在數學 和訊號處理 中,解析訊號 (英語:analytic signal 負頻率 [1] 希爾伯特轉換 相關聯的實值函數。
實值 函數的解析表示 是解析訊號 ,包含原始函數和它的希爾伯特轉換。這種表示促進了許多數學轉換的發展。基本的想法是,由於頻譜的埃爾米特對稱 ,實值函數的傅立葉轉換 (或頻譜 )的負頻率成分是多餘的。若是不介意處理複值函數的話,這些負頻率分量可以丟棄而不損失資訊。這使得函數的特定屬性更易理解,並促進了調制和解調技術的衍生,如單邊帶。只要操作的函數沒有負頻率分量(也就是它仍是「解析函數」),從複數轉換回實數就只需要丟棄虛部。解析表示是向量 概念的一個推廣:[2]
創建一個解析訊號的遞移函數 若
s
(
t
)
{\displaystyle s(t)}
實值 函數,其傅立葉轉換為
S
(
f
)
{\displaystyle S(f)}
S
(
f
)
{\displaystyle S(f)}
f
=
0
{\displaystyle f=0}
埃爾米特 對稱之函數:
S
(
−
f
)
=
S
(
f
)
∗
,
{\displaystyle S(-f)=S(f)^{*},}
S
(
f
)
∗
{\displaystyle S(f)^{*}}
S
(
f
)
{\displaystyle S(f)}
複共軛 。函數:
S
a
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f
)
=
d
e
f
{
2
S
(
f
)
,
for
f
>
0
,
S
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f
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,
for
f
=
0
,
0
,
for
f
<
0
=
2
u
(
f
)
⏟
1
+
sgn
(
f
)
S
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f
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=
S
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f
)
+
sgn
(
f
)
S
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f
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,
{\displaystyle {\begin{aligned}S_{\mathrm {a} }(f)&{\stackrel {\mathrm {def} }{{}={}}}{\begin{cases}2S(f),&{\text{for}}\ f>0,\\S(f),&{\text{for}}\ f=0,\\0,&{\text{for}}\ f<0\end{cases}}\\&=\underbrace {2\operatorname {u} (f)} _{1+\operatorname {sgn}(f)}S(f)=S(f)+\operatorname {sgn}(f)S(f),\end{aligned}}}
其中:
u
(
f
)
{\displaystyle \operatorname {u} (f)}
單位階躍函數 ,
sgn
(
f
)
{\displaystyle \operatorname {sgn}(f)}
符號函數 ,
僅包含
S
(
f
)
{\displaystyle S(f)}
非負頻率 分量。而且由於
S
(
f
)
{\displaystyle S(f)}
S
(
f
)
=
{
1
2
S
a
(
f
)
,
for
f
>
0
,
S
a
(
f
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,
for
f
=
0
,
1
2
S
a
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−
f
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∗
,
for
f
<
0
(Hermitian symmetry)
=
1
2
[
S
a
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f
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+
S
a
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−
f
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∗
]
.
{\displaystyle {\begin{aligned}S(f)&={\begin{cases}{\frac {1}{2}}S_{\mathrm {a} }(f),&{\text{for}}\ f>0,\\S_{\mathrm {a} }(f),&{\text{for}}\ f=0,\\{\frac {1}{2}}S_{\mathrm {a} }(-f)^{*},&{\text{for}}\ f<0\ {\text{(Hermitian symmetry)}}\end{cases}}\\&={\frac {1}{2}}[S_{\mathrm {a} }(f)+S_{\mathrm {a} }(-f)^{*}].\end{aligned}}}
s
(
t
)
{\displaystyle s(t)}
解析訊號 是
S
a
(
f
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{\displaystyle S_{\mathrm {a} }(f)}
s
a
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t
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=
d
e
f
F
−
1
[
S
a
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f
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]
=
F
−
1
[
S
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f
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+
sgn
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f
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⋅
S
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f
)
]
=
F
−
1
{
S
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f
)
}
⏟
s
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t
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+
F
−
1
{
sgn
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f
)
}
⏟
j
1
π
t
∗
F
−
1
{
S
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f
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}
⏟
s
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t
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⏞
c
o
n
v
o
l
u
t
i
o
n
=
s
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t
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+
j
[
1
π
t
∗
s
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t
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]
⏟
H
[
s
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t
)
]
=
s
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t
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+
j
s
^
(
t
)
,
{\displaystyle {\begin{aligned}s_{\mathrm {a} }(t)&{\stackrel {\mathrm {def} }{{}={}}}{\mathcal {F}}^{-1}[S_{\mathrm {a} }(f)]\\&={\mathcal {F}}^{-1}[S(f)+\operatorname {sgn}(f)\cdot S(f)]\\&=\underbrace {{\mathcal {F}}^{-1}\{S(f)\}} _{s(t)}+\overbrace {\underbrace {{\mathcal {F}}^{-1}\{\operatorname {sgn}(f)\}} _{j{\frac {1}{\pi t}}}*\underbrace {{\mathcal {F}}^{-1}\{S(f)\}} _{s(t)}} ^{convolution}\\&=s(t)+j\underbrace {\left[{1 \over \pi t}*s(t)\right]} _{\operatorname {\mathcal {H}} [s(t)]}\\&=s(t)+j{\hat {s}}(t),\end{aligned}}}
其中
s
^
(
t
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=
d
e
f
H
[
s
(
t
)
]
{\displaystyle {\hat {s}}(t){\stackrel {\mathrm {def} }{{}={}}}\operatorname {\mathcal {H}} [s(t)]}
s
(
t
)
{\displaystyle s(t)}
希爾伯特轉換 ;
∗
{\displaystyle *}
卷積 符號;
j
{\displaystyle j}
虛數單位 。
s
(
t
)
=
cos
(
ω
t
)
,
{\displaystyle s(t)=\cos(\omega t),}
ω
>
0.
{\displaystyle \omega >0.}
於是:
s
^
(
t
)
=
cos
(
ω
t
−
π
/
2
)
=
sin
(
ω
t
)
,
{\displaystyle {\hat {s}}(t)=\cos(\omega t-\pi /2)=\sin(\omega t),}
s
a
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t
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=
s
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t
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+
j
s
^
(
t
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=
cos
(
ω
t
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+
j
sin
(
ω
t
)
=
e
j
ω
t
.
{\displaystyle s_{\mathrm {a} }(t)=s(t)+j{\hat {s}}(t)=\cos(\omega t)+j\sin(\omega t)=e^{j\omega t}.}
歐拉公式 。歐拉公式 的一個推論是
cos
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ω
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=
1
2
(
e
j
ω
t
+
e
j
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−
ω
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t
)
.
{\displaystyle \cos(\omega t)={\tfrac {1}{2}}(e^{j\omega t}+e^{j(-\omega )t}).}
負頻率
這裏我們使用歐拉公式來識別並丟棄負頻率。
s
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t
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=
cos
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ω
t
+
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=
1
2
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j
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ω
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+
e
−
j
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ω
t
+
θ
)
)
{\displaystyle s(t)=\cos(\omega t+\theta )={\tfrac {1}{2}}(e^{j(\omega t+\theta )}+e^{-j(\omega t+\theta )})}
於是:
s
a
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t
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=
{
e
j
(
ω
t
+
θ
)
=
e
j
|
ω
|
t
⋅
e
j
θ
,
if
ω
>
0
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e
−
j
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ω
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+
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=
e
j
|
ω
|
t
⋅
e
−
j
θ
,
if
ω
<
0.
{\displaystyle s_{\mathrm {a} }(t)={\begin{cases}e^{j(\omega t+\theta )}\ \ =\ e^{j|\omega |t}\cdot e^{j\theta },&{\text{if}}\ \omega >0,\\e^{-j(\omega t+\theta )}=\ e^{j|\omega |t}\cdot e^{-j\theta },&{\text{if}}\ \omega <0.\end{cases}}}
這是使用希爾伯特轉換方法去除負頻率分量的另一個例子。我們注意到,對於複值函數
s
(
t
)
{\displaystyle s(t)}
s
a
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t
)
{\displaystyle s_{\mathrm {a} }(t)}
s
(
t
)
{\displaystyle s(t)}
s
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t
)
=
e
−
j
ω
t
{\displaystyle s(t)=e^{-j\omega t}}
ω
>
0
{\displaystyle \omega >0}
於是:
s
^
(
t
)
=
j
e
−
j
ω
t
,
{\displaystyle {\hat {s}}(t)=je^{-j\omega t},}
s
a
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t
)
=
e
−
j
ω
t
+
j
2
e
−
j
ω
t
=
e
−
j
ω
t
−
e
−
j
ω
t
=
0.
{\displaystyle s_{\mathrm {a} }(t)=e^{-j\omega t}+j^{2}e^{-j\omega t}=e^{-j\omega t}-e^{-j\omega t}=0.}
負頻率分量 [ 編輯 ] 由於
s
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t
)
=
Re
[
s
a
(
t
)
]
{\displaystyle s(t)=\operatorname {Re} [s_{\mathrm {a} }(t)]}
Im
[
s
a
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t
)
]
{\displaystyle \operatorname {Im} [s_{\mathrm {a} }(t)]}
s
a
∗
(
t
)
{\displaystyle s_{\mathrm {a} }^{*}(t)}
僅 由負頻率分量構成。因此
Re
[
s
a
∗
(
t
)
]
{\displaystyle \operatorname {Re} [s_{\mathrm {a} }^{*}(t)]}
包絡和瞬時相位 [ 編輯 ] 一個函數(藍色)和它的解析表示的模(紅),顯示出包絡現象。 解析訊號也可以表示在其隨時間變化的振幅和相位(極坐標 ):
s
a
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t
)
=
s
m
(
t
)
e
j
ϕ
(
t
)
,
{\displaystyle s_{\mathrm {a} }(t)=s_{\mathrm {m} }(t)e^{j\phi (t)},}
其中:
s
m
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t
)
=
d
e
f
|
s
a
(
t
)
|
{\displaystyle s_{\mathrm {m} }(t){\stackrel {\mathrm {def} }{{}={}}}|s_{\mathrm {a} }(t)|}
瞬時振幅 或包絡
ϕ
(
t
)
=
d
e
f
arg
[
s
a
(
t
)
]
{\displaystyle \phi (t){\stackrel {\mathrm {def} }{{}={}}}\arg \!\left[s_{\mathrm {a} }(t)\right]}
瞬時相位 在附圖中,藍色曲線描繪
s
(
t
)
{\displaystyle s(t)}
s
m
(
t
)
{\displaystyle s_{\mathrm {m} }(t)}
解纏的 瞬時相位的時間導數的單位為rad/s,稱作瞬時角頻率 :
ω
(
t
)
=
d
e
f
d
ϕ
d
t
(
t
)
.
{\displaystyle \omega (t){\stackrel {\mathrm {def} }{{}={}}}{\frac {d\phi }{dt}}(t).}
因此,瞬時頻率 赫茲 )為:
f
(
t
)
=
d
e
f
1
2
π
ω
(
t
)
.
{\displaystyle f(t){\stackrel {\mathrm {def} }{{}={}}}{\frac {1}{2\pi }}\omega (t).}
[3] 瞬時振幅、瞬時相位與頻率在一些應用中用於測量和檢測的訊號的局部特徵。訊號的解析表示的另一個應用與調制訊號 的解調有關。極坐標方便將振幅調制 和相位(或頻率)調制的影響分開,對解調某些種類的訊號很有效。
[ 編輯 ] 解析訊號通常都會在頻率上移位(下轉換)到 0 Hz,可能會產生[非對稱]負頻率分量:
s
a
_
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t
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=
d
e
f
s
a
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t
)
e
−
j
ω
0
t
=
s
m
(
t
)
e
j
(
ϕ
(
t
)
−
ω
0
t
)
,
{\displaystyle {\underline {s_{\mathrm {a} }}}(t){\stackrel {\mathrm {def} }{{}={}}}s_{\mathrm {a} }(t)e^{-j\omega _{0}t}=s_{\mathrm {m} }(t)e^{j(\phi (t)-\omega _{0}t)},}
其中
ω
0
{\displaystyle \omega _{0}}
[2]
這個函數有不同的名稱,如復包絡 和復基帶 。復包絡不是唯一的;它是由
ω
0
{\displaystyle \omega _{0}}
帶通訊號
s
(
t
)
{\displaystyle s(t)}
ω
0
{\displaystyle \omega _{0}}
載波頻率
在其他情況下,
ω
0
{\displaystyle \omega _{0}}
低通濾波器 就可以去除感興趣的部分。另一個動機是減少最高頻率,從而降低最小的無混疊取樣率。頻移不加大覆信號表示的數學處理難度。因此從這個意義上說,下轉換的訊號仍然是解析訊號 。但是恢復實值表示不再是簡簡單單提取實部的問題了。為了避免混疊 可能需要上轉換,若訊號已被(離散時間)取樣 ,還可能需要插值 (升採樣 )。
若選取的
ω
0
{\displaystyle \omega _{0}}
s
a
(
t
)
{\displaystyle s_{\mathrm {a} }(t)}
s
a
_
(
t
)
{\displaystyle {\underline {s_{\mathrm {a} }}}(t)}
下邊帶 的單邊帶 訊號。
參考頻率的其他選擇: 有時
ω
0
{\displaystyle \omega _{0}}
∫
0
+
∞
(
ω
−
ω
0
)
2
|
S
a
(
ω
)
|
2
d
ω
.
{\displaystyle \int _{0}^{+\infty }(\omega -\omega _{0})^{2}|S_{\mathrm {a} }(\omega )|^{2}\,d\omega .}
另外,[4]
ω
0
{\displaystyle \omega _{0}}
解纏的 瞬時相位
ϕ
(
t
)
{\displaystyle \phi (t)}
∫
−
∞
+
∞
[
ω
(
t
)
−
ω
0
]
2
|
s
a
(
t
)
|
2
d
t
{\displaystyle \int _{-\infty }^{+\infty }[\omega (t)-\omega _{0}]^{2}|s_{\mathrm {a} }(t)|^{2}\,dt}
再或者(對最佳
θ
{\displaystyle \theta }
∫
−
∞
+
∞
[
ϕ
(
t
)
−
(
ω
0
t
+
θ
)
]
2
d
t
.
{\displaystyle \int _{-\infty }^{+\infty }[\phi (t)-(\omega _{0}t+\theta )]^{2}\,dt.}
在訊號處理領域,維格納–威利分佈 定義中需要解析訊號,因此該方法在實際應用中具有理想特性。[5]
有時復包絡與復振幅 同義;[a] [b] [c] 包絡 振幅 。
^ "the complex envelope (or complex amplitude)"[6]
^ "the complex envelope (or complex amplitude)", p.586 [7]
^ "Complex envelope is an extended interpretation of complex amplitude as a function of time." p.85[8]
參考文獻 [ 編輯 ]
^ ``Mathematics of the Discrete Fourier Transform (DFT), with Audio Applications --- Second Edition, by Julius O. Smith III, W3K Publishing, 2007, ISBN 978-0-9745607-4-8 . Copyright © 2014-04-21 by Julius O. Smith III
Center for Computer Research in Music and Acoustics (CCRMA), Stanford University, https://ccrma.stanford.edu/~jos/r320/Analytic_Signals_Hilbert_Transform.html (頁面存檔備份 ,存於互聯網檔案館 )[7/16/2014 1:07:57 PM]
^ 2.0 2.1 Bracewell, Ron. The Fourier Transform and Its Applications . McGraw-Hill, 1965. p269
^ B. Boashash, "Estimating and Interpreting the Instantaneous Frequency of a Signal-Part I: Fundamentals", Proceedings of the IEEE, Vol. 80, No. 4, pp. 519-538, April 1992
^ Justice, J. Analytic signal processing in music computation . IEEE Transactions on Acoustics, Speech, and Signal Processing. 1979-12-01, 27 (6): 670–684 [2016-08-05 ] . ISSN 0096-3518 doi:10.1109/TASSP.1979.1163321 存檔 於2014-10-20). ^ B. Boashash, 「Notes on the use of the Wigner distribution for time frequency signal analysis」, IEEE Trans. on Acoustics, Speech, and Signal Processing , vol. 26, no. 9, 1987
^ Hlawatsch, Franz; Auger, François. Time-Frequency Analysis . John Wiley & Sons. 2013-03-01. ISBN 9781118623831(英語) . ^ Driggers, Ronald G. Encyclopedia of Optical Engineering: Abe-Las, pages 1-1024 . CRC Press. 2003-01-01 [2016-08-05 ] . ISBN 9780824742508存檔 於2014-10-21) (英語) . ^ Okamoto, Kenʼichi. Global Environment Remote Sensing . IOS Press. 2001-01-01. ISBN 9781586031015(英語) .
延伸閱讀 [ 編輯 ] Leon Cohen, Time-frequency analysis , Prentice Hall, Upper Saddle River, 1995.
Frederick W. King, Hilbert Transforms , vol. II, Cambridge University Press, Cambridge, 2009.
B. Boashash, Time-Frequency Signal Analysis and Processing: A Comprehensive Reference , Elsevier Science, Oxford, 2003. 外部連結 [ 編輯 ] 
![{\displaystyle {\begin{aligned}S(f)&={\begin{cases}{\frac {1}{2}}S_{\mathrm {a} }(f),&{\text{for}}\ f>0,\\S_{\mathrm {a} }(f),&{\text{for}}\ f=0,\\{\frac {1}{2}}S_{\mathrm {a} }(-f)^{*},&{\text{for}}\ f<0\ {\text{(Hermitian symmetry)}}\end{cases}}\\&={\frac {1}{2}}[S_{\mathrm {a} }(f)+S_{\mathrm {a} }(-f)^{*}].\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/641488b89157adff28b410cdd5db079397e49e42)
![{\displaystyle {\begin{aligned}s_{\mathrm {a} }(t)&{\stackrel {\mathrm {def} }{{}={}}}{\mathcal {F}}^{-1}[S_{\mathrm {a} }(f)]\\&={\mathcal {F}}^{-1}[S(f)+\operatorname {sgn}(f)\cdot S(f)]\\&=\underbrace {{\mathcal {F}}^{-1}\{S(f)\}} _{s(t)}+\overbrace {\underbrace {{\mathcal {F}}^{-1}\{\operatorname {sgn}(f)\}} _{j{\frac {1}{\pi t}}}*\underbrace {{\mathcal {F}}^{-1}\{S(f)\}} _{s(t)}} ^{convolution}\\&=s(t)+j\underbrace {\left[{1 \over \pi t}*s(t)\right]} _{\operatorname {\mathcal {H}} [s(t)]}\\&=s(t)+j{\hat {s}}(t),\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/555facdeeb8a983551c93cdac29a005618604881)
![{\displaystyle {\hat {s}}(t){\stackrel {\mathrm {def} }{{}={}}}\operatorname {\mathcal {H}} [s(t)]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/eb5eb71b4428ffad1d004d4edff86f4b6553f001)
![{\displaystyle s(t)=\operatorname {Re} [s_{\mathrm {a} }(t)]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/01b2b0b048c344b45666f9bdb18eafbe3d9579fd)
![{\displaystyle \operatorname {Im} [s_{\mathrm {a} }(t)]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/a46373663e75d8458d4a3c4ed17306abbe6a2062)
![{\displaystyle \operatorname {Re} [s_{\mathrm {a} }^{*}(t)]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/d40821bf3a3c2ec9cea68e74480df669643cabe9)
![{\displaystyle \phi (t){\stackrel {\mathrm {def} }{{}={}}}\arg \!\left[s_{\mathrm {a} }(t)\right]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/17665909218975f34e9917c7312a4d051f15afbd)
![{\displaystyle \int _{-\infty }^{+\infty }[\omega (t)-\omega _{0}]^{2}|s_{\mathrm {a} }(t)|^{2}\,dt}](https://wikimedia.org/api/rest_v1/media/math/render/svg/49707ed8e6b2a70796b660e58addaa6cd63054a5)
![{\displaystyle \int _{-\infty }^{+\infty }[\phi (t)-(\omega _{0}t+\theta )]^{2}\,dt.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/260b4957a0fdd2b8444092dfd7fb331e169ff50d)