1. SEISMIC WAVES ATTENUATE - DECREASE IN AMPLITUDE -AS THEY PROPAGATE (S&W 3.7)
Important for earth physics, understanding earthquake size, and seismic hazard

2. MODIFIED MERCALLI INTENSITY SCALE
Macroscopic measure of shaking
Estimated for historic earthquakes from accounts of what happened
Plot isoseismals - intensity contours
Decays with distance
Proportional to acceleration, details unclear

3. 0.2 g Damage onset for modern buildings

4. EARTHQUAKE MAGNITUDE Earliest measure of earthquake size
Dimensionless number measured various ways, including
ML local magnitude
mb body wave magnitude
Ms surface wave magnitude
Mw moment magnitude
Easy to measure
No direct tie to physics of faulting

5. CONSEQUENCES OF SHAKING DIFFERENCES
Northridge, M 6.7, was the costliest disaster in U.S. history with economic loss of $40 billion. In contrast, loss in Nisqually earthquake is ~$2 billion. One death, a heart attack victim, reported in Seattle area, while 57 people died in the Northridge earthquake.

6. NORTHRIDGE EARHQUAKE Focal depth 18 km; Los Angeles Basin shortening
NISQUALLY EARTHQUAKE Focal depth 58 km; in subducting Juan de Fuca plate
NORTHRIDGE EARHQUAKE Focal depth 18 km; Los Angeles Basin shortening
AFTERSHOCKS
Kirby et al., 1996

7. FOUR OTHER PROCESSES ALSO REDUCE WAVE AMPLITUDES:
REFLECTION AND TRANSMISSION OF SEISMIC WAVES AT DISCRETE INTERFACES REDUCE THEIR AMPLITUDES.
FOUR OTHER PROCESSES ALSO REDUCE WAVE AMPLITUDES:
- GEOMETRICAL SPREADING
SCATTERING
MULTIPATHING
ANELASTICITY
THE FIRST THREE ARE ELASTIC PROCESSES, IN WHICH
THE ENERGY IN THE PROPAGATING WAVE FIELD IS CONSERVED.
IN CONTRAST, ANELASTICITY, SOMETIMES CALLED INTRINSIC ATTENUATION, INVOLVES CONVERSION OF SEISMIC ENERGY TO HEAT.

8. ANALOGOUS BEHAVIORS FOR LIGHT
AS YOU MOVE AWAY FROM A STREET LAMP AT NIGHT, THE LIGHT APPEARS DIMMER FOR SEVERAL REASONS
1) Geometric spreading: light moves outward from lamp in expanding spherical wave fronts. By conservation of energy, the energy in a unit area of the growing wave front decreases as r-2, where r is the radius of the sphere or distance from the lamp.
2) Scattering: light dims as it is scattered by air molecules, dust, and water in the air. Scattering results when objects acting as Huygens' sources scatter energy in all directions. This effect is dramatic on a foggy night because scattered light causes a halo around the lamp.

9. 3) Light is focused or defocused by changes in the refractive properties of the air. This process causes mirages, where light is refracted differently by hot air just above the ground.
Similarly the distorted appearance of the setting sun results from seeing different parts of it through different levels of the atmosphere which refract light differently because of the vertical density gradient.
This effect is termed multipathing in seismology. Focusing and defocusing can be illustrated by looking at the street light through binoculars. Looking through binoculars the usual way, the waves are focused by the lenses, and the lamp appears closer and brighter. Reversing the binoculars makes the lamp appear further and dimmer.
4) Some light energy is absorbed by the air and converted to heat. This process differs from the other three in that light energy is actually lost, not just moved onto a different path.

10. ALL FOUR PROCESSES ARE IMPORTANT FOR SEISMIC WAVES.
The first three are described by elastic wave theory, and can increase or decrease an arrival's amplitude by shifting energy within the wave field.
In contrast, anelasticity only reduces wave amplitudes because energy is lost from the elastic waves.
So much of seismology is built upon the approximation that the earth responds elastically during seismic propagation that it is easy to forget that the earth is not
perfectly elastic.
However, without anelasticity seismic waves from every earthquake that ever occurred would still be reverberating until the accumulating reverberations shattered the earth.
Elasticity is a good approximation for the earth's response to seismic waves, but there are many important implications and applications of anelasticity.

11. Expect minimum at =90º, and maxima at 0º and 180º
GEOMETRIC SPREADING: SURFACE WAVES
Expect minimum at =90º, and maxima at 0º and 180º

12. Also have effects of anelasticity
From geometric spreading alone, expect minimum at =90º, and maxima at 0º and 180º
Also have effects of anelasticity

13. GEOMETRIC SPREADING: BODY WAVES
For body waves, consider a spherical wavefront moving away from a deep earthquake. Energy is conserved on the expanding spherical wavefront whose area is 4 π r 2, where r is the radius of the wavefront.
Thus the energy per unit wave front decays as 1 / r2, and the amplitude decreases as 1 / r
In reality, because body waves travel through an inhomogeneous earth, their amplitude depends on the focusing and defocusing of rays by the velocity structure.

14. MULTIPATHING
Seismic waves are focused and defocused by lateral variations in velocity.
Although physically this process is the same as the effects of vertical variations, it is often distinguished by the term multipathing.
The distinction reflects our view of the earth as an essentially layered planet with secondary lateral variations.

16. TRACE RAY PATHS USING SNELL’S LAW
RAYS BEND AS WATER DEPTH CHANGES
FIND WHEN WAVES ARRIVE AT DIFFERENT PLACES
DENSITY OF WAVES SHOWS FOCUSING & DEFOCUSING
1 hour
Woods & Okal, 1987

17. When multipathing occurs, seismic waves arriving at a receiver can be viewed as having taken ray paths in addition to the direct path, and so sampled a larger region of the earth.
Fermat's principle giving the geometric ray path applies exactly only to waves of infinite frequency. For waves of finite frequency, we view the seismic waveform as a coherent sum of energy that travels all possible paths that arrive within a half-period of the infinite frequency wave, which took the shortest time. These paths form a volume called the first Fresnel zone around the infinite-frequency path. Successive half periods correspond to higher order Fresnel zones.

18. Whether effects of velocity heterogeneity are regarded as scattering depends on the ratio of heterogeneity size to the wavelength and the distance the wave travels in the heterogeneous region.
When the heterogeneity is large compared to the wavelength, we regard the wave as following a distinct ray path distorted by multipathing.
When velocity heterogeneities are close in size to the wavelength, we think of scattered energy rather than distinct ray paths.
When heterogeneities are << than the wavelength, they simply change the medium's overall properties. The further the wave travels in the heterogeneous region, the more useful the scattering description becomes. Hence for longer distances, the wavelength range viewed as scattering increases.
a = size of heterogeneity
L = distance wave travels
 = wavelength

19. The fact that light scattering in the atmosphere depends on wavelength and the distance traveled has familiar consequences. Because the shortest wavelengths of visible light are the most scattered, blue light reaching us from all directions makes the sky appear blue.
The loss of blue light makes the sun appear yellow, although it would appear white if observed from a spacecraft.
At sunset, when the sunlight passes through a longer path in the atmosphere than at other hours, intermediate wavelengths are also scattered, leaving direct light from the sun enhanced in the longest visible wavelengths (red light) and making the sun appear red.

20. The unscattered wave travels the shortest distance and gives the initial arrival. Scattered energy lost from this arrival arrives later & could have been scattered from an infinite number of locations that yield the observed travel time. In a constant-velocity medium, the locus of possible scatterers is an ellipsoid with the source and receiver as foci. Larger ellipsoids define the possible scatterers for energy that arrives later. These ellipsoids are distorted by velocity heterogeneity and are analogous to the Fresnel volume used when we consider the waves as following distinct ray paths.

21. The terrestrial record shows high attenuation,
whereas the lunar seismogram shows intense scattering due to the
fractured regolith and very weak attenuation due to the lack of intergranular water

27. ANALYZE NORMAL MODE SINGLETS with time domain fitting
SUMATRA EARTHQUAKE:
ANALYZE NORMAL MODE SINGLETS
with time domain fitting

30. No attenuation -> Q = ∞ 1/Q =0
Q and Q-1
The solution for the damped harmonic oscillator incorporated the damping through the quality factor Q.
Attenuation for seismic waves and a variety of other physical phenomena are often discussed in terms of Q or Q -1.
Although Q has more convenient values, Q -1 has the advantage that is directly rather than inversely proportional to the damping.
No attenuation -> Q = ∞ 1/Q =0
High attenuation -> Q low 1/Q high

31. Q OF WAVES VS Q OF THE EARTH
In some cases, Q describes the decay of an oscillation, whereas in others it describes the physical properties of the system that causes a disturbance to attenuate.
For example, the Q of a seismic wave at a given period describes how it decays with time. This decay results from the distribution of material in the earth that causes seismic energy to be lost to heat. This distribution can be described in terms of a Q or anelastic attenuation structure analogous to the elastic velocity structure.
Anelastic structure is analogous to the elastic velocity structure because Q can be viewed mathematically as an imaginary part of
the frequency P =  + i* * =  / 2Q
or the velocity c = c + i c* Q-1 = 2c*/c
Hence we define Q and Q for P & S waves
If there is no attenuation, Q = ∞ , the frequency & velocity are purely real

32. MODEL ANELASTICITY IN THE EARTH
Response to harmonic wave peaked around natural frequency
Peak width proportional to 1/Q

35. Schematic model to explain why Q is roughly constant over a wide range of frequencies.
Superposition of absorption peaks for different compositions
at different temperatures and pressures
yields a flat absorption band.

36. MANY GEOPHYSICAL PROCESSES (MANTLE CONVECTION, PLATE TECTONICS, MAGMATISM, ETC.) INVOLVE LATERAL VARIATIONS IN TEMPERATURE.
Elastic velocities are sensitive to temperature, but are more useful for mapping cold (fast) anomalies like subducting slabs than hot (slow) material like that expected at mantle plumes. Seismic velocities depend nearly linearly upon temperature, whereas attenuation depends exponentially on temperature. Thus combining velocity and attenuation studies can provide valuable information.

37. HIGH-ATTENUATION REGION INTERPRETED AS MELT-FILLED
LOW-VELOCITY AND
HIGH-ATTENUATION REGION INTERPRETED AS MELT-FILLED
MAGMA CHAMBER

38. Q > 10,000 in the cold and rigid subducting slab but is less than 75 beneath the hot back-arc basin.

39. ATTENUATION VARIES BOTH WITH DEPTH AND LATERALLY
In the crust, the greatest attenuation
(lowest Q or highest Q-1) is near the surface, presumably due fluids. Attenuation is lowest at ~20-25 km, and increases again, presumably due to increasing temperature.
Attenuation decreases as a function of frequency.
Attenuation is lower in the eastern U.S. than in the hot, tectonically active, Basin and Range

40. Attenuation is lower - or wave propagation more efficient -in the eastern U.S. than in the western U.S., which is hotter and tectonically active

41. Seismograms from an earthquake in Texas
recorded in Nevada and Missouri.
The MNV record has less high frequencies
because the tectonically-active western U.S.
is more attenuating than the stable mid-continent.

42. STRONG GROUND MOTION DECAYS RAPIDLY WITH DISTANCE

43. 1811-12 EARTHQUAKE MAGNITUDES
Largest earthquakes caused log cabin collapse at New Madrid; minor damage in St Louis, Nashville, Louisville, etc.
Imply
low-mid M7
(Hough et al., 2000)
M 7.2 fits observed building damage better (Kochkin &
Crandell, 2004)