Local Rectangular Refinement in Three Dimensions (LRR3D): Development of a Solution-Adaptive Gridding Technique with Application to Convection-Diffusion Problems

Bennett, Beth Anne V.

doi:10.1080/10407790601177813

Cited by 5 publications

(7 citation statements)

References 45 publications

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“…An alternative strategy for adaptive mesh refinement relies on equidistribution of solution error based on local estimates of the gradient and curvature of the solution [88,89,23,[27][28][29][30][31]. Although not implemented herein, this methodology has been applied to steady [24,90,91,25,26,88,89,23,[27][28][29][30][31] and unsteady [46,28] combustion simulations. Note however, in most applications involving nonlinear partial-differential equations, selecting the error indicators is not straightforward and sometimes, the error indicators lack theoretical justifications, as noted in [92].…”

Section: Refinement Criteriamentioning

confidence: 99%

“…Computational grids are automatically adapted to the solution of the governing equations and this can be very effective in treating problems with multiple scales, providing the required spatial resolution while minimizing memory and storage requirements. AMR approaches have since been developed for a wide variety of engineering problems [7][8][9][10][11][12][13][14][15][16][17][18][19][20][21][22][23] and combustion simulations [24][25][26][27][28][29][30][31][32][33][34][35][36][37][38][39]. Large massively-parallel distributed-memory computers provide another approach by enabling a many fold increase in processing power and memory resources beyond those of conventional single-processor computers.…”

Section: Introductionmentioning

confidence: 99%

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A parallel solution – adaptive method for three-dimensional turbulent non-premixed combusting flows

Gao

Groth

2010

Journal of Computational Physics

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Section: Refinement Criteriamentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

A parallel solution – adaptive method for three-dimensional turbulent non-premixed combusting flows

Gao

Groth

2010

Journal of Computational Physics

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“…When the metric is the identity matrix, one finds the Euclidean notion of distance. A Riemannian metric allows the local properties of an element to be described through its decomposition shown in Equation (18). The lengths of the elements in each direction are obtained through the eigenvalues such that:…”

Section: The Riemannian Metricmentioning

confidence: 99%

“…Currently, the preferred approach in the simulation of reacting flow seems to be mesh refinement through local element subdivision, see [6,[16][17][18][19][20][21][22][23]. All of these methods use isotropic refinement and coarsening operations on quadrilateral meshes in 2D and hexahedral meshes in 3D.…”

Section: Introductionmentioning

confidence: 99%

Hybrid mesh adaptation applied to industrial numerical combustion

Sirois

McKenty²,

Gravel³

et al. 2011

Numerical Methods in Fluids

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SUMMARY This paper presents an anisotropic mesh adaptation method applied to industrial combustion problems. The method is based on a measure of the distance between two Riemannian metrics called metric non‐conformity. This measure, which can be used to build a cost function to adapt meshes comprising several types of mesh elements, provides the basis for a generic mesh adaptation approach applicable to various types of physical problems governed by partial differential equations. The approach is shown to be applicable to industrial combustion problems, through the specification of a target metric computed as the intersection of several Hessian matrices reconstructed from the main variables of the governing equations. Numerical results show that the approach is cost effective in that it can drastically improve the prediction of temperature and species distributions in the flame region of a combustor while reducing computational cost. The results can be used as a basis for pollutant prediction models. Copyright © 2011 John Wiley & Sons, Ltd.

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“…Specifically, since the Poisson approach does not involve any integrodifferential or hyperbolic equations in its set of governing equations, its computational cost is moderate, and its BCs are straightforward to implement. In addition, the Poisson approach does not require the employment of staggered grids, so it can effectively alleviate difficulties associated with complex geometries, non-orthogonal curvilinear coordinates, and the employment of advanced numerical techniques such as adaptive grid refinement [28][29][30][31] or multigrid methods [32]. Being able to maintain the second-order ellipticity, and thus advantageous convergence properties, is another merit of the Poisson approach because, when solved by a fully implicit solver, the second-order elliptic nature of the governing equations will enable an implicit solution to be achieved within a comparatively short CPU time [33,34].…”

Section: Introductionmentioning

confidence: 99%

MC-Smooth: A mass-conserving, smooth vorticity–velocity formulation for multi-dimensional flows

Cao

Bennett

Smooke

2015

Combustion Theory and Modelling

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A novel vorticity-velocity formulation of the Navier-Stokes equations -the MassConserving, Smooth (MC-Smooth) vorticity-velocity formulation -is developed in this work. The governing equations of the MC-Smooth formulation include a new secondorder Poisson-like elliptic velocity equation, along with the vorticity transport equation, the energy conservation equation, and N spec species mass balance equations. In this study, the MC-Smooth formulation is compared to two pre-existing vorticity-velocity formulations by applying each formulation to confined and unconfined axisymmetric laminar diffusion flame problems. For both applications, very good to excellent agreement for the simulation results of the three formulations has been obtained. The MC-Smooth formulation requires the least CPU time and can overcome the limitations of the other two pre-existing vorticity-velocity formulations by ensuring mass conservation and solution smoothness over a broader range of flow conditions. In addition to these benefits, other important features of the MC-Smooth formulation include: (1) it does not require the use of a staggered grid, and (2) it does not require excessive grid refinement to ensure mass conservation. The MC-Smooth formulation is a computationally attractive approach that can effectively extend the applicability of the vorticity-velocity formulation.

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Local Rectangular Refinement in Three Dimensions (LRR3D): Development of a Solution-Adaptive Gridding Technique with Application to Convection-Diffusion Problems

Cited by 5 publications

References 45 publications

A parallel solution – adaptive method for three-dimensional turbulent non-premixed combusting flows

A parallel solution – adaptive method for three-dimensional turbulent non-premixed combusting flows

Hybrid mesh adaptation applied to industrial numerical combustion

MC-Smooth: A mass-conserving, smooth vorticity–velocity formulation for multi-dimensional flows

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