Japan Geoscience Union Meeting 2019

Presentation information

[J] Poster

S (Solid Earth Sciences ) » S-SS Seismology

[S-SS14] Fault Rheology and Earthquake Physics

Wed. May 29, 2019 3:30 PM - 5:00 PM Poster Hall (International Exhibition Hall8, Makuhari Messe)

convener:Keishi Okazaki(Japan Agency for Marine-Earth Science and Technology), Hideki Mukoyoshi(Department of Geoscience Interdisciplinary Graduate School of Science and Engineering, Shimane University), Hiroyuki Noda(Kyoto University, Disaster Prevention Research Institute), Keisuke Yoshida(Tohoku University)

[SSS14-P19] Representation Theorem and Green's Function (3) -- Strain, Stress, and Density Perturbation Fields due to a Point Source Using 2nd Derivative of Green's Function in an Unbounded Homogeneous Isotropic Elastic Medium --

*Masaya Kimura1, Nobuki Kame1 (1.Earthquake Research Institute,The University of Tokyo)

Keywords:Green's Function

Here we derive the second spatial derivative of Green's fuction in an unbounded homogeneous isotropic elastic medium. Following this formula, we obtain the expressions for strain, stress, and density perturbation fields due to a point source described by a moment tensor or a single force. These fomulae are useful for theoretical modeling of the prompt detection of earthquake occurrences by means of piezoelectricity, piezomagneticity, and transient gravity perturbations. We propose two applications of the formulae: (1) volumetric moment tensor mass redistribution and (2) dynamically induced quadratic earthquake mass redistribution. Regarding the latter application, we show the relationship between the moment magnitude Mw of an earthquake and dynamically induced quadratic earthquake mass redistribution (Table 1).

Table 1. The relationship between Mw of an earthquake and dynamically induced quadratic earthquake mass redistribution.

Reference: M. Kimura and N. Kame, 2018, Representation Theorem and Green's Function (3) -- Strain, Stress, and Density Perturbation Fields due to a Point Source Using 2nd Derivative of Green's Function in an Unbounded Homogeneous Isotropic Elastic Medium --, Zisin 2, 71, 153-160, doi:10.4294/zisin.2017-20