Mathematics in Computational Science and Engineering. Группа авторов

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Mathematics in Computational Science and Engineering - Группа авторов


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for resistivity monitoring, geoenvironmental resistivity problems, geo-engineering resistivity problems, linearization of nonlinear resistivity problems

      The keywords ill-posed inverse problems have been reported in the scientific literatures since the beginning of the 20th century. In physics, it is reported as an inverse problems of quantum scattering theory. In geophysics, it is reported as an “ill-posed inverse problem” of electrical resistivity mapping, seismic mapping, and gravitational-potential field mapping. It has also appeared in astrophysics and other areas of science and engineering. With recent advances in mathematical computing and powerful computers over the past decades, application of inverse and ill-posed problems, its theories and the associated mathematical methods has been extended to almost every field of science and engineering. In forward numerical modelling of physical sciences, researchers attempt to formulate appropriate functions. These functions are used to describe different physical processes involving propagation of seismic waves, sound waves, electromagnetic waves, and heat waves, etc.

      Continuous mathematical models are often discretized to obtain numerical solutions. These solutions may be continuous with respect to the initial parameters. Furthermore, when these problems are solved with a finite precision, it may suffer from a numerical instability. Even though these problems are well-posed, they may be ill-conditioned. Here, the meaning of ill-conditioned refers to a small error in the initial data resulting in a larger error in the solution. In mathematical literature, an ill-conditioned problem is defined by a large condition number, which is a measure of sensitivity of the model. This gives indication quantitatively how much error is in the output from an error in the input. A physical model is called well-conditioned if it has a low condition number. If the condition number is high, it is called ill-conditioned.

      An inverse problem in the field of science and engineering is a process of calculating physical model parameters from a set of real or synthetic observations (in other words, computing the input parameters from the output data/results). Examples are computing images in X-ray computed tomography, source reconstruction, calculating density distributions of the Earth material from the measured gravity potential field, etc. It is known as an inverse problem because it starts with the results of the physical model and computes the physical model parameters (called input to the model). In other words, this can be viewed as the inverse of a forward problem, which starts with the causes and then calculates the effects.

      Linear or non-linear Inverse problems are very important mathematical problems in the field of science and engineering. This is due to the fact that these problems give us information about the parameters that cannot be accessed or observed directly. These problems have a wide range of applications in system identification in the field of science and engineering including natural language processing, machine learning, nondestructive testing, and many other domains. This paper is focused on in-depth analysis of ill-posed inverse problems that are usually common in electrical geophysics.

      According to the literature review in the field of electrical geophysics, interpretation of electrical resistivity data using electrical resistivity inverse methods are commonly done for layered models and geological structures (e.g., groundwater exploration and mapping & monitoring of groundwater). However, in the field of mineral exploration, geothermal exploration, mapping and monitoring of in-situ processes, the layered geologic models are inadequate. With the advent of large computers, two-dimensional (2-D) numerical electrical modelling techniques for surface-to-surface electrode and other electrode configurations are used extensively to interpret electrical data. Integral equation method has a limitation because it allows inhomogeneties only inside the homogeneous sounding host media. Three-dimensional (3-D) numerical modelling methods using finite difference and finite element methods are reported in the geophysical literature. These methods are useful to compute electrical model response over a given 3-D geologic structure. A complete overview about the forward and inverse modelling in electrical geophysics may be found in Narayan [3].

      Electrical impedance tomography (EIT) methods are also known as electrical resistivity imaging methods – another version of resistivity inversion. These methods have proven to work nicely in most of the geophysical settings. EIT methods/imaging methods have been gaining momentum rapidly in recent years. This is due to the fact that they are easy to use and they are non-invasive testing tools. EIT methods or electrical resistivity methods are based on a low-frequency electrical current or DC current (unidirectional flow of electric charge) to probe a medium of the system,


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