent Half_Pro_cell;
persistent len; if isempty(left)
left = 1 + Half_Pro_cell + Half_Slide; %设置左边界
right = length(x) - Half_Pro_cell - Half_Slide; %设置右边界
Half_Slide = NSlide / 2; %半滑动窗
Half_Pro_cell = Pro_cell / 2; %一侧保护单元长度
len = length(x); %杂波单元
end T = zeros(1,len); %CMLD检测阈值
target = java.util.LinkedList; %利用Java链表来实现目标的存储 for i = 1:left - 1 %左边界
cell_right = x(1,i + Half_Pro_cell + 1 : i + Half_Slide * 2 + Half_Pro_cell);
S0 = cell_right(cell_right <= mean(cell_right));
S1 = cell_right(cell_right > mean(cell_right));
if length(S0) > Nt
T(1,i) = mean(S0) * beta;
else
T(1,i) = mean(cell_right) * beta;
end
if T(1,i) < x(i)
target.add(i); %加入目标
end
end for i = left:right %中间区域
cell_left = x(1,i - Half_Pro_cell - Half_Slide : i - Half_Pro_cell - 1);
cell_right = x(1,i + Half_Pro_cell + 1 : i + Half_Pro_cell + Half_Slide);
cell = [cell_left,cell_right];
S0 = cell(cell <= mean(cell));
S1 = cell(cell > mean(cell));
if length(S0) > Nt
T(1,i) = mean(S0) * beta;
else
T(1,i) = mean(cell) * beta;
end
if T(1,i) < x(i)
target.add(i); %加入目标
end
end for i = right + 1 : len
cell_left = x(1,i - Half_Pro_cell - Half_Slide * 2 : i - Half_Pro_cell - 1);
S0 = cell_left(cell_left <= mean(cell_left));
S1 = cell_left(cell_left > mean(cell_left));
if length(S0) > Nt
T(1,i) = mean(S0) * beta;
else
T(1,i) = mean(cell_left) * beta;
end
if T(1,i) < x(i)
target.add(i);
end
end result = {'CFAR_S',T,target}; %采用字典类型
end
