Using full wave seismic modeling to test 4D repeatability for Libra pre-salt field

Two ideal lithologic sections representing a tidal bar system and a fluvial complex were drawn in order to run seismic modeling programs developed by OGS on behalf of the European Community. The simulations allowed an accurate analysis of the seismic expressions of the two sections. The tidal bar system is formed by a number of sandstone lenses interlayered with siltstone and mudstone deposits. These lenses meet together on an erosion surface, while they thin and vanish in the other direction. The fluvial complex is fonned by a limestone basement overlain by coarse alluvial plain sediments which in turn are transgressed by finer flood plain sediments, including sandstone lenses stacking towards the top in a meandering belt. These lithofacies associations represent potential multi-pool reservoirs in which the mudstone layers constitute the plugs. As a function of the granulometric and depositional features of each lithological unit, together with fluid content, wave velocities and densities were evaluated. A 2D modeling for elastic plane wave propagation in these hypothesized geologic sections was run on a Cray supercomputer. The numerical scheme is based on solving the full wave equation by pseudospectral methods.

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3-D SEISMIC MODELING AND DEPTH MIGRATION COMBINING THE EXTRAPOLATION OF UPGOING AND DOWNGOING WAVEFIELDS

Brazilian Journal of Geophysics ◽

10.22564/rbgf.v32i3.505 ◽

2014 ◽

Vol 32 (3) ◽

pp. 497

Author(s):

Gary Corey Aldunate ◽

Reynam C. Pestana

Keyword(s):

Wave Equation ◽

Finite Difference ◽

Wave Equations ◽

Computational Cost ◽

Difference Schemes ◽

Finite Difference Schemes ◽

Seismic Modeling ◽

Depth Level ◽

Full Wave ◽

And Migration

ABSTRACT. The 3-D acoustic wave equation is generally solved using finite difference schemes on the mesh which defines the velocity model. However, whennumerical solution of the wave equation is done by finite difference schemes, attention should be taken with respect to dispersion and numerical stability. To overcomethese problems, one alternative is to solve the wave equation in the Fourier domain. This approach is stabler and makes possible to separate the full wave equation inits unidirectional equations. Thus, the full wave equation is decoupled in two first order differential equations, namely two equations related to the vertical component:upgoing (-Z) and downgoing (+Z) unidirectional equations. Among the solution methods, we can highlight the Split-Step-Plus-Interpolation (SS-PSPI). This methodhas been proven to be quite adequate for migration problems in 3-D media, providing satisfactory results at low computational cost. In this work, 3-D seismic modelingis implemented using Huygens’ principle and an equivalent simulation of the full wave equation solution is obtained by properly applying the solutions of the twouncoupled equations. In this procedure, a point source wavefield located at the surface is extrapolated downward recursively until the last depth level in the velocityfield is reached. A second extrapolation is done in order to extrapolate the wavefield upwards, from the last depth level to the surface level, and at each depth level thepreviously stored wavefield (saved during the downgoing step) is convolved with a reflectivity model in order to simulate secondary sources. To perform depth pre-stackmigration of 3-D datasets, the decoupled wave equations were used and the same process described for seismic modeling is applied for the propagation of sources andreceivers wavefields. Thus, depth migrated images are obtained using appropriate image conditions: the upgoing and downgoing wavefields of sources and receiversare correlated and the migrated images are formed. The seismic modeling and migration methods using upgoing and downgoing wavefields were tested on simple 3-Dmodels. Tests showed that the addition of upgoing wavefield in seismic migration, provide better result and highlight steep deep reflectors which do not appear in theresults using only downgoing wavefields.Keywords: 3-D seismic modeling and migration, Upoing and downgoing wavefields, Split-Step Phase Shift Plus Interpolation method, Decoupled wave equations,One-Way equations.RESUMO. A equação da onda acústica tridimensional é normalmente resolvida usando-se esquemas de diferenças finitas sobre a malha que define o modelo develocidade. Entretanto, deve-se ter cuidado com a dispersão e a estabilidade numérica durante o processo de propagação da onda na malha. Uma outra alternativa, bastante eficiente de se resolver a equação completa da onda, é desacoplando-a em duas equações de onda unidirecionais no domínio transformado de Fourier (solução pseudo-espectral). Assim, a equação completa da onda é separada em duas equações diferenciais de primeira ordem relativa á componente vertical: equação da ondaascendente (-Z) e da onda descendente (+Z). Normalmente, a equação unidirecional é resolvida com diferentes ordens de aproximação. Entre esses métodos, podemos destacar o método “Split-Step-Plus-Interpolation” (SS-PSPI), que tem sido bastante adequado para problemas de migração em meios 3-D, fornecendo resultados aum baixo custo computacional. Neste trabalho, o modelamento sísmico 3-D foi implementado usando-se o princípio de Huygens com as duas equações de onda unidirecionais desacopladas. Com o objetivo de simular uma solução equivalente à solução da equação completa, uma fonte pontual localizada na superfície é extrapoladaem profundidade, de forma recursiva, até atingir o último nível de profundidade na malha do modelo de velocidades. Uma segunda extrapolação é realizada para extrapolar para cima o campo de onda, desde o último nível em profundidade até à superfície do modelo. Assim, os receptores localizados na superfície registram ocampo de onda ascendente, que trazem informações dos refletores em subsuperfície na forma de reflexões e difrações. Para realizar a migração pré-empilhamento em profundidade de dados 3-D, usando-se as equações de onda desacopladas, o mesmo procedimento descrito para o modelamento sísmico é utilizado para a propagação dos campos de onda de fontes e receptores. Imagens migradas são obtidas usando-se condições de imagem apropriadas, onde os campos de onda da fonte e dos receptores, descendente e ascendente, são correlacionados. Sobre modelos 3-D simples foram testados os métodos de modelamento e migração, levando em conta oscampos de onda ascendente e descendente. Ficando, assim, evidenciado que no método de migração sísmica, proposto aqui, a adição do campo de onda ascendente fornece um melhor resultado, ressaltando os refletores íngremes que não aparecem nos resultados utilizando-se apenas a extrapolação do campo de onda descendente.Palavras-chave: Migração e modelagem sísmica 3-D, Migração em duas etapas mais interpolação, equações de ondas unidirecionais.

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Application of Full-Wave Seismic Modeling at Engineering Researches

10.3997/2214-4609.202152139 ◽

2021 ◽

Author(s):

V.V. Mershchii ◽

A.S. Kostyukewich ◽

V.I. Ignatiev ◽

M.V. Aleshkin

Keyword(s):

Seismic Modeling ◽

Full Wave

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Analysis of Near-field Measurement Sensors Using Full-Wave Numerical Simulator

2018 International Applied Computational Electromagnetics Society Symposium - China (ACES) ◽

10.23919/acess.2018.8669102 ◽

2018 ◽

Author(s):

Hongxing Zheng ◽

Yong-qiang Sun ◽

Lu Wang

Keyword(s):

Field Measurement ◽

Near Field ◽

Full Wave ◽

Numerical Simulator ◽

Near Field Measurement

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Analysis of AC-DC Converter Circuit Performance with Difference Piezoelectric Transducer Array Connection

International Journal of Integrated Engineering ◽

10.30880/ijie.2020.12.07.003 ◽

2020 ◽

Vol 12 (7) ◽

Author(s):

Nik Ahmad Zainal Abidin ◽

◽

Norkharziana Mohd Nayan ◽

Azuwa Ali ◽

N. A. Azli ◽

...

Keyword(s):

Piezoelectric Transducer ◽

Simulation Analysis ◽

Piezoelectric Sensor ◽

Transducer Array ◽

Circuit Performance ◽

Array Configuration ◽

Full Wave ◽

Bridge Rectifier ◽

In Series ◽

Parallel Voltage

This research presents a simulation analysis for the AC-DC converter circuit with a different configurations of the array connection of the piezoelectric sensor. The selection of AC-DC converter circuits is full wave bridge rectifier (FWBR), parallel SSHI (P-SSHI) and parallel voltage multiplier (PVM) with array configuration variation in series (S), parallel (P), series-parallel (SP) and parallel-series (PS). The system optimizes with different load configurations ranging from 10 kΩ to 1 MΩ. The best configuration of AC-DC converter with an appropriate array piezoelectric connection producing the optimum output of harvested power is presented. According to the simulation results, the harvested power produced by using P-SSHI converter connected with 3 parallel piezoelectric transducer array was 85.9% higher than for PVM and 15.88% higher than FWBR.

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