The inverse problem in Seismology. Seismic moment and energy of earthquakes. Seismic hyperbola
| Autor: | Apostol, Bogdan Felix |
|---|---|
| Rok vydání: | 2018 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | The inverse problem in Seismology is tackled in this paper under three particular circumstances. First, the inverse problem is defined as the determination of the seismic-moment tensor from the far-field seismic waves (P and S waves). We use the analytical expression of the seismic waves in a homogeneous isotropic body with a seismic-moment source of tensorial forces, the source being localized both in space and time. The far-field waves provide three equations for the sixth unknown parameters of the general tensor of the seismic moment. Second, the Kostrov vectorial (dyadic) representation of the seismic moment is used. Third, the fourth missing equation is derived from the energy conservation and the covariance condition. The four equations derived here are solved, and the seismic moment is determined, thus solving the inverse problem in the conditions described above. It is shown that a useful picture of the seismic moment is the conic represented by the associated quadratic form, which is a hyperbola (seismic hyperbola). Also, it is shown that the far-field seismic waves allow an estimation of the volume of the focal region, focal strain, duration of the earthquake and earthquake energy; the later quantity is a direct measure of the magnitude of the seismic moment. The special case of an isotropic seismic moment is presented. Comment: 15 pages, 3 Figures |
| Databáze: | arXiv |
| Externí odkaz: |
|