Author
Prasanta Kumar Banerjee
Bio: Prasanta Kumar Banerjee is an academic researcher. The author has contributed to research in topics: Boundary element method. The author has an hindex of 1, co-authored 1 publications receiving 1220 citations.
Topics: Boundary element method
Papers
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TL;DR: Techniques by which MFS-type methods are extended to certain classes of non-trivial problems and adapted for the solution of inhomogeneous problems are outlined.
Abstract: The aim of this paper is to describe the development of the method of fundamental solutions (MFS) and related methods over the last three decades. Several applications of MFS-type methods are presented. Techniques by which such methods are extended to certain classes of non-trivial problems and adapted for the solution of inhomogeneous problems are also outlined.
958 citations
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21 Jan 2009586 citations
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University of Groningen1, PSL Research University2, École centrale de Lyon3, Delft University of Technology4, University of Padua5, Imperial College London6, Luleå University of Technology7, IMT Institute for Advanced Studies Lucca8, Technical University of Denmark9, University of Cape Town10, University of Southampton11, École Polytechnique Fédérale de Lausanne12, Aarhus University13, King's College London14, Hamburg University of Technology15, Czech Technical University in Prague16, Instituto Politécnico Nacional17, Polish Academy of Sciences18, University of Turin19, University of Trento20, Queen Mary University of London21, Saarland University22
TL;DR: This review summarizes recent advances in the area of tribology based on the outcome of a Lorentz Center workshop surveying various physical, chemical and mechanical phenomena across scales, and proposes some research directions.
347 citations
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TL;DR: In this article, a general numerical method is presented to compute the electric potential for a macromolecule of arbitrary shape in a solvent with nonzero ionic strength, based on a continuum description of the dielectric and screening properties of the system, which consists of a bounded internal region with discrete charges and an infinite external region.
326 citations