| /libCEED/tests/output/ |
| H A D | t300-basis.out | 1 CeedBasis in a H^1 space on a line element
18 CeedBasis in a H^1 space on a line element
35 CeedBasis in a H^1 space on a line element
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| H A D | t300-basis-f.out | 1 CeedBasis in a H^1 space on a line element
18 CeedBasis in a H^1 space on a line element
35 CeedBasis in a H^1 space on a line element
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| H A D | t320-basis.out | 1 CeedBasis in a H^1 space on a triangle element
22 CeedBasis in a H^1 space on a triangle element
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| H A D | t320-basis-f.out | 1 CeedBasis in a H^1 space on a triangle element
22 CeedBasis in a H^1 space on a triangle element
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| H A D | t330-basis.out | 1 CeedBasis in a H(div) space on a quadrilateral element
37 CeedBasis in a H(div) space on a quadrilateral element
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| H A D | t340-basis.out | 1 CeedBasis in a H(curl) space on a triangle element
22 CeedBasis in a H(curl) space on a triangle element
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| /libCEED/python/tests/output/ |
| H A D | test_300.out | 1 CeedBasis in a H^1 space on a line element
19 CeedBasis in a H^1 space on a line element
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| /libCEED/julia/LibCEED.jl/test/output/Float32/ |
| H A D | b1.out | 1 CeedBasis in a H^1 space on a hexahedron element
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| H A D | b3.out | 1 CeedBasis in a H^1 space on a line element
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| H A D | b2.out | 1 CeedBasis in a H^1 space on a quadrilateral element
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| /libCEED/julia/LibCEED.jl/test/output/Float64/ |
| H A D | b1.out | 1 CeedBasis in a H^1 space on a hexahedron element
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| H A D | b3.out | 1 CeedBasis in a H^1 space on a line element
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| H A D | b2.out | 1 CeedBasis in a H^1 space on a quadrilateral element
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| /libCEED/doc/sphinx/source/api/ |
| H A D | CeedQFunction.rst | 8 Resolution/space-independent weak forms and quadrature-based operations
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| /libCEED/examples/ |
| H A D | bps.md | 14 …fined via the $L^2$ projection problem, posed as a weak form on a Hilbert space $V^p \subset H^1$,…
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| /libCEED/examples/deal.II/ |
| H A D | bps-ceed.h | 357 import_array(const VectorType &vec, const CeedMemType space) in import_array() argument
359 mem_space = space; in import_array()
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| /libCEED/doc/sphinx/source/ |
| H A D | libCEEDapi.md | 23 We want to find $u$ in a suitable space $V_D$, such that
29 for all $\bm v$ in the corresponding homogeneous space $V_0$, where $\bm f_0$ and $\bm f_1$ contain…
47 …imple *reference* element (e.g. the unit square) and applying a quadrature rule in reference space.
49 …ach element*, transitions to independent *quadrature points* in reference space, performs the inte…
60 More generally, when the test and trial space differ, they get their own versions of $\bm{P}$, $\bm…
177 …ured mesh topology ($\bm{\mathcal{E}}$), the choice of the finite element space/basis ($\bm{B}$) a…
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| H A D | releasenotes.md | 94 …ning that the entire `CeedOperator` used a quadrature space that is collocated with the nodal spac…
175 …itate QFunction data re-use between operators sharing the same quadrature space, such as in a mult…
269 … of multigrid prolongation, restriction, and coarse grid operators using a common quadrature space.
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| H A D | libCEEDdev.md | 240 …There should be a exactly one space between `@param[dir]` (where `dir` is `in`, `out`, or `in,out`…
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| /libCEED/julia/LibCEED.jl/.style/ |
| H A D | ceed_style.jl | 9 # Same as DefaultStyle, but no space in between operators with precedence CSTParser.TimesOp
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| /libCEED/examples/petsc/ |
| H A D | index.md | 112 …utation of gradients of an arbitrary function $u(\overset{\circ}{\bm x})$ in the embedding space as
125 … a two-dimensional closed surface embedded in the three-dimensional Euclidean space $\mathbb{R}^3$.
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| /libCEED/examples/fluids/ |
| H A D | index.md | 89 … \,|\, \bm v(\bm x_e(\bm X)) \in P_p(\bm{I}), e=1,\ldots,N_e \}$ a mapped space of polynomials con…
161 …number that grows with the diameter of the domain and polynomial degree of the approximation space.
341 Define a function space on the parent grid as $\mathcal{V}_p^\mathrm{parent} = \{ \bm v(\bm x) \in …
342 We enforce that the order of the parent FEM space is equal to the full domain's order.
344 …unctions, which results in functions of degree higher than the parent FEM space, $\mathcal{V}_p^\m…
345 To represent these higher-order functions on the parent FEM space, we perform an $L^2$ projection.
353 The projection of a function $u$ onto the parent FEM space would look like:
358 …f the projected function, and $\psi^\mathrm{parent}_N$ the basis functions of the parent FEM space.
896 top of the domain linearly in logarithmic space.
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| /libCEED/examples/solids/ |
| H A D | index.md | 61 When inhomogeneous Dirichlet boundary conditions are present, $\mathcal V$ is an affine space that …
519 …eq-neo-hookean-incremental-stress`, and $\mathcal V_0$ is the homogeneous space corresponding to $…
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| /libCEED/doc/papers/joss/ |
| H A D | paper.md | 89 … stabilization of the problem [@Brown:2010] and the functions $u$ and $v$ live in a suitable space.
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