在统计学 和概率论 中,点过程 或点场 是随机位于数学空间(例如实数线 或欧氏空间) 上的数学点 的集合。 点过程可用于空间数据分析 [ 1] [ 2] [ 3] [ 4]
点过程有不同的数学解释,例如解释为一个随机计数测度 或一个随机集合。[ 5] [ 6] [ 7] [ 8] [ 8] [ a]
n
{\displaystyle n}
[ 11] [ 12] [ 13] [ 8] [ 14]
实轴上的点过程是一个易于研究的重要特例,因为其中的点有一个自然的序,并且整个点过程可以用点之间的(随机)间隔来完全描述。这些点过程经常用于建模一个时间段上的随机事件,比如队列中顾客的到达(排队论 )、神经元中的脉冲(计算神经科学 )、盖革计数器 中的粒子、电信网络 中广播电台的位置[ 15] 万维网 上的搜索。
在数学中,点过程是一种随机元素 ,其值取为是集合
S
{\displaystyle S}
局部有限 计数测度 ,但对于更实际的目的来说,将点分布视为
S
{\displaystyle S}
极限点 的可数 子集就足够了。[需要解释
设有一概率空间
(
Ω
,
F
,
P
)
{\displaystyle (\Omega ,{\mathcal {F}},P)}
局部紧 的第二可数 豪斯多夫空间
S
{\displaystyle S}
S
{\displaystyle {\mathcal {S}}}
S
{\displaystyle S}
博雷尔σ-代数 ,从而形成一博雷尔可测空间
(
S
,
S
)
{\displaystyle (S,{\mathcal {S}})}
(
Ω
,
F
)
{\displaystyle (\Omega ,{\mathcal {F}})}
(
S
,
S
)
{\displaystyle (S,{\mathcal {S}})}
转移核
ξ
{\displaystyle \xi }
ζ
:
Ω
×
S
↦
Z
+
{\displaystyle \zeta :\Omega \times {\mathcal {S}}\mapsto \mathbb {Z} _{+}}
给定任意一个样本点
ω
∈
Ω
{\displaystyle \omega \in \Omega }
ξ
(
ω
,
⋅
)
{\displaystyle \xi (\omega ,\cdot )}
(
S
,
S
)
{\displaystyle (S,{\mathcal {S}})}
给定任意一个博雷尔集
B
∈
S
{\displaystyle B\in {\mathcal {S}}}
ξ
(
⋅
,
B
)
:
Ω
→
Z
+
{\displaystyle \xi (\cdot ,B):\Omega \to \mathbb {Z} _{+}}
(
Ω
,
F
,
P
)
{\displaystyle (\Omega ,{\mathcal {F}},P)}
这个转移核给出了一个随机测度 ,即取值为一个测度的随机元素。为此
ξ
{\displaystyle \xi }
ω
∈
Ω
{\displaystyle \omega \in \Omega }
ξ
ω
∈
M
(
S
)
{\displaystyle \xi _{\omega }\in {\mathcal {M}}({\mathcal {S}})}
Ω
→
M
(
S
)
{\displaystyle \Omega \to {\mathcal {M}}({\mathcal {S}})}
M
(
S
)
{\displaystyle {\mathcal {M}}({\mathcal {S}})}
S
{\displaystyle S}
可测 的,需为
M
(
S
)
{\displaystyle {\mathcal {M}}({\mathcal {S}})}
π
B
:
μ
↦
μ
(
B
)
{\displaystyle \pi _{B}:\mu \mapsto \mu (B)}
B
∈
S
{\displaystyle B\in {\mathcal {S}}}
相对紧 的。于是配备σ-代数后的
M
(
S
)
{\displaystyle {\mathcal {M}}({\mathcal {S}})}
ξ
{\displaystyle \xi }
ω
∈
Ω
{\displaystyle \omega \in \Omega }
ξ
ω
{\displaystyle \xi _{\omega }}
S
{\displaystyle S}
一个
S
{\displaystyle S}
ξ
{\displaystyle \xi }
S
{\displaystyle S}
R
n
{\displaystyle \mathbb {R} ^{n}}
[
0
,
∞
)
{\displaystyle [0,\infty )}
R
n
{\displaystyle \mathbb {R} ^{n}}
ξ
{\displaystyle \xi }
粒子过程 。
点过程 这一术语暗示
ξ
{\displaystyle \xi }
随机过程 ,但由于
S
{\displaystyle S}
全序 的指标集,这一术语不甚合适。
点过程
ξ
{\displaystyle \xi }
ξ
=
∑
i
=
1
n
δ
X
i
,
{\displaystyle \xi =\sum _{i=1}^{n}\delta _{X_{i}},}
其中
δ
{\displaystyle \delta }
狄拉克测度 ,
n
{\displaystyle n}
X
i
{\displaystyle X_{i}}
S
{\displaystyle S}
X
i
{\displaystyle X_{i}}
几乎必然 是不同的(或者说,对于所有
x
∈
R
d
{\displaystyle x\in \mathbb {R} ^{d}}
ξ
(
x
)
≤
1
{\displaystyle \xi (x)\leq 1}
简单点过程
事件(事件空间中的事件,即一系列点)还可用计数记号来表示:每个实例都表示为一个整数值的连续函数
N
:
R
→
Z
0
+
{\displaystyle N:{\mathbb {R} }\rightarrow {\mathbb {Z} _{0}^{+}}}
N
(
t
1
,
t
2
)
=
∫
t
1
t
2
ξ
(
t
)
d
t
,
{\displaystyle N(t_{1},t_{2})=\int _{t_{1}}^{t_{2}}\xi (t)\,dt,}
即观测区间
(
t
1
,
t
2
]
{\displaystyle (t_{1},t_{2}]}
N
t
1
,
t
2
{\displaystyle N_{t_{1},t_{2}}}
N
T
{\displaystyle N_{T}}
N
0
,
T
{\displaystyle N_{0,T}}
N
(
T
)
{\displaystyle N(T)}
一个点过程
ξ
{\displaystyle \xi }
E
ξ
{\displaystyle E\xi }
S
{\displaystyle S}
B
{\displaystyle B}
ξ
{\displaystyle \xi }
B
{\displaystyle B}
E
ξ
(
B
)
:=
E
(
ξ
(
B
)
)
,
∀
B
∈
B
.
{\displaystyle E\xi (B):=E{\bigl (}\xi (B){\bigr )},\quad \forall B\in {\mathcal {B}}.}
一个点过程
N
{\displaystyle N}
Ψ
N
(
f
)
{\displaystyle \Psi _{N}(f)}
N
{\displaystyle N}
f
{\displaystyle f}
[
0
,
∞
)
{\displaystyle [0,\infty )}
Ψ
N
(
f
)
=
E
[
exp
(
−
N
(
f
)
)
]
{\displaystyle \Psi _{N}(f)=E[\exp(-N(f))]}
它们起着与随机变量 的特征函数 类似的作用。一个重要定理表明:若两个点过程的拉普拉斯泛函相等,则它们有相同的法则
点过程的
n
{\displaystyle n}
ξ
n
{\displaystyle \xi ^{n}}
S
n
{\displaystyle S^{n}}
ξ
n
(
A
1
×
⋯
×
A
n
)
=
∏
i
=
1
n
ξ
(
A
i
)
{\displaystyle \xi ^{n}(A_{1}\times \cdots \times A_{n})=\prod _{i=1}^{n}\xi (A_{i})}
根据单调类定理 ,这唯一地定义了
(
S
n
,
B
(
S
n
)
)
{\displaystyle (S^{n},{\mathcal {B}}(S^{n}))}
E
ξ
n
(
⋅
)
{\displaystyle E\xi ^{n}(\cdot )}
n
{\displaystyle n}
矩测度 。一阶矩测度即是平均值测度。
设
S
=
R
d
{\displaystyle S=\mathbb {R} ^{d}}
ξ
{\displaystyle \xi }
勒贝格测度 的联合强度 是这样一些函数
ρ
(
k
)
:
(
R
d
)
k
→
[
0
,
∞
)
{\displaystyle \rho ^{(k)}:(\mathbb {R} ^{d})^{k}\to [0,\infty )}
B
1
,
…
,
B
k
{\displaystyle B_{1},\ldots ,B_{k}}
E
(
∏
i
ξ
(
B
i
)
)
=
∫
B
1
×
⋯
×
B
k
ρ
(
k
)
(
x
1
,
…
,
x
k
)
d
x
1
⋯
d
x
k
.
{\displaystyle E\left(\prod _{i}\xi (B_{i})\right)=\int _{B_{1}\times \cdots \times B_{k}}\rho ^{(k)}(x_{1},\ldots ,x_{k})\,dx_{1}\cdots dx_{k}.}
对于点过程来说,联合强度并不总是存在。鉴于随机变量 的矩 在许多情况下可确定该随机变量,因此也希望联合强度也有类似的结果。事实上,已有许多案例表明了这一点。
一个
R
d
{\displaystyle \mathbb {R} ^{d}}
ξ
{\displaystyle \xi }
ξ
+
x
:=
∑
i
=
1
N
δ
X
i
+
x
{\displaystyle \xi +x:=\sum _{i=1}^{N}\delta _{X_{i}+x}}
x
∈
R
d
{\displaystyle x\in \mathbb {R} ^{d}}
ξ
{\displaystyle \xi }
E
ξ
(
⋅
)
=
λ
‖
⋅
‖
{\displaystyle E\xi (\cdot )=\lambda \|\cdot \|}
λ
≥
0
{\displaystyle \lambda \geq 0}
‖
⋅
‖
{\displaystyle \|\cdot \|}
λ
{\displaystyle \lambda }
强度 。
R
d
{\displaystyle \mathbb {R} ^{d}}
R
d
{\displaystyle \mathbb {R} ^{d}}
下文是一些
R
d
{\displaystyle \mathbb {R} ^{d}}
点过程最简单、最普遍的例子是泊松点过程 ,它是泊松过程 的空间推广。实轴上的泊松(计数)过程可以用两个性质来刻画:不相交区间内的点(或事件)的数量是独立的,且它们服从泊松分布 。泊松点过程也可以使用这两个性质来定义。也就是说,称一个点过程
ξ
{\displaystyle \xi }
对于不相交的子集
B
1
,
…
,
B
n
{\displaystyle B_{1},\ldots ,B_{n}}
ξ
(
B
1
)
,
…
,
ξ
(
B
n
)
{\displaystyle \xi (B_{1}),\ldots ,\xi (B_{n})}
对于任一有界子集
B
{\displaystyle B}
ξ
(
B
)
{\displaystyle \xi (B)}
λ
‖
B
‖
{\displaystyle \lambda \|B\|}
泊松分布 ,其中
‖
⋅
‖
{\displaystyle \|\cdot \|}
勒贝格测度 。 这两个条件可以结合起来写成如下形式:对于任何不相交的有界子集
B
1
,
…
,
B
n
{\displaystyle B_{1},\ldots ,B_{n}}
k
1
,
…
,
k
n
{\displaystyle k_{1},\ldots ,k_{n}}
Pr
[
ξ
(
B
i
)
=
k
i
,
1
≤
i
≤
n
]
=
∏
i
e
−
λ
‖
B
i
‖
(
λ
‖
B
i
‖
)
k
i
k
i
!
.
{\displaystyle \Pr[\xi (B_{i})=k_{i},1\leq i\leq n]=\prod _{i}e^{-\lambda \|B_{i}\|}{\frac {(\lambda \|B_{i}\|)^{k_{i}}}{k_{i}!}}.}
常数
λ
{\displaystyle \lambda }
强度 。注意泊松点过程可由单个参数
λ
{\displaystyle \lambda }
λ
‖
B
‖
{\displaystyle \lambda \|B\|}
∫
B
λ
(
x
)
d
x
{\displaystyle \int _{B}\lambda (x)\,dx}
λ
{\displaystyle \lambda }
R
d
{\displaystyle \mathbb {R} ^{d}}
一个考克斯过程 (冠名于戴维·科克斯 )是对泊松点过程的一种推广,其中的
λ
‖
B
‖
{\displaystyle \lambda \|B\|}
随机测度 。更正式地说,设
Λ
{\displaystyle \Lambda }
ξ
{\displaystyle \xi }
给定
Λ
(
⋅
)
{\displaystyle \Lambda (\cdot )}
B
{\displaystyle B}
ξ
(
B
)
{\displaystyle \xi (B)}
Λ
(
B
)
{\displaystyle \Lambda (B)}
对于有限个任意的不相交子集
B
1
,
…
,
B
n
{\displaystyle B_{1},\ldots ,B_{n}}
ξ
(
B
1
)
,
…
,
ξ
(
B
n
)
{\displaystyle \xi (B_{1}),\ldots ,\xi (B_{n})}
Λ
(
B
1
)
,
…
,
Λ
(
B
n
)
,
{\displaystyle \Lambda (B_{1}),\ldots ,\Lambda (B_{n}),}
容易看出,(齐次和非齐次)泊松点过程是考克斯点过程的特例。考克斯点过程的平均测度
E
ξ
(
⋅
)
=
E
Λ
(
⋅
)
{\displaystyle E\xi (\cdot )=E\Lambda (\cdot )}
λ
‖
⋅
‖
{\displaystyle \lambda \|\cdot \|}
对于考克斯点过程,
Λ
(
⋅
)
{\displaystyle \Lambda (\cdot )}
强度测度 。此外,若
Λ
(
⋅
)
{\displaystyle \Lambda (\cdot )}
拉东-尼科迪姆导数 )
λ
(
⋅
)
{\displaystyle \lambda (\cdot )}
Λ
(
B
)
=
a.s.
∫
B
λ
(
x
)
d
x
,
{\displaystyle \Lambda (B)\,{\stackrel {\text{a.s.}}{=}}\,\int _{B}\lambda (x)\,dx,}
λ
(
⋅
)
{\displaystyle \lambda (\cdot )}
强度场 。强度测度或强度场的平稳性意味着相应考克斯点过程的平稳性。
已经对许多特定类的考克斯点过程进行了详细研究,例如:
对数-高斯考克斯点过程[ 16]
λ
(
y
)
=
exp
(
X
(
y
)
)
{\displaystyle \lambda (y)=\exp(X(y))}
X
(
⋅
)
{\displaystyle X(\cdot )}
散粒噪声考克斯点过程[ 17]
λ
(
y
)
=
∑
X
∈
Φ
h
(
X
,
y
)
{\displaystyle \lambda (y)=\sum _{X\in \Phi }h(X,y)}
Φ
(
⋅
)
{\displaystyle \Phi (\cdot )}
h
(
⋅
,
⋅
)
{\displaystyle h(\cdot ,\cdot )}
推广的散粒噪声考克斯点过程:
λ
(
y
)
=
∑
X
∈
Φ
h
(
X
,
y
)
{\displaystyle \lambda (y)=\sum _{X\in \Phi }h(X,y)}
Φ
(
⋅
)
{\displaystyle \Phi (\cdot )}
h
(
⋅
,
⋅
)
{\displaystyle h(\cdot ,\cdot )}
基于莱维的考克斯点过程:
λ
(
y
)
=
∫
h
(
x
,
y
)
L
(
d
x
)
{\displaystyle \lambda (y)=\int h(x,y)L(dx)}
L
(
⋅
)
{\displaystyle L(\cdot )}
h
(
⋅
,
⋅
)
{\displaystyle h(\cdot ,\cdot )}
Permanental Cox point processes[ 18]
λ
(
y
)
=
X
1
2
(
y
)
+
⋯
+
X
k
2
(
y
)
{\displaystyle \lambda (y)=X_{1}^{2}(y)+\cdots +X_{k}^{2}(y)}
X
i
(
⋅
)
{\displaystyle X_{i}(\cdot )}
k
{\displaystyle k}
Sigmoidal Gaussian Cox point processes[ 19]
λ
(
y
)
=
λ
⋆
/
(
1
+
exp
(
−
X
(
y
)
)
)
{\displaystyle \lambda (y)=\lambda ^{\star }/(1+\exp(-X(y)))}
X
(
⋅
)
{\displaystyle X(\cdot )}
[需要解释
λ
⋆
>
0
{\displaystyle \lambda ^{\star }>0}
根据延森不等式 ,可以验证考克斯点过程满足以下不等式:对于所有有界博雷尔子集
B
{\displaystyle B}
Var
(
ξ
(
B
)
)
≥
Var
(
ξ
α
(
B
)
)
,
{\displaystyle \operatorname {Var} (\xi (B))\geq \operatorname {Var} (\xi _{\alpha }(B)),}
其中
ξ
α
{\displaystyle \xi _{\alpha }}
α
(
⋅
)
:=
E
ξ
(
⋅
)
=
E
Λ
(
⋅
)
{\displaystyle \alpha (\cdot ):=E\xi (\cdot )=E\Lambda (\cdot )}
团聚 或吸引 性质。
行列式点过程 是一类重要的点过程,在物理学 、随机矩阵理论 和组合数学 中都有应用。[ 20]
霍克斯过程
N
t
{\displaystyle N_{t}}
λ
(
t
)
=
μ
(
t
)
+
∫
−
∞
t
ν
(
t
−
s
)
d
N
s
=
μ
(
t
)
+
∑
T
k
<
t
ν
(
t
−
T
k
)
{\displaystyle {\begin{aligned}\lambda (t)&=\mu (t)+\int _{-\infty }^{t}\nu (t-s)\,dN_{s}\\[5pt]&=\mu (t)+\sum _{T_{k}<t}\nu (t-T_{k})\end{aligned}}}
其中
ν
:
R
+
→
R
+
{\displaystyle \nu :\mathbb {R} ^{+}\rightarrow \mathbb {R} ^{+}}
T
i
{\displaystyle T_{i}}
λ
(
t
)
{\displaystyle \lambda (t)}
μ
(
t
)
{\displaystyle \mu (t)}
T
i
∈
R
{\displaystyle T_{i}\in \mathbb {R} }
i
{\displaystyle i}
T
i
<
T
i
+
1
{\displaystyle T_{i}<T_{i+1}}
[ 21]
给定一个非负随机变量的序列
{
X
k
,
k
=
1
,
2
,
…
}
{\textstyle \{X_{k},k=1,2,\dots \}}
k
=
1
,
2
,
…
{\displaystyle k=1,2,\dots }
X
k
{\displaystyle X_{k}}
累积分布函数 为
F
(
a
k
−
1
x
)
{\displaystyle F(a^{k-1}x)}
a
{\displaystyle a}
{
X
k
,
k
=
1
,
2
,
…
}
{\displaystyle \{X_{k},k=1,2,\ldots \}}
几何过程 (GP)。[ 22]
几何过程有几种推广,包括α-系列过程 [ 23] 双几何过程 。[ 24]
历史上所研究的第一种点过程是以半实轴
R
+
=
[
0
,
∞
)
{\displaystyle \mathbb {R} ^{+}=[0,\infty )}
R
+
{\displaystyle \mathbb {R} ^{+}}
(
T
1
,
T
2
,
…
)
{\displaystyle (T_{1},T_{2},\dots )}
(
X
1
,
X
2
,
…
)
{\displaystyle (X_{1},X_{2},\dots )}
X
k
=
∑
j
=
1
k
T
j
for
k
≥
1.
{\displaystyle X_{k}=\sum _{j=1}^{k}T_{j}\quad {\text{for }}k\geq 1.}
如果事件间的时间间隔是独立同分布的,则所得的点过程称为更新过程 。
半实轴上的点过程关于滤过
H
t
{\displaystyle H_{t}}
λ
(
t
|
H
t
)
{\displaystyle \lambda (t|H_{t})}
λ
(
t
∣
H
t
)
=
lim
Δ
t
→
0
1
Δ
t
Pr
(
One event occurs in the time-interval
[
t
,
t
+
Δ
t
]
∣
H
t
)
,
{\displaystyle \lambda (t\mid H_{t})=\lim _{\Delta t\to 0}{\frac {1}{\Delta t}}\Pr({\text{One event occurs in the time-interval}}\,[t,t+\Delta t]\mid H_{t}),}
H
t
{\displaystyle H_{t}}
t
{\displaystyle t}
使用
N
(
t
)
{\displaystyle N(t)}
λ
(
t
∣
H
t
)
=
lim
Δ
t
→
0
1
Δ
t
Pr
(
N
(
t
+
Δ
t
)
−
N
(
t
)
=
1
∣
H
t
)
.
{\displaystyle \lambda (t\mid H_{t})=\lim _{\Delta t\to 0}{\frac {1}{\Delta t}}\Pr(N(t+\Delta t)-N(t)=1\mid H_{t}).}
点过程的compensator ,也称为对偶可预测投影 ,是积分后的条件强度函数,定义为
Λ
(
s
,
u
)
=
∫
s
u
λ
(
t
∣
H
t
)
d
t
{\displaystyle \Lambda (s,u)=\int _{s}^{u}\lambda (t\mid H_{t})\,\mathrm {d} t}
R
n
{\displaystyle R^{n}}
S
{\displaystyle S}
[ 26]
林业和植物生态学(树木或植物的总体位置)
流行病学(受感染者的家庭位置)
动物学(动物的洞穴或巢穴)
地理(人类定居点、城镇或城市的位置)
地震学(震中 )
材料科学(工业材料中的缺陷位置)
天文学(恒星或星系的位置)
计算神经科学(神经元的尖端) 使用点过程来建模这些类型的数据的必要性在于它们内禀的空间结构。因此,首个感兴趣的问题通常是给定的数据是否表现出完全的空间随机性 (即是否是空间泊松过程 的一种实现)、而非表现出空间聚集或空间抑制。
相比之下,经典多元统计 中考虑的许多数据集由独立生成的数据点组成,这些数据点可能由一个或多个协变量(通常是非空间的)控制。
除了在空间统计中的应用外,点过程也是随机几何 中的基本对象之一。研究还广泛集中于基于点过程建立的各种模型,例如沃罗诺伊镶嵌 、随机几何图 和布尔模型 。
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