Open AccessDissertation
Reduced basis modeling of hierarchical flow systems
TLDR
This thesis focuses on fluid flow in pipes, bifurcations and hierarchical systems, where the flow is described by the steady Stokes equations, or the steady Navier-Stokes equations.Abstract:
In this thesis we consider the reduced basis element method for approximating the solution of parameter dependent problems described by partial differential equations. In particular we focus on fluid flow in pipes, bifurcations and hierarchical systems, where the flow is described by the steady Stokes equations, or the steady Navier-Stokes equations. The thesis consists of four papers and this introduction.The reduced basis element method is different from traditional reduced basis methods in that it combines these methods with domain decomposition. A given geometry is decomposed into building blocks with the same topology as a few reference domains, e.g. a rectangle and a reference bifurcation. Relative to each reference domain we precompute and store basis functions found on a preselected set of deformations of the respective reference domains. A reduced basis solution is then found by mapping the basis functions from their respective reference domains to corresponding domains in the domain decomposition. A local approximation of the “true” solution on one domain is found using the basis functions belonging to that specific domain, and the global approximation is found by “gluing” the local approximations together with constraints across domain interfaces. Geometries where building blocks of the same topology are reused many times are attractive candidates for the reduced basis element method. When there is only one domain in the geometry, the reduced basis element method is seen as a traditional reduced basis method where the geometry of the domain is one of the independent parameters.In the first part of the introduction we present the reduced basis method and the reduced basis element method. In the second part of the introduction we motivate the work done in the thesis, and give a summary of the papers.read more
Citations
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A Reduced Basis Method for Evolution Schemes with Parameter-Dependent Explicit Operators
TL;DR: This study addresses a certain class of time-dependent evolution schemes with explicit discretization operators that are arbitrarily parameter dependent and obtains a parametrized reduced model, which enables parameter variation with fast simulation response.
A Reduced Basis Element Method for Complex Flow Systems
TL;DR: The empirical interpolation technique is used to approximate the parameter depen- dent operators and a generalized transfinite interpolation method is presented intended to produce global C 1 mappings from the reference shapes to each corresponding block of the computational domain.
References
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Journal ArticleDOI
The Proper Orthogonal Decomposition in the Analysis of Turbulent Flows
TL;DR: The Navier-Stokes equations are well-known to be a good model for turbulence as discussed by the authors, and the results of well over a century of increasingly sophisticated experiments are available at our disposal.
Journal ArticleDOI
On the existence, uniqueness and approximation of saddle-point problems arising from lagrangian multipliers
TL;DR: In this paper, the authors describe a fitting for hose end fittings that is suitable for use in conjunction with a cross-linked polyethylene hose or pipe, where a body incorporating a nipple adapted for insertion in a pipe end and a clamping ring normally retained on the body and adapted for clamping action about the outer surface of said pipe end is described.
Book
Vectors, Tensors and the Basic Equations of Fluid Mechanics
TL;DR: Vectors, tensors and the basic equations of fluid mechanics as discussed by the authors, Vectors and tensors, and the Basic Equations of Fluid Mechanics, and their basic equations.