複數 
的 
-analog 定義為
![[s]_d=1-(2^d)/(s^d)](/images/equations/d-Analog/NumberedEquation1.svg) |
(1)
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對於整數 
, ![[2]!=1](/images/equations/d-Analog/Inline4.svg)
且
![[n]_d!](/images/equations/d-Analog/Inline5.svg) |  | ![[3][4]...[n]](/images/equations/d-Analog/Inline7.svg) |
(2)
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 |  |  |
(3)
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然後可以透過以下方式擴充套件到複數值
![[s]_d!=product_(j=1)^infty([j+2])/([j+s])](/images/equations/d-Analog/NumberedEquation2.svg) |
(4)
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它滿足基本函式恆等式
![[s]_d!=[s]_d[s-1]_d!.](/images/equations/d-Analog/NumberedEquation3.svg) |
(5)
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polygamma 函式 的 
-analog 是
![[psi]_d(s+1)](/images/equations/d-Analog/Inline12.svg) |  | ![d/(ds)ln[s]_d!](/images/equations/d-Analog/Inline14.svg) |
(6)
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 |  | ![-d·2^dsum_(m=1)^(infty)1/((m+s)[(m+s)^d-2^d]).](/images/equations/d-Analog/Inline17.svg) |
(7)
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前幾個值是
![[psi]_1(s)](/images/equations/d-Analog/Inline18.svg) |  |  |
(8)
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![[psi]_2(s)](/images/equations/d-Analog/Inline21.svg) |  |  |
(9)
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其中 
是 digamma 函式。
尤拉-馬歇羅尼常數 
的 
-analog 是
![[gamma]_d](/images/equations/d-Analog/Inline27.svg) |  | ![-[psi]_d(3)](/images/equations/d-Analog/Inline29.svg) |
(10)
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 |  |  |
(11)
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前幾個值是
![[gamma]_1](/images/equations/d-Analog/Inline33.svg) |  |  |
(12)
|
![[gamma]_2](/images/equations/d-Analog/Inline36.svg) |  |  |
(13)
|
![[gamma]_3](/images/equations/d-Analog/Inline39.svg) |  |  |
(14)
|
![[gamma]_4](/images/equations/d-Analog/Inline42.svg) |  |  |
(15)
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其中 
是調和數。
調和數的 
-analog 是 ![[H_2]_d=0](/images/equations/d-Analog/Inline47.svg)
且
![[H_n]_d](/images/equations/d-Analog/Inline48.svg) |  | ![d·2^d(1/(3^(d+1)[3])+1/(4^(d+1)[4])+...+1/(n^(d+1)[n]))](/images/equations/d-Analog/Inline50.svg) |
(16)
|
 |  | ![[psi]_d(n+1)+[gamma]_d](/images/equations/d-Analog/Inline53.svg) |
(17)
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(Flajolet et al. 1995)。
-analog 由下式給出![[infty]_d!=product_(n=3)^infty(1-(2^d)/(n^d)).](/images/equations/d-Analog/NumberedEquation4.svg) |
(18)
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這個無窮乘積可以用封閉形式表示,涉及 
, 雙曲正弦 
, 和 伽瑪函式 
,包括單位根 
,
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(19)
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(20)
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(21)
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(22)
|
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(23)
|
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(24)
|
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(25)
|
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(26)
|
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(27)
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這些都是無窮乘積的一般結果的特殊情況。
