在統計學 和概率論 中,點過程 或點場 是隨機位於數學空間(例如實數線 或歐氏空間) 上的數學點 的集合。 點過程可用於空間數據分析 [ 1] [ 2] [ 3] [ 4]
點過程有不同的數學解釋,例如解釋為一個隨機計數測度 或一個隨機集合。[ 5] [ 6] [ 7] [ 8] [ 8] [ a]
n
{\displaystyle n}
[ 11] [ 12] [ 13] [ 8] [ 14]
實軸上的點過程是一個易於研究的重要特例,因為其中的點有一個自然的序,並且整個點過程可以用點之間的(隨機)間隔來完全描述。這些點過程經常用於建模一個時間段上的隨機事件,比如隊列中顧客的到達(排隊論 )、神經元中的脈衝(計算神經科學 )、蓋革計數器 中的粒子、電信網絡 中廣播電台的位置[ 15] 萬維網 上的搜索。
在數學中,點過程是一種隨機元素 ,其值取為是集合
S
{\displaystyle S}
局部有限 計數測度 ,但對於更實際的目的來說,將點分佈視為
S
{\displaystyle S}
極限點 的可數 子集就足夠了。[需要解釋
設有一概率空間
(
Ω
,
F
,
P
)
{\displaystyle (\Omega ,{\mathcal {F}},P)}
局部緊 的第二可數 豪斯多夫空間
S
{\displaystyle S}
S
{\displaystyle {\mathcal {S}}}
S
{\displaystyle S}
博雷爾σ-代數 ,從而形成一博雷爾可測空間
(
S
,
S
)
{\displaystyle (S,{\mathcal {S}})}
(
Ω
,
F
)
{\displaystyle (\Omega ,{\mathcal {F}})}
(
S
,
S
)
{\displaystyle (S,{\mathcal {S}})}
轉移核
ξ
{\displaystyle \xi }
ζ
:
Ω
×
S
↦
Z
+
{\displaystyle \zeta :\Omega \times {\mathcal {S}}\mapsto \mathbb {Z} _{+}}
給定任意一個樣本點
ω
∈
Ω
{\displaystyle \omega \in \Omega }
ξ
(
ω
,
⋅
)
{\displaystyle \xi (\omega ,\cdot )}
(
S
,
S
)
{\displaystyle (S,{\mathcal {S}})}
給定任意一個博雷爾集
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)}
這個轉移核給出了一個隨機測度 ,即取值為一個測度的隨機元素。為此
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}
可測 的,需為
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}}}
相對緊 的。於是配備σ-代數後的
M
(
S
)
{\displaystyle {\mathcal {M}}({\mathcal {S}})}
ξ
{\displaystyle \xi }
ω
∈
Ω
{\displaystyle \omega \in \Omega }
ξ
ω
{\displaystyle \xi _{\omega }}
S
{\displaystyle S}
一個
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 }
粒子過程 。
點過程 這一術語暗示
ξ
{\displaystyle \xi }
隨機過程 ,但由於
S
{\displaystyle S}
全序 的指標集,這一術語不甚合適。
點過程
ξ
{\displaystyle \xi }
ξ
=
∑
i
=
1
n
δ
X
i
,
{\displaystyle \xi =\sum _{i=1}^{n}\delta _{X_{i}},}
其中
δ
{\displaystyle \delta }
狄拉克測度 ,
n
{\displaystyle n}
X
i
{\displaystyle X_{i}}
S
{\displaystyle S}
X
i
{\displaystyle X_{i}}
幾乎必然 是不同的(或者說,對於所有
x
∈
R
d
{\displaystyle x\in \mathbb {R} ^{d}}
ξ
(
x
)
≤
1
{\displaystyle \xi (x)\leq 1}
簡單點過程
事件(事件空間中的事件,即一系列點)還可用計數記號來表示:每個實例都表示為一個整數值的連續函數
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,}
即觀測區間
(
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)}
一個點過程
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}}.}
一個點過程
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))]}
它們起着與隨機變量 的特徵函數 類似的作用。一個重要定理表明:若兩個點過程的拉普拉斯泛函相等,則它們有相同的法則
點過程的
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})}
根據單調類定理 ,這唯一地定義了
(
S
n
,
B
(
S
n
)
)
{\displaystyle (S^{n},{\mathcal {B}}(S^{n}))}
E
ξ
n
(
⋅
)
{\displaystyle E\xi ^{n}(\cdot )}
n
{\displaystyle n}
矩測度 。一階矩測度即是平均值測度。
設
S
=
R
d
{\displaystyle S=\mathbb {R} ^{d}}
ξ
{\displaystyle \xi }
勒貝格測度 的聯合強度 是這樣一些函數
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}.}
對於點過程來說,聯合強度並不總是存在。鑑於隨機變量 的矩 在許多情況下可確定該隨機變量,因此也希望聯合強度也有類似的結果。事實上,已有許多案例表明了這一點。
一個
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 }
強度 。
R
d
{\displaystyle \mathbb {R} ^{d}}
R
d
{\displaystyle \mathbb {R} ^{d}}
下文是一些
R
d
{\displaystyle \mathbb {R} ^{d}}
點過程最簡單、最普遍的例子是泊松點過程 ,它是泊松過程 的空間推廣。實軸上的泊松(計數)過程可以用兩個性質來刻畫:不相交區間內的點(或事件)的數量是獨立的,且它們服從泊松分佈 。泊松點過程也可以使用這兩個性質來定義。也就是說,稱一個點過程
ξ
{\displaystyle \xi }
對於不相交的子集
B
1
,
…
,
B
n
{\displaystyle B_{1},\ldots ,B_{n}}
ξ
(
B
1
)
,
…
,
ξ
(
B
n
)
{\displaystyle \xi (B_{1}),\ldots ,\xi (B_{n})}
對於任一有界子集
B
{\displaystyle B}
ξ
(
B
)
{\displaystyle \xi (B)}
λ
‖
B
‖
{\displaystyle \lambda \|B\|}
泊松分佈 ,其中
‖
⋅
‖
{\displaystyle \|\cdot \|}
勒貝格測度 。 這兩個條件可以結合起來寫成如下形式:對於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}!}}.}
常數
λ
{\displaystyle \lambda }
強度 。注意泊松點過程可由單個參數
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}}
一個考克斯過程 (冠名於戴維·科克斯 )是對泊松點過程的一種推廣,其中的
λ
‖
B
‖
{\displaystyle \lambda \|B\|}
隨機測度 。更正式地說,設
Λ
{\displaystyle \Lambda }
ξ
{\displaystyle \xi }
給定
Λ
(
⋅
)
{\displaystyle \Lambda (\cdot )}
B
{\displaystyle B}
ξ
(
B
)
{\displaystyle \xi (B)}
Λ
(
B
)
{\displaystyle \Lambda (B)}
對於有限個任意的不相交子集
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,(齊次和非齊次)泊松點過程是考克斯點過程的特例。考克斯點過程的平均測度
E
ξ
(
⋅
)
=
E
Λ
(
⋅
)
{\displaystyle E\xi (\cdot )=E\Lambda (\cdot )}
λ
‖
⋅
‖
{\displaystyle \lambda \|\cdot \|}
對於考克斯點過程,
Λ
(
⋅
)
{\displaystyle \Lambda (\cdot )}
強度測度 。此外,若
Λ
(
⋅
)
{\displaystyle \Lambda (\cdot )}
拉東-尼科迪姆導數 )
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 )}
強度場 。強度測度或強度場的平穩性意味着相應考克斯點過程的平穩性。
已經對許多特定類的考克斯點過程進行了詳細研究,例如:
對數-高斯考克斯點過程[ 16]
λ
(
y
)
=
exp
(
X
(
y
)
)
{\displaystyle \lambda (y)=\exp(X(y))}
X
(
⋅
)
{\displaystyle X(\cdot )}
散粒噪聲考克斯點過程[ 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 )}
推廣的散粒噪聲考克斯點過程:
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 )}
基於萊維的考克斯點過程:
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 )}
[需要解釋
λ
⋆
>
0
{\displaystyle \lambda ^{\star }>0}
根據延森不等式 ,可以驗證考克斯點過程滿足以下不等式:對於所有有界博雷爾子集
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 )}
團聚 或吸引 性質。
行列式點過程 是一類重要的點過程,在物理學 、隨機矩陣理論 和組合數學 中都有應用。[ 20]
霍克斯過程
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]
給定一個非負隨機變量的序列
{
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}}
累積分佈函數 為
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 \}}
幾何過程 (GP)。[ 22]
幾何過程有幾種推廣,包括α-系列過程 [ 23] 雙幾何過程 。[ 24]
歷史上所研究的第一種點過程是以半實軸
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.}
如果事件間的時間間隔是獨立同分佈的,則所得的點過程稱為更新過程 。
半實軸上的點過程關於濾過
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}).}
點過程的compensator ,也稱為對偶可預測投影 ,是積分後的條件強度函數,定義為
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}
n
{\displaystyle n}
R
n
{\displaystyle \mathbb {R} ^{n}}
N
{\displaystyle N}
帕潘傑盧強度函數 定義為
λ
p
(
x
)
=
lim
δ
→
0
1
|
B
δ
(
x
)
|
P
{
One event occurs in
B
δ
(
x
)
∣
σ
[
N
(
R
n
∖
B
δ
(
x
)
)
]
}
,
{\displaystyle \lambda _{p}(x)=\lim _{\delta \to 0}{\frac {1}{|B_{\delta }(x)|}}{P}\{{\text{One event occurs in }}\,B_{\delta }(x)\mid \sigma [N(\mathbb {R} ^{n}\setminus B_{\delta }(x))]\},}
其中
B
δ
(
x
)
{\displaystyle B_{\delta }(x)}
x
{\displaystyle x}
δ
{\displaystyle \delta }
σ
[
N
(
R
n
∖
B
δ
(
x
)
)
]
{\displaystyle \sigma [N(\mathbb {R} ^{n}\setminus B_{\delta }(x))]}
N
{\displaystyle N}
B
δ
(
x
)
{\displaystyle B_{\delta }(x)}
基於某些觀測數據的參數化簡單點過程的對數似然函數[ 25]
ln
L
(
N
(
t
)
t
∈
[
0
,
T
]
)
=
∫
0
T
(
1
−
λ
(
s
)
)
d
s
+
∫
0
T
ln
λ
(
s
)
d
N
s
{\displaystyle \ln {\mathcal {L}}(N(t)_{t\in [0,T]})=\int _{0}^{T}(1-\lambda (s))\,ds+\int _{0}^{T}\ln \lambda (s)\,dN_{s}}
R
n
{\displaystyle R^{n}}
S
{\displaystyle S}
[ 26]
林業和植物生態學(樹木或植物的總體位置)
流行病學(受感染者的家庭位置)
動物學(動物的洞穴或巢穴)
地理(人類定居點、城鎮或城市的位置)
地震學(震中 )
材料科學(工業材料中的缺陷位置)
天文學(恆星或星系的位置)
計算神經科學(神經元的尖端) 使用點過程來建模這些類型的數據的必要性在於它們內稟的空間結構。因此,首個感興趣的問題通常是給定的數據是否表現出完全的空間隨機性 (即是否是空間泊松過程 的一種實現)、而非表現出空間聚集或空間抑制。
相比之下,經典多元統計 中考慮的許多數據集由獨立生成的數據點組成,這些數據點可能由一個或多個協變量(通常是非空間的)控制。
除了在空間統計中的應用外,點過程也是隨機幾何 中的基本對象之一。研究還廣泛集中於基於點過程建立的各種模型,例如沃羅諾伊鑲嵌 、隨機幾何圖 和布爾模型 。
^ In the context of point processes, the term "state space" can mean the space on which the point process is defined such as the real line,[ 9] [ 10]
^ Diggle, P. (2003). Statistical Analysis of Spatial Point Patterns , 2nd edition. Arnold, London. ISBN 0-340-74070-1 .
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^ Brown E. N., Kass R. E., Mitra P. P. Multiple neural spike train data analysis: state-of-the-art and future challenges. Nature Neuroscience. 2004, 7 (5): 456–461. PMID 15114358 S2CID 562815 doi:10.1038/nn1228 ^ Engle Robert F., Lunde Asger. Trades and Quotes: A Bivariate Point Process (PDF) . Journal of Financial Econometrics. 2003, 1 (2): 159–188. doi:10.1093/jjfinec/nbg011 ^ Sung Nok Chiu; Dietrich Stoyan; Wilfrid S. Kendall; Joseph Mecke. Stochastic Geometry and Its Applications . John Wiley & Sons. 27 June 2013: 108. ISBN 978-1-118-65825-3 ^ Martin Haenggi. Stochastic Geometry for Wireless Networks . Cambridge University Press. 2013: 10. ISBN 978-1-107-01469-5 ^ D.J. Daley; D. Vere-Jones. An Introduction to the Theory of Point Processes: Volume I: Elementary Theory and Methods . Springer Science & Business Media. 10 April 2006: 194. ISBN 978-0-387-21564-8 ^ 8.0 8.1 8.2 Cox, D. R.; Isham, Valerie. Point Processes. CRC Press. 1980: 3]. ISBN 978-0-412-21910-8 ^ J. F. C. Kingman. Poisson Processes . Clarendon Press. 17 December 1992: 8. ISBN 978-0-19-159124-2 ^ Jesper Moller; Rasmus Plenge Waagepetersen. Statistical Inference and Simulation for Spatial Point Processes . CRC Press. 25 September 2003: 7. ISBN 978-0-203-49693-0 ^ Samuel Karlin; Howard E. Taylor. A First Course in Stochastic Processes . Academic Press. 2 December 2012: 31. ISBN 978-0-08-057041-9 ^ Volker Schmidt. Stochastic Geometry, Spatial Statistics and Random Fields: Models and Algorithms . Springer. 24 October 2014: 99. ISBN 978-3-319-10064-7 ^ D.J. Daley; D. Vere-Jones. An Introduction to the Theory of Point Processes: Volume I: Elementary Theory and Methods . Springer Science & Business Media. 10 April 2006. ISBN 978-0-387-21564-8 ^ Sung Nok Chiu; Dietrich Stoyan; Wilfrid S. Kendall; Joseph Mecke. Stochastic Geometry and Its Applications . John Wiley & Sons. 27 June 2013: 109. ISBN 978-1-118-65825-3 ^ Gilbert E.N. Random plane networks. Journal of the Society for Industrial and Applied Mathematics. 1961, 9 (4): 533–543. doi:10.1137/0109045 ^ Moller, J.; Syversveen, A. R.; Waagepetersen, R. P. Log Gaussian Cox Processes. Scandinavian Journal of Statistics. 1998, 25 (3): 451. CiteSeerX 10.1.1.71.6732 S2CID 120543073 doi:10.1111/1467-9469.00115 ^ Moller, J. (2003) Shot noise Cox processes, Adv. Appl. Prob. , 35 .[頁碼請求
^ Mccullagh,P. and Moller, J. (2006) "The permanental processes", Adv. Appl. Prob. , 38 .[頁碼請求
^ Adams, R. P., Murray, I. MacKay, D. J. C. (2009) "Tractable inference in Poisson processes with Gaussian process intensities", Proceedings of the 26th International Conference on Machine Learning doi :10.1145/1553374.1553376
^ Hough, J. B., Krishnapur, M., Peres, Y., and Virág, B., Zeros of Gaussian analytic functions and determinantal point processes. University Lecture Series, 51. American Mathematical Society, Providence, RI, 2009.
^ Patrick J. Laub, Young Lee, Thomas Taimre, The Elements of Hawkes Processes , Springer, 2022.
^ Lin, Ye (Lam Yeh). Geometric processes and replacement problem. Acta Mathematicae Applicatae Sinica. 1988, 4 (4): 366–377. S2CID 123338120 doi:10.1007/BF02007241 ^ Braun, W. John; Li, Wei; Zhao, Yiqiang Q. Properties of the geometric and related processes. Naval Research Logistics. 2005, 52 (7): 607–616. CiteSeerX 10.1.1.113.9550 S2CID 7745023 doi:10.1002/nav.20099 ^ Wu, Shaomin. Doubly geometric processes and applications (PDF) . Journal of the Operational Research Society. 2018, 69 : 66–77. S2CID 51889022 doi:10.1057/s41274-017-0217-4 ^ Rubin, I. Regular point processes and their detection. IEEE Transactions on Information Theory. 1972-09, 18 (5): 547–557. doi:10.1109/tit.1972.1054897 ^ Case studies in spatial point process modeling. New York [Heidelberg]: Springer. ISBN 0-387-28311-0
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![{\displaystyle \ln {\mathcal {L}}(N(t)_{t\in [0,T]})=\int _{0}^{T}(1-\lambda (s))\,ds+\int _{0}^{T}\ln \lambda (s)\,dN_{s}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/7a257980e094477dfd181930b24369bd4ab61f05)
.
