Use of Finite Point Method for Wave Propagation in Nonhomogeneous Unbounded Domains
| Autor: | Murude Celikag, Z. Nalbantoglu, S. Moazam |
|---|---|
| Jazyk: | angličtina |
| Rok vydání: | 2015 |
| Předmět: |
Trace (linear algebra)
Article Subject Wave propagation General Mathematics Numerical analysis lcsh:Mathematics Mathematical analysis General Engineering Boundary (topology) MATHEMATICS INTERDISCIPLINARY APPLICATIONS ENGINEERING MULTIDISCIPLINARY Algorithms Mathematical research lcsh:QA1-939 Domain (software engineering) Methods Usage QA1-939 Homogeneous Finite point method lcsh:TA1-2040 MECHANICS ELEMENT-METHOD Harmonic Fixed point theory Wave propagation Analysis lcsh:Engineering (General). Civil engineering (General) Mathematics |
| Zdroj: | Mathematical Problems in Engineering, Vol 2015 (2015) |
| ISSN: | 1563-5147 |
| Popis: | Wave propagation in an unbounded domain surrounding the stimulation resource is one of the important issues for engineers. Past literature is mainly concentrated on the modelling and estimation of the wave propagation in partially layered, homogeneous, and unbounded domains with harmonic properties. In this study, a new approach based on the Finite Point Method (FPM) has been introduced to analyze and solve the problems of wave propagation in any nonhomogeneous unbounded domain. The proposed method has the ability to use the domain properties by coordinate as an input. Therefore, there is no restriction in the form of the domain properties, such as being periodical as in the case of existing similar numerical methods. The proposed method can model the boundary points between phases with trace of errors and the results of this method satisfy both conditions of decay and radiation. The file in this item is the publisher version (published version) of the article. |
| Databáze: | OpenAIRE |
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