Segmenting datasets: Difference between revisions
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This segmenting step dictates the minimum [[Burst sampling|burst]] duration when setting up your equipment. The act of chopping a time series into smaller subsets, i.e., segments, is effectively a form of low-pass (box-car) filtering. The length of the [[Segmenting datasets|segment]] in time is usually a more important consideration than [[Detrending time series|detrending the time series]] when estimating <math>\varepsilon</math> from the [[Velocity inertial subrange model|inertial subrange]] of the final spectra. | This segmenting step dictates the minimum [[Burst sampling|burst]] duration when setting up your equipment. The act of chopping a time series into smaller subsets, i.e., segments, is effectively a form of low-pass (box-car) filtering. The length of the [[Segmenting datasets|segment]] in time is usually a more important consideration than [[Detrending time series|detrending the time series]] when estimating <math>\varepsilon</math> from the [[Velocity inertial subrange model|inertial subrange]] of the final spectra. | ||
The shorter the segment, the higher the temporal resolution of the final <math>\varepsilon</math> time series, and the more likely the segment will be [[Stationarity|stationary]]. The segment must remain sufficiently long such that the lowest wavenumber (frequencies) of the [[Velocity inertial subrange model|inertial subrange]] are retained by the spectra. This is particularly important when measurement noise drowns the highest wavenumber (frequencies) of the [[Velocity inertial subrange model|inertial subrange]]. Thus, using too short segments may inadvertently render the spectra unusable for deriving <math>\varepsilon</math> from the [[Velocity inertial subrange model|inertial subrange]] by virtue of no longer resolving this subrange as shown in ([[#fftlength|Fig. 3]]) | The shorter the segment, the higher the temporal resolution of the final <math>\varepsilon</math> time series, and the more likely the segment will be [[Stationarity|stationary]]. The segment must remain sufficiently long such that the lowest wavenumber (frequencies) of the [[Velocity inertial subrange model|inertial subrange]] are retained by the [[Compute the spectra|computed spectra]]. This is particularly important when measurement noise drowns the highest wavenumber (frequencies) of the [[Velocity inertial subrange model|inertial subrange]]. Thus, using too short segments may inadvertently render the spectra unusable for deriving <math>\varepsilon</math> from the [[Velocity inertial subrange model|inertial subrange]] by virtue of no longer resolving this subrange as shown in ([[#fftlength|Fig. 3]]). | ||
== Recommendations== | == Recommendations== |
Revision as of 23:59, 10 July 2022
Once the raw observations have been quality-controlled, then you must split the time series into shorter segments by considering:
- Time and length scales of turbulence
- Stationarity of the segment and Taylor's frozen turbulence hypothesis
- Required statistical significance of the resulting spectra (only important if you need to remove motion-induced contamination from the spectra)
Considerations
Measurements are typically collected in the following two ways:
- continuously, or in such long bursts that they can be considered continuous
- short bursts that are typically at most 2-3x the expected largest turbulence time scales (e.g., 10 min in ocean environments)
This segmenting step dictates the minimum burst duration when setting up your equipment. The act of chopping a time series into smaller subsets, i.e., segments, is effectively a form of low-pass (box-car) filtering. The length of the segment in time is usually a more important consideration than detrending the time series when estimating [math]\displaystyle{ \varepsilon }[/math] from the inertial subrange of the final spectra.
The shorter the segment, the higher the temporal resolution of the final [math]\displaystyle{ \varepsilon }[/math] time series, and the more likely the segment will be stationary. The segment must remain sufficiently long such that the lowest wavenumber (frequencies) of the inertial subrange are retained by the computed spectra. This is particularly important when measurement noise drowns the highest wavenumber (frequencies) of the inertial subrange. Thus, using too short segments may inadvertently render the spectra unusable for deriving [math]\displaystyle{ \varepsilon }[/math] from the inertial subrange by virtue of no longer resolving this subrange as shown in (Fig. 3).
Recommendations
A good rule of thumb for tidally-influenced environments is 5 to 15 min segments, but this may be shorter in certain energetic and fast-moving flows (Fig. 1) and longer in less energetic environments (Fig.2). The final segment length is partly a function of the fft-length and the desired statistical significance (degrees of freedom) of the final spectra.
Minimum fft-length
Fig. 3 provides a guide to the fft-length required for resolving different subrange as a function of the speed past the sensor, and [math]\displaystyle{ \varepsilon }[/math]. For instance, an fft-length of 4 s would resolve one decade of the inertial subrange at speeds past the sensor of 0.5 m/s and [math]\displaystyle{ \varepsilon\sim10^{-7} }[/math] W/kg. Longer segments would be required for slower flows or lower [math]\displaystyle{ \varepsilon }[/math]. At [math]\displaystyle{ \varepsilon\approx10^{-9} }[/math] W/kg, one decade of the inertial subrange would be resolved with an fft-length longer than 10s provided the speed was faster than 0.5 m/s.
Because the inertial subrange may be contaminated at the highest wavenumbers by instrument noise, we suggest using longer segments than the minimum shown in Fig. 3b. This strategy also enables having a larger number of spectral observations to fit over the inertial subrange given the spectral resolution also depends on the fft-length.
Minimum segment-length
The final segment length may be larger than the fft-length if using block averaging for the spectral computations. Is this explained in the spectral page?
Are the peaks in the MAVS data vortex shedding from the rings. Check the motion sensors onboard?
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