Seismic array

A seismic array is a system of linked seismometers arranged in a regular geometric pattern (cross, circle, rectangular etc.) to increase sensitivity to earthquake and explosion detection. A seismic array differs from a local network of seismic stations mainly by the techniques used for data analysis.[1] The data from a seismic array is obtained using special digital signal processing techniques such as beamforming, which suppress noises and thus enhance the signal-to-noise ratio (SNR).

The earliest seismic arrays were built in 1950s in order to improve the detection of nuclear tests worldwide. Many of these deployed arrays were classified until 1990s. Today they become part of the IMS as primary or auxiliary stations. Seismic arrays are not only used to monitor earthquakes and nuclear tests, but also used as a tool for investigating nature and source regions of microseisms as well as locating and tracking volcanic tremor and analyzing complex seismic wave-field properties in volcanic areas.

Layout

Layout of Yellowknife Seismological Array (YKA) in Canada. Shortband seismometers are installed on blue and red sites, while broadband seismometers are installed on green sites.[1]

Seismic arrays can be classified by size, which is defined by the array's aperture given by the largest distance between the single seismometers.

The sensors in a seismic array are arranged in different geometry patterns horizontally. The arrays built in early 1960s were either cross (orthogonal linear) or L-shaped. The aperture of these arrays ranges from 10 to 25 km. Modern seismic arrays such as NORES and ARCES are located on concentric rings spaced at log-periodic intervals. Each ring consists of an odd number of seismometer sites. The number of rings and aperture differ from array to array, determined by economy and purpose.[1]

Take the NORES design as an example, seismometers are placed on 4 concentric rings. The radii of the 4 rings are given by:

R_{n}=R_{min}\cdot 2.15^{n}(n=0,1,2,3), R_{min}=150m

If the three sites in the inner ring are placed at 36, 156 and 276 degrees from due North, the five sites in the outer ring might be placed at 0, 72, 144, 216 and 288 degrees. This class of design is considered to provide the best overall array gain.

Data processing

Array beamforming

With a seismic array the signal-to-noise ratio (SNR) of a seismic signal can be improved by summing the coherent signals from the single array sites. The most important point during the beamforming process is to find the best delay times, with which the single traces must be shifted before summation in order to get the largest amplitudes due to coherent interference of the signals.

A wavefront coming from north-east and crossing a seismic array[1]

For distances from the source much larger than about 10 wavelengths, a seismic wave approaches an array as a wavefront that is close to planar. The directions of approach and propagation of the wavefront projected onto the horizontal plane are defined by the angles Φ and Θ.

In most cases, the elevation differences between single array sites are so small that travel-time differences due to elevation differences are negligible. In this case, we cannot measure the vertical component of the wavefront propagation. The time delay τj between the center site 0 and site j with the relative coordinates (xj, yj) is

\tau _{j}={\frac {d_{j}}{v_{app,h}}}={\frac {-x_{j}sin\Phi -y_{j}cos\Phi }{v_{app,h}}}

In some cases, not all array sites are located on one horizontal plane. The time delays τj also depends on the local crustal velocities (vc) below the given site j. The calculation of τj with coordinates (xj, yj, zj) is

\tau _{j}={\frac {-x_{j}sin\Phi -y_{j}cos\Phi }{v_{app,h}}}+{\frac {z_{j}cos\Phi }{v_{c}}}

In both the calculation can be written in vector syntax with position vector r_{j} and slowness vector s_{j}:

\tau _{j}=r_{j}\cdot s_{j}

Let wj(t) be the digital sample of the seismometer from site j at time t, then the beam of the whole array is defined as

b(t)={\frac {1}{M}}\sum _{j=1}^{M}w_{j}(t+\tau _{j})

If seismic waves are harmonic waves S(t) without noise, with identical site responses, and without attenuation, then the above operation would reproduce the signal S(t) accurately. Real data w(t) are the sum of background noise n(t) plus the signal of interest S(t), i.e. w(t) = S(t) + n(t). Assuming that the signal is coherent and not attenuated, calculating the sum of M observations and including noise we get

B(t)=M\cdot S(t)+\sum _{j=1}^{M}n_{j}(t+\tau _{j})

Assuming that the noise nj(t) has a normal amplitude distribution with zero mean and variance σ2 at all sites, then the variance of the noise after summation is \sigma _{s}^{2}=M\sigma ^{2} and the standard deviation is {\sqrt {M}}\sigma ^{2}. That means the standard deviation of the noise is multiplied by {\sqrt {M}} while the coherent signal is multiplied by M. The theoretical improvement of the SNR by beamforming (aka array gain) will be G={\sqrt {M}} for an array containing M sites.[1]

The N-th root process

N-th root process is a non-linear method to enhance the SNR during beamforming. Before summing up the single seismic traces, the N-th root is calculated for each trace retaining the sign information. signum{wj(t)} is a function defined as -1 or +1, depending on the sign of the actual sample wj(t). N is an integer that has to be chosen by the analyst

B_{N}(t)=\sum _{j=1}^{M}{\sqrt[{N}]{n_{j}(t+\tau _{j})}}\cdot signum\{w_{j}(t)\}

Here the value of the function signum\{w_{j}(t)\} is defined as ±1 depending on the sign of the actual sample wj(t). After this summation, the beam has to be raised to the power of N

b(t)=|B_{N}(t)|^{N}\cdot signum\{w_{j}(t)\}

N-th root process was first proposed by K. J. Muirhead and Ram Dattin in 1976.[2] With N-th root process, the suppression of uncorrelated noise is better than with linear beamforming. However, it weights the coherency of a signal higher than the amplitudes, which results in a distortion of the waveforms.

Weighted stack methods

Schimmel and Paulssen introduced another non-linear stacking technique in 1997[3] to enhance signals through the reduction of incoherent noise, which shows a smaller waveform distortion than the N-th root process. Kennett proposed the use of the semblance of the signal as a weighting function in 2000[4] and achieved a similar resolution.

An easily implementable weighted stack method would be to weight the amplitudes of the single sites of an array with the SNR of the signal at this site before beamforming, but this does not directly exploit the coherency of the signals across the array. All weighted stack methods can increase the slowness resolution of velocity spectrum analysis.

Double beam technique

A cluster of earthquakes can be used as a source array to analyze coherent signals in the seismic coda. This idea was consequently expanded by Krüger et al. in 1993 by analyzing seismic array data from well-known source locations with the so-called "double beam method".[5] The principle of reciprocity is used for source and receiver arrays to further increase the resolution and the SNR for small amplitude signals by combining both arrays in a single analysis.

Array transfer function

The array transfer function describes sensitivity and resolution of an array for seismic signals with different frequency contents and slownesses. With an array, we are able to observe the wavenumber k=2\pi /\lambda =2\pi \cdot f\cdot s of this wave defined by its frequency f and its slowness s. While time-domain analog-to-digital conversion may give aliasing effects in the time domain, the spatial sampling may give aliasing effects in the wavenumber domain. Thus the wavelength range of seismic signals and the sensitivity at different wavelengths must be estimated.[1]

The difference between a signal w at the reference site A and the signal wn at any other sensor An is the travel time between the arrivals at the sensors. A plane wave is defined by its slowness vector so

w_{n}(t)=w(t-r_{n}\cdot s_{0}), where r_{n} is the position vector of site n

The best beam of an array with M sensors for a seismic signal for the slowness so is defined as

b(t)={\frac {1}{M}}\sum _{j=1}^{M}w_{j}(t+r_{j}\cdot s_{0})

If we calculate all time shifts for a signal with the slowness so with respect to any other slowness s, the calculated beam becomes

b(t)={\frac {1}{M}}\sum _{j=1}^{M}w_{j}(t+r_{j}\cdot (s_{0}-s))

The seismic energy of this beam can be calculated by integrating over the squared amplitudes

E(t)=\int _{-\infty }^{\infty }b^{2}(t)dt=\int _{-\infty }^{\infty }[{\frac {1}{M}}\sum _{j=1}^{M}w_{j}(t+r_{j}\cdot (s_{0}-s))]^{2}dt

This equation can be written in the frequency domain with {\bar {w}}(\omega ) being the Fourier transform of the seismogram w(t), using the definition of the wavenumber vector k = ω⋅ s

E(\omega ,k_{0}-k)={\frac {1}{2\pi }}\int _{-\infty }^{\infty }|{\bar {w}}(\omega )|^{2}\cdot |C(k_{0}-k)|^{2}d\omega , where C(k_{0}-k)={\frac {1}{M}}\sum _{j=1}^{M}e^{iwr_{j}(k_{0}-k)}

This equation is called the transfer function of an array. If the slowness difference is zero, the factor |C(k_{0}-k)|^{2} becomes 1.0 and the array is optimally tuned for this slowness. All other energy propagating with a different slowness will be suppressed.[1]

Slowness estimation

Slowness estimation is a matter of forming beams with different slowness vectors and comparing the amplitudes or the power of the beams, and finding out the best beam by looking for the vapp and backazimuth combination with the highest energy on the beam.

f-k analysis

Frequency-wavenumber analysis is used as a reference tool in array processing for estimating slowness. This method was proposed by Capon in 1969[6] and further developed to include wide-band analysis, maximum-likelihood estimation techniques, and three-component data in 1980s.[7]

The methodology exploits the deterministic, non-periodic character of seismic wave propagation to calculate the frequency-wavenumber spectrum of the signals by applying the multidimensional Fourier transform. A monochromatic plane wave w(x,t) will propagate along the x direction according to equation

w(x,t)=Ae^{i2\pi (f_{0}t-k_{0}x)}

It can be rewritten in frequency domain as

W(k_{x},f)=A\delta (f-f_{0})\delta (k_{x}-k_{0})

which suggests the possibility to map a monochromatic plane wave in the frequency-wavenumber domain to a point with coordinates (f, kx) = (f0, k0).

Practically, f-k analysis is performed in the frequency domain and represents in principle beamforming in the frequency domain for a number of different slowness values. At NORSAR slowness values between -0.4 and 0.4 s/km are used equally spaced over 51 by 51 points. For every one of these points the beam power is evaluated, giving an equally spaced grid of 2601 points with power information.[8]

Beampacking

A beampacking scheme was developed at NORSAR to apply f-k analysis of regional phases to data of large array.[8] This algorithm performs time-domain beamforming over a predefined grid of slowness points and measures the power of the beam.

In practice the beampacking process gives the same slowness estimate as for the f-k analysis in the frequency domain. Compared to the f-k process, the beampacking process results in a slightly (about 10%) narrower peak for the maximum power.

Plane wave fitting

Another way of estimating slowness is to pick carefully times of the first onset or any other common distinguishable part of the same phase (same cycle) for all instruments in an array.[1] Let ti be the arrival time picked at site i, and tref be the arrival time at the reference site, then τi = ti − tref is the observed time delay at site i. We observe the plane wave at M sites. With M ≥ 3. The horizontal components (sx, sy) of the slowness vector s can be estimated by

{\hat {s}}={\underset {s}{min}}\sum _{j=1}^{M}(\tau _{j}-r_{j}\cdot s)^{2}

Plane wave fitting requires interactive analyst's work. However, to obtain automatic time picks and thereby provide a slowness estimate automatically, techniques like cross-correlation or just picking of peak amplitude within a time window may be used.[9] Because of the amount of required computations, plane wave fitting is most effective for arrays with a smaller number of sites or for subarray configurations.

Applications

Current seismic arrays worldwide:

YKA

YKA or Yellowknife Seismological Array is a medium size seismic array established near Yellowknife in the Northwest Territories, Canada, in 1962, in cooperative agreement between the Department of Mines and Technical Surveys (now Natural Resources Canada) and the United Kingdom Atomic Energy Authority (UKAEA), to investigate the feasibility of teleseismic detection and identification of nuclear explosions. YKA currently consists of 19 short period seismic sensors in the form of a cross with an aperture of 2.5 km, plus 4 broadband seismograph sites with instruments able to detect a wide range of seismic wave frequencies.[10]

LASA

Configuration of large aperture array NORSAR and small aperture array NORES.[8]

LASA or Large Aperture Seismic Array is the first large seismic array. It was built in Montana, USA, in 1965.[11]

NORSAR

NORSAR or Norwegian Seismic Array was established at Kjeller, Norway in 1968 as part of the Norwegian-US agreement for the detection of earthquakes and nuclear explosions. It has been an independent, not-for-profit, research foundation within the field of geo-science since 1999. NORSAR was constructed as a large aperture array with a diameter of 100 km. It is the largest stand-alone array in the world.[8]

NORES and ARCES

NORES was the first regional seismic array constructed in southern Norway in 1984. A sister array ARCES was established in northern Norway in 1987. NORES and ARCES are small aperture arrays with a diameter of only 3 km.[8]

GERES

GERES is a small aperture array built in the Bavarian Forest near the border triangle of Germany, Austria and Czech, in 1988. It consists of 25 individual seismic stations arranged in 4 concentric rings with radius of 200m, 430m, 925m and 1988m.[12]

SPITS

SPITS is a very small aperture array at Spitsbergen, Norway. It was originally installed in 1992 and upgraded to IMS standard in 2007 by NORSAR.[13]

See also

References

  1. 1 2 3 4 5 6 7 8 Bormann, P (2012). New Manual of Seismological Observatory Practice (NMSOP-2). IASPEI. p. Chapter 9.
  2. Muirhead, K. J., and Ram Datt (1976). The N-th root process applied to seismic array data. Geophysical Journal International, 47(1), 197-210.
  3. Schimmel, M., and Paulssen, H. (1997). Noise reduction and detection of weak, coherent signals through phase-weighted stacks. Geophysical Journal International, 130(2), 497-505.
  4. Kennett, B. L. N. (2000). Stacking three-component seismograms. Geophysical Journal International, 141(1), 263-269.
  5. Krüger, F., Weber, M., Scherbaum, F., and Schlittenhardt, J. (1993). Double beam analysis of anomalies in the core-mantle boundary region. Geophysical Research Letters, 20(14), 1475-1478.
  6. Capon, J. (1969). High-resolution frequency-wavenumber spectrum analysis. Proceedings of the IEEE, 57(8), 1408-1418.
  7. Kværna, T., and Doornbos, D. J. (1986). An integrated approach to slowness analysis with arrays and three-component stations. NORSAR Semiannual Technucal Summary, 1, 2-85.
  8. 1 2 3 4 5 "NORSAR". Norsar.no. Retrieved 2015-11-17.
  9. Del Pezzo, E., and Giudicepietro, F. (2002). Plane wave fitting method for a plane, small aperture, short period seismic array: a MATHCAD program. Computers and Geosciences, 28(1), 59-64.
  10. "The Yellowknife Seismological Array". Can-ndc.nrcan.gc.ca. 2015-10-20. Retrieved 2015-11-17.
  11. Frosch, R. A., and Green, P. E., Jr. (1966). The concept of a large aperture seismic array. Proceedings of the Royal Society of London A: Mathematical, Physical and Engineering Sciences (Vol. 290, No. 1422, pp. 368-384). The Royal Society.
  12. "GERES - Deutsche IMS-Station: Seismische Primärstation GERES (PS19)" (in German). BGR. 2000-08-12. Retrieved 2015-11-17.
  13. "AS072, Spitsbergen, Norway: CTBTO Preparatory Commission". Ctbto.org. 2007-04-27. Retrieved 2015-11-17.
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