lecture 4 - seismology hrvoje tkalčić
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LECTURE 4 - Seismology Hrvoje Tkalčić. Late Professor Bruce A. Bolt (1930-2005) with a model of Chang Heng’s seismoscope. - PowerPoint PPT PresentationTRANSCRIPT
*** N.B. The material presented in these lectures is from the principal textbooks, other books on similar subject, the research and lectures of my colleagues from various universities around the world, my own research, and finally, numerous web sites. Some colleagues to whom I am grateful for the material I used are: B. Bolt, P. Wu, B. Kennett, E. Garnero, E. Calais and D. Dreger. I am thankful to many others who make their research and teaching material available online; sometimes even a single figure or an idea about how to present a subject is a valuable resource. Please note that this PowerPoint presentation is not a complete lecture; it is most likely accompanied by an in-class presentation of main mathematical concepts (on transparencies or blackboard).***
LECTURE 4 - SeismologyHrvoje Tkalčić
Late Professor Bruce A. Bolt (1930-2005)with a model of Chang Heng’s seismoscope
Earthquakes as natural disasters: can we predict them?
• Victims in Banda Aceh, Indonesia, after the Sumatra-Andaman earthquake and tsunami in 2004 Pakistan, 2005
San Francisco, 1906
Tokyo-Yokohama, 1923
A simulation of the San Simeon earthquake, CA, through a model of 3D structure. This is achieved using a numerical finite difference method on a grid of points.
The main wave front is visibly refracted or bent by contrasts in the velocity across both the Hayward and San Andreas faults.
Concentrations of high amplitude standing waves persist throughout the movie around San Jose and in San Pablo Bay. These areas are low-velocity sedimentary basins and cause the amplitudes of ground motion to be amplified as well as extend the duration of the motions.
Both of these factors increase the level of hazard to structures.
Strong motion simulation in SF Bay Area
Courtesy of Prof. Douglas Dreger, UC Berkeley and Dr. Shawn Larsen, LLNL
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San
Francisco
Oakland
San Jose
San Andreas
Hayw
ard
A simulation movie
Berkeley
Seismology as a tool for probing the internalstructure of the Earth
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Tkalčić, Romanowicz and Houy 2002
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Li and Romanowicz 1996
Lithospheric structure under Australia
Global shear velocity structure
Compressional velocity
structure in the lowermost mantle
Some examples of seismic
tomography
van der Hilst, Kennett and Shibutani 1998
The beginnings
An artist’s conception of the Chinese scholar Chang Heng contemplating his seismoscope. Balls were held in the dragons’ mouth by lever devices connected to an internal pendulum. The direction of the first main impulse of the ground shaking was reputed to be detected by the particular ball that was released.
Early seismographs and advances in seismology
Emil Wiechert (1861-1928) The 1200 kg Wiechert seismograph for measuring horizontal displacements
• John Milne - constructed the first reliable seismograph in 1892
• F. Reid - elastic rebound model in 1906 after the Great San Francisco Earthquake and fire Earthquakes happen on preexisting faults
• A notion that the core is needed to explain seismic travel time proposed by R, Oldham in 1906
Probing the Earth with seismology: European discoverers of seismic discontinuities
Andrija Mohorovičić (1857-1936)
Crust-Mantle boundary 1910
Beno Gutenberg (1889-1960)
Mantle-Core boundary 1914
Inge Lehmann (1888-1993)
Inner Core 1936
Recipe for longevity: study the inner core!
The Earth’s Interior
INNER COREDiscovered by I. Lehmann
(1936)
CORE-MANTLE BOUNDARYDiscovered by B. Gutenberg
(1914)
CRUST-MANTLE BOUNDARYMohorovičić discontinuity (Moho)
(1910)
* For Comparison: Pluto discovered in 1931
Portion o seismograms recorded by the short-period vertical-componentseismograph at the Jamestown station of the University of California Berkeley network.The wave packet A is the core phase P4KP, and B isP7KP. These exotic seismic phases are multiple reflections from the lower side of the core mantle boundary.
The east-west component of ground motion at the Berkeley station recorded by the Bosch Omori seismograph on March 10, 1922, from an earthquake source near Parkfield, California.The recording is part of the basis of the "Parkfield Prediction Experiment" (1988 ± 5 years). Reproduced on a wine label printed for the Centennial Symposium, May 28–30, 1987.
Berkeley Seismographic Station
•The first seismographs in the western hemisphere installed at the University of California Berkeley campus in 1887 (largely due to the interest of astronomers).
•The occurrence of the San Francisco Great Earthquake and Fire in 1906 began a new era in seismology.
APOLLO 11Astronaut Edwin E. Aldrin Jr., lunar module pilot, is photographed during the Apollo 11 extravehicular activity on the Moon. He has just deployed the Early Apollo Scientific Experiments Package (EASEP). In the foreground is the Passive Seismic Experiment Package (PSEP); beyond it is the Laser Ranging RetroReflector (LR-3); in the left background is the black and white lunar surface television camera; in the far right background is the Lunar Module. Astronaut Neil A. Armstrong, commander, took this photograph with a 70mm lunar surface camera.
APOLLO 14Astronaut Alan B. Shepard Jr., foreground, Apollo 14 commander, walks toward the Modularized Equipment Transporter (MET), out of view at right, during the first Apollo 14 extravehicular activity (EVA-1). An EVA checklist is attached to Shepard's left wrist. Astronaut Edgar D. Mitchell, lunar module pilot, is in the background working at a subpackage of the Apollo Lunar Surface Experiments Package (ALSEP). The cylindrical keg-like object directly under Mitchell's extended left hand is the Passive Seismic Experiment (PSE).
Seismographs on the Moon
When a force is applied to a material, it deforms: stress induces strain – Stress = force per unit area – Strain = change in dimension
For some materials, displacement is reversible = elastic materials
– Experiments show that displacement is: • Proportional to the force and dimension of the solid • Inversely proportional to the cross-section – One can write: ΔL ∝ FL/A – Or ΔL/L ∝ F/A – Strain is proportional to stress = Hooke’s law – Hooke’s law: good approximation for many Earth’s materials when ΔL is small
Hooke’s Law of elasticity
1660 Robert Hooke
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Stress-strain relation: Elastic domain • Stress-strain relation is linear • Hooke’s law applies
Beyond elastic domain• Initial shape not recovered when stress is removed • Plastic deformation • Eventually stress > strength of material => failure
Failure can occur within the elastic domain = brittle behavior
Strain as a function of time under stress • Elastic = no permanent strain • Plastic = permanent strain
What is the mathematical relation between stress and strain?
Stress and strain
Normal strain
The series expansion of u1:
x1
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Stress and strain
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Shear strain
For small deformations:
x1
x2
and since u2(A)=0:
Similarly, for AD segment:
The series expansion of u2:
Shear tensor
Dilatation
For products of u, v, w ≈ 0
Stress and strainStress
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ij
Normal to the surface upon which the stress acts
Direction of the stress component
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Stress tensor:
Internal traction (stress):
The stress field is the distribution of internal "tractions" that balance a given set of external tractions and body forces.
xx = 11, xy= 12 etc. using the notation we used for
strain
A cubic element in static equilibrium
For a medium to be in stable equilibrium, the moments must sum to zero. Moments are given by the product of a force times the perpendicular distance from the force to a reference point. Let’s consider a moment around x3 axis first:
As x1, x2 -> 0, we have 12= 21
Similarly, for the moments around x1 and x2 axes, 13= 31 and 23= 32.Thus, stress tensor is also symmetric, with 6 independent elements.
The most general form of Hooke’s law
The constants of proportionality, Cijkl are elastic moduli. We saw that the both strain and stress tensors are second-order tensors, which are symmetric and have 6 independent elements. C ijkl is thus a third-order tensor and in its most general form consists of 81 elements. However, since the strain and stress tensors only have 6 independent elements, the number of independent elements in Cijkl can be reduced to 36.The first stress element is related to the strain elements by:
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ij =Cijklεkl
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ij =C1111ε11 +C1112ε12 +C1113ε13 +C1121ε21 +C1122ε22 +C1123ε23 +C1131ε31 +C1132ε32 +C1133ε33
For an isotropic medium (material properties independent on direction or orientation of sample), the number of elastic moduli can conveniently be reduced to only 2. These elastic moduli are called the Lamé constants and .
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ij = λθδij + 2με ij
where ij is Krönecker delta function (ij=0 when ij and ij=1 when i=j). This was formulated by Navier in 1821 and Cauchy in 1823.
Definitions of elastic moduli - from Lay and Wallace book