Mimetic Spectral Element Method for Anisotropic Diffusion

Abstract: This paper addresses the topological structure of steady, anisotropic, inhomogeneous diffusion problems. Two discrete formulations: a) mixed and b) direct formulations are discussed. Differential operators are represented by sparse incidence matrices, while weighted mass matrices play the role of metric-dependent Hodge matrices. The resulting mixed formulations are point-wise divergence-free if the right hand side function f = 0. The method is inf-sup stable and displays optimal convergence on orthogonal and n… Show more

“…The same problem was earlier addressed in [6], but for a method with continuous elements and primal basis functions only. For the configuration K = 3 × 3, N = 6, we compare the sparsity structure of the two approaches in Fig.…”

“…3. On the left we see the hybrid formulation, and on the right we see the continuous elements formulation [6]. The number of non zero entries are almost half in the hybrid formulation, 66,384, as compared to the continuous element formulation, 117,504.…”

“…It is an incidence matrix that is metric-free and topological, and remains the same for each element in K . For an extensive discussion on the incidence matrix, see for instance [6]. For an element of degree N = 3,…”

“…E N is the assembled N for all elements. For, K = 2 × 2, N = 2, E N is shown in (6). The matrix size of E N is 8 × 64, but it has only 16 non-zero entities.…”

A Conservative Hybrid Method for Darcy Flow

“…The same problem was earlier addressed in [6], but for a method with continuous elements and primal basis functions only. For the configuration K = 3 × 3, N = 6, we compare the sparsity structure of the two approaches in Fig.…”

“…3. On the left we see the hybrid formulation, and on the right we see the continuous elements formulation [6]. The number of non zero entries are almost half in the hybrid formulation, 66,384, as compared to the continuous element formulation, 117,504.…”

“…It is an incidence matrix that is metric-free and topological, and remains the same for each element in K . For an extensive discussion on the incidence matrix, see for instance [6]. For an element of degree N = 3,…”

“…E N is the assembled N for all elements. For, K = 2 × 2, N = 2, E N is shown in (6). The matrix size of E N is 8 × 64, but it has only 16 non-zero entities.…”

A Conservative Hybrid Method for Darcy Flow

“…This work extends [7,9], where similar dual Neumann-Dirichlet problems are considered, to 3-dimensional space. These primal spaces and their algebraic dual representations can be ideal for the so-called mimetic or structure-preserving discretizations [1,4,8,11,12]. Together with their trace spaces, they can be used for the hybrid finite element methods which first decompose the domains into discontinuous elements then connect them with Lagrange multipliers living in the trace spaces [2,13,14].…”

Discrete Equivalence of Adjoint Neumann–Dirichlet div-grad and grad-div Equations in Curvilinear 3D Domains

A mixed mimetic spectral element model of the 3D compressible Euler equations on the cubed sphere