Please use this identifier to cite or link to this item: http://hdl.handle.net/10603/26693
Title: On the laminar similarity boundary layer equations
Researcher: Chandarki, Imran Mushtaque Ahmad
Guide(s): Singh, Brijbhan
Keywords: Laminar Flow
Turbulent flow
MHD Flows
Boundary Layer Theory
Boundary Layer Separation
Similarity Transformations
Prandtls Boundary equations
Upload Date: 14-Oct-2014
University: Dr. Babasaheb Ambedkar Technological University
Completed Date: 07/07/2014
Abstract: The deduction of the boundary layer equations from Navier Stokes equations was one of the most important advances in fluid dynamics Using an order of magnitude analysis the well known governing Navier Stokes equations of viscous fluid flow can be greatly simplified within the boundary layer By making the boundary layer approximation, the flow is divided into an inviscid portion that is easier to be solved by a number of methods, and the boundary layer which is governed by a set of partial differential equations which are still non linear and not easily newlinesolvable except for a few precise flows newlineThe boundary layer equations are the set of non linear partial differential equations which are complicated for the close form solutions Therefore with the similarity techniques they are transformed to the set of ordinary differential equations which are still non linear The similarity technique essentially consists in converting the partial differential equations to ordinary differential equations newlineThe reduction of the system to a set of ordinary differential equations is achieved by way of transforming the dependent and independent variables to suitable non dimensional dependent and independent variables called the similarity variables with the aid of a transformation known as similarity transformation The conditions imposed on the coefficients of all terms in the equations obtained after the application of the transformation, in order to obtain ordinary differential equations are similarity conditions or the similarity requirements newline
Pagination: 278p.
URI: http://hdl.handle.net/10603/26693
Appears in Departments:Department of Mathematics

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02_declaration.pdf103.24 kBAdobe PDFView/Open
03_certificate.pdf112.01 kBAdobe PDFView/Open
04_certificate1.pdf76.63 kBAdobe PDFView/Open
05_abstract.pdf37.59 kBAdobe PDFView/Open
06_contents.pdf32.73 kBAdobe PDFView/Open
07_list of figures.pdf28.63 kBAdobe PDFView/Open
08_list of tables.pdf22.7 kBAdobe PDFView/Open
09_nomenclature.pdf38.41 kBAdobe PDFView/Open
10_acknowledgement.pdf23.21 kBAdobe PDFView/Open
11_chapter 1.pdf424.52 kBAdobe PDFView/Open
12_chapter 2.pdf110.12 kBAdobe PDFView/Open
13_chapter 3.pdf95.77 kBAdobe PDFView/Open
14_chapter 4.pdf201.54 kBAdobe PDFView/Open
15_chapter 5.pdf290.12 kBAdobe PDFView/Open
16_chapter 6.pdf201.36 kBAdobe PDFView/Open
17_chapter 7.pdf152.81 kBAdobe PDFView/Open
18_chapter 8.pdf279.86 kBAdobe PDFView/Open
19_chapter 9.pdf212.75 kBAdobe PDFView/Open
20_concluding remarks.pdf27.92 kBAdobe PDFView/Open
21_future scope.pdf20.04 kBAdobe PDFView/Open
22_references.pdf74.59 kBAdobe PDFView/Open
23_publications.pdf30.87 kBAdobe PDFView/Open


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