Audio time-scale/pitch modification

This article is about time stretching in audio. For the EP by Bassnectar, see Timestretch (album). For other uses, see Time stretching (disambiguation).

Time stretching is the process of changing the speed or duration of an audio signal without affecting its pitch. Pitch scaling or pitch shifting is the opposite: the process of changing the pitch without affecting the speed. Similar methods can change speed, pitch, or both at once, in a time-varying way.

These processes are used, for instance, to match the pitches and tempos of two pre-recorded clips for mixing when the clips cannot be reperformed or resampled. (A drum track containing no pitched instruments could be moderately resampled for tempo without adverse effects, but a pitched track could not). They are also used to create effects such as increasing the range of an instrument (like pitch shifting a guitar down an octave).

Resampling

The simplest way to change the duration or pitch of a digital audio clip is to resample it. This is a mathematical operation that effectively rebuilds a continuous waveform from its samples and then samples that waveform again at a different rate. When the new samples are played at the original sampling frequency, the audio clip sounds faster or slower. Unfortunately, the frequencies in the sample are always scaled at the same rate as the speed, transposing its perceived pitch up or down in the process. In other words, slowing down the recording lowers the pitch, speeding it up raises the pitch, and using this method the two effects cannot be separated. This is analogous to speeding up or slowing down an analogue recording, like a phonograph record or tape, creating the Chipmunk effect.

Frequency domain

Phase vocoder

Main article: Phase vocoder

One way of stretching the length of a signal without affecting the pitch is to build a phase vocoder after Flanagan, Golden, and Portnoff.

Basic steps:

  1. compute the instantaneous frequency/amplitude relationship of the signal using the STFT, which is the discrete Fourier transform of a short, overlapping and smoothly windowed block of samples;
  2. apply some processing to the Fourier transform magnitudes and phases (like resampling the FFT blocks); and
  3. perform an inverse STFT by taking the inverse Fourier transform on each chunk and adding the resulting waveform chunks, also called overlap and add (OLA).[1]

The phase vocoder handles sinusoid components well, but early implementations introduced considerable smearing on transient ("beat") waveforms at all non-integer compression/expansion rates, which renders the results phasey and diffuse. Recent improvements allow better quality results at all compression/expansion ratios but a residual smearing effect still remains.

The phase vocoder technique can also be used to perform pitch shifting, chorusing, timbre manipulation, harmonizing, and other unusual modifications, all of which can be changed as a function of time.

Sinusoidal spectral modeling

Sinusoidal analysis/synthesis system (based on McAulay & Quatieri 1988, p. 161)[2]

Another method for time stretching relies on a spectral model of the signal. In this method, peaks are identified in frames using the STFT of the signal, and sinusoidal "tracks" are created by connecting peaks in adjacent frames. The tracks are then re-synthesized at a new time scale. This method can yield good results on both polyphonic and percussive material, especially when the signal is separated into sub-bands. However, this method is more computationally demanding than other methods.

Time domain

SOLA

See also: PSOLA

Rabiner and Schafer in 1978 put forth an alternate solution that works in the time domain: attempt to find the period (or equivalently the fundamental frequency) of a given section of the wave using some pitch detection algorithm (commonly the peak of the signal's autocorrelation, or sometimes cepstral processing), and crossfade one period into another.

This is called time-domain harmonic scaling[3] or the synchronized overlap-add method (SOLA) and performs somewhat faster than the phase vocoder on slower machines but fails when the autocorrelation mis-estimates the period of a signal with complicated harmonics (such as orchestral pieces).

Adobe Audition (formerly Cool Edit Pro) seems to solve this by looking for the period closest to a center period that the user specifies, which should be an integer multiple of the tempo, and between 30 Hz and the lowest bass frequency.

This is much more limited in scope than the phase vocoder based processing, but can be made much less processor intensive, for real-time applications. It provides the most coherent results for single-pitched sounds like voice or musically monophonic instrument recordings.

High-end commercial audio processing packages either combine the two techniques (for example by separating the signal into sinusoid and transient waveforms), or use other techniques based on the wavelet transform, or artificial neural network processing, producing the highest-quality time stretching.

Untangling phase and time

Modelling a monophonic sound as observation along a helix of a function with a cylinder domain

Another way to shift pitch and stretch time is to separate phase and time in a monophonic sound such as the ones of melody instruments. By altering only the time control, it is possible to stretch, shrink or reverse time, or generate loops as needed in sampling synthesizers. Time shrinkage can also be used for compression purposes. By altering only the phase control, the pitch can be shifted, FM synthesis distortions can be applied to an existing sound. This can be used to play instruments alternatively to wavetable synthesis.

For controlling phase and time independently we would need to know the displacement of the sound for every pair of phase and time position. This corresponds to a cylinder as shown in the figure. However, a sound signal is a one-dimensional signal.

This sound signal can be considered as an observation of the full function on the cylinder. This is drawn as black line in the figure. The full function on the cylinder can be approximated by interpolating between points on the helix with (approximately) the same phase. From this function a different sound signal can be derived. E.g. in the figure the grey line shows the path of a sound that has the same time progression but a frequency lower than the original one, or a sound that has the same frequency and a faster time progression, or something between. In the end the whole process can be implemented for discrete sound signals as interpolation between values with similar phase and similar time. [4]

The described technique is used in the monophonic version of the software Melodyne[5]

Speed hearing and speed talking

For the specific case of speech, time stretching can be performed using PSOLA.

Time stretching can be used with audiobooks and recorded lectures. Slowing down may improve comprehension of foreign languages .

While one might expect speeding up to reduce comprehension, Herb Friedman says that "Experiments have shown that the brain works most efficiently if the information rate through the ears--via speech--is the "average" reading rate, which is about 200-300 wpm (words per minute), yet the average rate of speech is in the neighborhood of 100-150 wpm."

Speeding up audio is seen as the equivalent of "speed reading" .

Time stretching is often used to adjust Radio commercials and the audio of Television advertisements to fit exactly into the 30 or 60 seconds available.

Pitch scaling

These techniques can also be used to transpose an audio sample while holding speed or duration constant. This may be accomplished by time stretching and then resampling back to the original length. Alternatively, the frequency of the sinusoids in a sinusoidal model may be altered directly, and the signal reconstructed at the appropriate time scale.

Transposing can be called frequency scaling or pitch shifting, depending on perspective.

For example, one could move the pitch of every note up by a perfect fifth, keeping the tempo the same. One can view this transposition as "pitch shifting", "shifting" each note up 7 keys on a piano keyboard, or adding a fixed amount on the Mel scale, or adding a fixed amount in linear pitch space. One can view the same transposition as "frequency scaling", "scaling" (multiplying) the frequency of every note by 3/2.

Musical transposition preserves the ratios of the harmonic frequencies that determine the sound's timbre, unlike the frequency shift performed by amplitude modulation, which adds a fixed frequency offset to the frequency of every note. (In theory one could perform a literal pitch scaling in which the musical pitch space location is scaled [a higher note would be shifted at a greater interval in linear pitch space than a lower note], but that is highly unusual, and not musical).

Time domain processing works much better here, as smearing is less noticeable, but scaling vocal samples distorts the formants into a sort of Alvin and the Chipmunks-like effect, which may be desirable or undesirable. A process that preserves the formants and character of a voice involves analyzing the signal with a channel vocoder or LPC vocoder plus any of several pitch detection algorithms and then resynthesizing it at a different fundamental frequency.

A detailed description of older analog recording techniques for pitch shifting can be found within the Alvin and the Chipmunks entry.

See also

References

  1. Jont B. Allen (June 1977). "Short Time Spectral Analysis, Synthesis, and Modification by Discrete Fourier Transform". IEEE Transactions on Acoustics, Speech, and Signal Processing. ASSP-25 (3): 235–238.
  2. McAulay, R. J.; Quatieri, T. F. (1988), "Speech Processing Based on a Sinusoidal Model" (PDF), The Lincoln Laboratory Journal 1 (2): 153167
  3. David Malah (April 1979). "Time-domain algorithms for harmonic bandwidth reduction and time scaling of speech signals". IEEE Transactions on Acoustics, Speech, and Signal Processing. ASSP-27 (2): 121–133.
  4. Thielemann, Henning (December 2010). "Untangling phase and time in monophonic sounds". Journal of Signal and Information Processing 1 (1): 1–17. arXiv:0911.5171. doi:10.4236/jsip.2010.11001.
  5. "Melodyne inventor Peter Neubäcker (film portrait) (starting from 26:00)", YouTube (Celemony), retrieved 2011-09-11

External links

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