Lattice Boltzmann Method with Improved Radial Basis Function Method

dc.contributor.advisorMohamad, A. A.‏
dc.contributor.authorBawazeer, Saleh
dc.contributor.committeememberKwok, D.
dc.contributor.committeememberJohansen, Craig T.
dc.date2020-02
dc.date.accessioned2019-11-19T19:10:24Z
dc.date.available2019-11-19T19:10:24Z
dc.date.issued2019-11
dc.description.abstractThe Lattice Botlzmann method is an alternative numerical method of resolving problems relating to flow and heat transfer (i.e. Navier Stokes equations). This method consists of two steps, collision as well as streaming. In turn, streaming is non-local and functions on square or cubic grids. In general, the streaming process is undertaken by shifting the distribution function to the exact adjacent node (perfect shift). It is notable that this process does not entail interpolation, which makes lends a sense of precision to the advection process. On the other hand, the prefect shift in the streaming step impacts the applicability of LBM for problems with complex geometry. In literature, several works have been proposed to resolve this issue. Conventional methods (finite volume, finite difference, and finite element methods) are employed to solve the streaming step in the lattice Boltzmann method. Unlike the perfect shift, these methods tend to suffer from a dissipation error because they utilize a lower order approximation of the derivative. This dissipation error significantly impacts the accuracy of lattice Boltzmann method, thus making it comparable or even inferior to the accuracy of the conventional method of Navier Stokes solvers. This might render lattice Boltzmann method unfeasible because it has the same accuracy as that of the conventional methods and need a greater number of variables (distribution functions) to solve for. In order to resolve the problem, the meshless method has been used in literature to enhance the accuracy of the streaming. In this regard, Shu et al. proposed a meshless lattice Boltzmann method based on the least-square formulation of the Taylor series. Although the accuracy of this approach is good, it significantly depends on the mesh structure. To overcome this problem, Musavi and Ashrafizaadeh proposed the radial basis function based on the weak formulation of the advection equation. Against this backdrop, the present work proposes the usage of radial basis function interpolation in order to improve the accuracy. In general, the accuracy of radial basis function based methods depends on the shape parameter. Two algorithms have been proposed in the present work to solve this issue. The second algorithm is superior since its accuracy is independent of any parameter, including the shape parameter. The second approach is used to solve the streaming step in the lattice Boltzmann method. The combined approach is validated using simple problems. According to the findings, the proposed approach is reliable and consistent, whereas its high accuracy can be compared to the prefect shift.en_US
dc.identifier.citationBawazeer, S. (2019). Lattice Boltzmann Method with Improved Radial Basis Function Method (Doctoral thesis, University of Calgary, Calgary, Canada). Retrieved from https://prism.ucalgary.ca.en_US
dc.identifier.doihttp://dx.doi.org/10.11575/PRISM/37256
dc.identifier.urihttp://hdl.handle.net/1880/111233
dc.publisher.facultySchulich School of Engineeringen_US
dc.publisher.institutionUniversity of Calgaryen
dc.rightsUniversity of Calgary graduate students retain copyright ownership and moral rights for their thesis. You may use this material in any way that is permitted by the Copyright Act or through licensing that has been assigned to the document. For uses that are not allowable under copyright legislation or licensing, you are required to seek permission.en_US
dc.subjectRadial Basis Functionen_US
dc.subjectLattice Boltzmann Methoden_US
dc.subjectPartition of Unityen_US
dc.subjectHermiteen_US
dc.subjectMeshlessen_US
dc.subjectRBFen_US
dc.subjectLBMen_US
dc.subjectPUMen_US
dc.subject.classificationApplied Mechanicsen_US
dc.subject.classificationEnergyen_US
dc.subject.classificationEngineering--Mechanicalen_US
dc.titleLattice Boltzmann Method with Improved Radial Basis Function Methoden_US
dc.typedoctoral thesisen_US
thesis.degree.disciplineEngineering – Mechanical & Manufacturingen_US
thesis.degree.grantorUniversity of Calgaryen_US
thesis.degree.nameDoctor of Philosophy (PhD)en_US
ucalgary.item.requestcopytrueen_US
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