July 5, 2025 Thesis Open Access

BY LEMESSA REGASSA TOLERA

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{
  "description": "<p>ADVISOR: BOKA KUMSA (PhD)</p>\n\n<p>In this thesis, we presented an analytical approximate solution to the Korteweg&ndash;de Vries<br>\n(KdV) equation, which has significant applications in various fields such as fluid dynamics,<br>\nplasma physics, and nonlinear optics. The kdv equation is solved using Adomian<br>\nDecomposition Method (ADM). The main focus of this study is to explore the analytical<br>\napproximation of the kdv equation using ADM, which provides rapidly converging series<br>\nsolutions. The accuracy of this method is demonstrated, and it is shown to be robust for a<br>\nvariety of boundary and initial conditions. The results suggest that ADM can serve as an<br>\nalternative to more complex numerical methods, particularly in cases where exact solutions<br>\nare unavailable or difficult to obtain. Furthermore, this thesis refines the ADM is efficient,<br>\nconvenient, and applicable to a wide range of problems, offering an effective approach for<br>\napproximating the solution of the kdv equation.<br>\nKeywords: Systems of nonlinear partial differential equations, Adomian decomposition<br>\nmethod, Modified decomposition method and Korteweg de Vries equation (KdV) equation</p>", 
  "license": "http://www.opensource.org/licenses/opengroup.php", 
  "creator": [
    {
      "@type": "Person", 
      "name": "BY LEMESSA REGASSA TOLERA"
    }
  ], 
  "headline": "ANALYTICAL APPROXIMATE SOLUTION OF KORTEWEG-DE VRIES (KDV) EQUESTION BY ADOMIAN DECOMPOSITION METHOD", 
  "image": "https://zenodo.org/static/img/logos/zenodo-gradient-round.svg", 
  "datePublished": "2025-07-05", 
  "url": "https://nadre.ethernet.edu.et/record/14175", 
  "@context": "https://schema.org/", 
  "identifier": "https://doi.org/10.20372/nadre:14175", 
  "@id": "https://doi.org/10.20372/nadre:14175", 
  "@type": "ScholarlyArticle", 
  "name": "ANALYTICAL APPROXIMATE SOLUTION OF KORTEWEG-DE VRIES (KDV) EQUESTION BY ADOMIAN DECOMPOSITION METHOD"
}