Generalized spectrogram

In order to view a signal (taken to be a function of time) represented over both time and frequency axis, time–frequency representation is used. Spectrogram is one of the most popular time-frequency representation, and generalized spectrogram, also called "two-window spectrogram", is the generalized application of spectrogram.

The definition of the spectrogram relies on the Gabor transform (also called short-time Fourier transform, for short STFT), whose idea is to localize a signal f in time by multiplying it with translations of a window function ${\displaystyle w(t)}$.

The definition of spectrogram is

${\displaystyle S{P}_{x,w}(t,f)=G_{x,w}(t,f)G_{{}_{x,w}}^{*}(t,f)=|G_{x,w}(t,f){|}^2}$,

where ${\displaystyle G_{x,w_1}}$ denotes the Gabor Transform of ${\displaystyle x(t)}$.

Based on the spectrogram, the generalized spectrogram is defined as:

${\displaystyle S{P}_{x,w_1,w_2}(t,f)=G_{x,w_1}(t,f)G_{{}_{x,w_2}}^{*}(t,f)}$,

where:

${\displaystyle G_{x,w_1}}\left(t,f\right)={\displaystyle \underset{-\mathrm{\infty }}{\overset{\mathrm{\infty }}{\int }}}{w}_1\left(t-\tau \right)x\left(\tau \right)e^{-j2\pi f\tau }d\tau$

${\displaystyle G_{x,w_2}}\left(t,f\right)={\displaystyle \underset{-\mathrm{\infty }}{\overset{\mathrm{\infty }}{\int }}}{w}_2\left(t-\tau \right)x\left(\tau \right)e^{-j2\pi f\tau }d\tau$

For ${\displaystyle w_1(t)=w_2(t)=w(t)}$, it reduces to the classical spectrogram:

${\displaystyle S{P}_{x,w}(t,f)=G_{x,w}(t,f)G_{{}_{x,w}}^{*}(t,f)=|G_{x,w}(t,f){|}^2}$

The feature of Generalized spectrogram is that the window sizes of ${\displaystyle w_1(t)}$ and ${\displaystyle w_2(t)}$ are different. Since the time-frequency resolution will be affected by the window size, if one choose a wide ${\displaystyle w_1(t)}$ and a narrow ${\displaystyle w_1(t)}$ (or the opposite), the resolutions of them will be high in different part of spectrogram. After the multiplication of these two Gabor transform, the resolutions of both time and frequency axis will be enhanced.

Relation with Wigner Distribution

${\displaystyle {{𝒮}{𝒫}}_{w_1,w_2}(t,f)(x,w)=Wig({w_1}^{\prime },{w_2}^{\prime })*Wig(t,f)(x,w),}$

where ${\displaystyle {w_1}^{\prime }(s):=w_1(-s),{w_2}^{\prime }(s):=w_2(-s)}$

Time marginal condition

The generalized spectrogram ${\displaystyle {{𝒮}{𝒫}}_{w_1,w_2}(t,f)(x,w)}$ satisfies the time marginal condition if and only if ${\displaystyle w_1{w_2}^{\prime }=\delta }$,

where ${\displaystyle \delta }$ denotes the Dirac delta function

Frequency marginal condition

The generalized spectrogram ${\displaystyle {{𝒮}{𝒫}}_{w_1,w_2}(t,f)(x,w)}$ satisfies the frequency marginal condition if and only if ${\displaystyle w_1{w_2}^{\prime }=\delta }$,

where ${\displaystyle \delta }$ denotes the Dirac delta function

Conservation of energy

The generalized spectrogram ${\displaystyle {{𝒮}{𝒫}}_{w_1,w_2}(t,f)(x,w)}$ satisfies the conservation of energy if and only if ${\displaystyle (w_1,w_2)=1}$.

Reality analysis

The generalized spectrogram ${\displaystyle {{𝒮}{𝒫}}_{w_1,w_2}(t,f)(x,w)}$ is real if and only if ${\displaystyle w_1=C{w}_2}$ for some ${\displaystyle C\in \mathbb{ℝ}}$.

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