| ►NDune | |
| ►NMonomImp | |
| CEvalAccess | Access output vector of evaluateFunction() and evaluate() |
| CEvaluate | |
| CEvaluate< Traits, 1 > | |
| CJacobianAccess | Access output vector of evaluateJacobian() |
| CSize | |
| CSize< 0, 0 > | |
| CSize< 0, k > | |
| CSize< d, 0 > | |
| ►CBasisInterface | Interface for global-valued shape functions |
| CTraits | Types of domain and range |
| CBasisInterfaceSwitch | Switch for uniform treatment of local and global basis classes |
| CBasisMatrix | |
| CBasisMatrix< const Dune::VirtualMonomialBasis< dim, F >, Interpolation, Field > | |
| CBasisMatrix< const MonomialBasis< Topology, F >, Interpolation, Field > | |
| CBasisMatrix< const PolynomialBasis< Eval, CM, D, R >, Interpolation, Field > | |
| CBasisMatrix< const PolynomialBasisWithMatrix< Eval, CM >, Interpolation, Field > | |
| CBasisMatrixBase | |
| CBDM1Cube2DLocalBasis | First order Brezzi-Douglas-Marini shape functions on the reference quadrilateral |
| CBDM1Cube2DLocalCoefficients | Layout map for Brezzi-Douglas-Marini-1 elements on quadrilaterals |
| CBDM1Cube2DLocalFiniteElement | First order Brezzi-Douglas-Marini shape functions on quadrilaterals |
| CBDM1Cube2DLocalInterpolation | First order Brezzi-Douglas-Marini shape functions on the reference quadrilateral |
| CBDM1Cube3DLocalBasis | First order Brezzi-Douglas-Marini shape functions on the reference hexahedron |
| CBDM1Cube3DLocalCoefficients | Layout map for Brezzi-Douglas-Marini-1 elements on hexahedra |
| CBDM1Cube3DLocalFiniteElement | First order Brezzi-Douglas-Marini shape functions on hexahedron |
| CBDM1Cube3DLocalInterpolation | First order Brezzi-Douglas-Marini shape functions on the reference hexahedron |
| CBDM1Simplex2DLocalBasis | First order Brezzi-Douglas-Marini shape functions on the reference triangle |
| CBDM1Simplex2DLocalCoefficients | Layout map for Brezzi-Douglas-Marini-1 elements on triangles |
| CBDM1Simplex2DLocalFiniteElement | First order Brezzi-Douglas-Marini shape functions on triangles |
| CBDM1Simplex2DLocalInterpolation | First order Brezzi-Douglas-Marini shape functions on the reference triangle |
| CBDM2Cube2DLocalBasis | First order Brezzi-Douglas-Marini shape functions on quadrilaterals |
| CBDM2Cube2DLocalCoefficients | Layout map for Brezzi-Douglas-Marini-2 elements on quadrilaterals |
| CBDM2Cube2DLocalFiniteElement | Second order Brezzi-Douglas-Marini shape functions on quadrilaterals |
| CBDM2Cube2DLocalInterpolation | First order Brezzi-Douglas-Marini shape functions on quadrilaterals |
| CBDM2Simplex2DLocalBasis | First order Brezzi-Douglas-Marini shape functions on quadrilaterals |
| CBDM2Simplex2DLocalCoefficients | Layout map for Brezzi-Douglas-Marini-2 elements on triangles |
| CBDM2Simplex2DLocalFiniteElement | Second order Brezzi-Douglas-Marini shape functions on triangles |
| CBDM2Simplex2DLocalInterpolation | First order Brezzi-Douglas-Marini shape functions on triangles |
| CC0LocalBasisTraits | Type traits for LocalBasisInterface |
| CC1LocalBasisTraits | Type traits for C1LocalBasisInterface |
| CCkLocalBasisTraits | |
| CCoefficientsInterface | Interface for global-valued coefficients |
| CComputeField | |
| ►CDefaultBasisFactory | |
| CEvaluationBasisFactory | |
| CDefaultBasisFactoryTraits | |
| CDerivativeAssign | |
| CDerivativeAssign< Derivatives< F1, dimD, 1, deriv, derivative >, Derivatives< F2, dimD, 1, deriv, derivative > > | |
| CDerivativeAssign< Derivatives< F1, dimD, 1, deriv, derivative >, Derivatives< F2, dimD, 1, deriv, value > > | |
| CDerivativeAssign< Derivatives< F1, dimD, 1, deriv, derivative >, FieldVector< F2, 1 > > | |
| CDerivativeAssign< Derivatives< F1, dimD, 1, deriv, derivative >, FieldVector< F2, dimR > > | |
| CDerivativeAssign< Derivatives< F1, dimD, 1, deriv, layout >, Derivatives< F2, dimD, dimR, deriv, derivative > > | |
| CDerivativeAssign< Derivatives< F1, dimD, 1, deriv, layout >, Derivatives< F2, dimD, dimR, deriv, value > > | |
| CDerivativeAssign< Derivatives< F1, dimD, 1, deriv, layout >, F2 > | |
| CDerivativeAssign< Derivatives< F1, dimD, 1, deriv, value >, Derivatives< F2, dimD, 1, deriv, derivative > > | |
| CDerivativeAssign< Derivatives< F1, dimD, 1, deriv, value >, Derivatives< F2, dimD, 1, deriv, value > > | |
| CDerivativeAssign< Derivatives< F1, dimD, 1, deriv, value >, FieldVector< F2, 1 > > | |
| CDerivativeAssign< Derivatives< F1, dimD, 1, deriv, value >, FieldVector< F2, dimR > > | |
| CDerivativeAssign< Derivatives< F1, dimD, dimR, deriv, derivative >, Derivatives< F2, dimD, dimR, deriv, value > > | |
| CDerivativeAssign< Derivatives< F1, dimD, dimR, deriv, derivative >, FieldVector< F2, dimR > > | |
| CDerivativeAssign< Derivatives< F1, dimD, dimR, deriv, layout >, Derivatives< F2, dimD, dimR, deriv, layout > > | |
| CDerivativeAssign< Derivatives< F1, dimD, dimR, deriv, value >, Derivatives< F2, dimD, dimR, deriv, derivative > > | |
| CDerivativeAssign< Derivatives< F1, dimD, dimR, deriv, value >, FieldVector< F2, dimR > > | |
| CDerivatives | |
| CDerivatives< F, dimD, dimR, 0, value > | |
| CDerivatives< F, dimD, dimR, deriv, derivative > | |
| CDerivatives< F, dimD, dimR, deriv, value > | |
| CDGLocalCoefficients | A class providing local coefficients for dg spaces |
| CDGLocalCoefficientsFactory | A factory class for the dg local coefficients |
| CDGLocalCoefficientsFactoryTraits | |
| CDGLocalFiniteElement | Takes the basis and interpolation factory from a given LocalFiniteElement (derived from GenericLocalFiniteElement) and replaces the coefficients with dg local keys, i.e., attaches all degrees of freedom to the codimension zero entity |
| CDimSpecificPQkLocalFiniteElementFactory | Factory that only creates dimension specific local finite elements |
| CDimSpecificPQkLocalFiniteElementFactory< D, R, 3, k > | Factory that only creates dimension specific local finite elements |
| CDualP1LocalBasis | Dual Lagrange shape functions on the simplex |
| CDualP1LocalCoefficients | Local coefficients for dual simplex P1 elements |
| CDualP1LocalFiniteElement | The local dual p1 finite element on simplices |
| CDualP1LocalInterpolation | |
| CDualPQ1LocalFiniteElementCache | |
| CDualQ1LocalBasis | Dual Lagrange shape functions of order 1 on the reference cube |
| CDualQ1LocalCoefficients | Layout map for dual Q1 elements |
| CDualQ1LocalFiniteElement | The local dual Q1 finite element on cubes |
| CDualQ1LocalInterpolation | |
| ►CEdgeS0_5Basis | Basis for order 0.5 (lowest order) edge elements on simplices |
| CTraits | Export type traits for function signature |
| CEdgeS0_5Coefficients | Coefficients for lowest order edge elements on simplices |
| CEdgeS0_5Common | Common base class for edge elements |
| ►CEdgeS0_5FiniteElement | FiniteElement for lowest order edge elements on simplices |
| CTraits | |
| CEdgeS0_5FiniteElementFactory | Factory for EdgeS0_5FiniteElement objects |
| CEdgeS0_5Interpolation | Interpolation for lowest order edge elements on simplices |
| CEmptyPointSet | |
| CEquidistantPointSet | |
| CFieldCast | |
| CFieldCast< F2, Dune::FieldMatrix< F1, dim1, dim2 > > | |
| CFieldCast< F2, Dune::FieldVector< F1, dim > > | |
| CFiniteElementFactoryInterface | Factory interface for global-valued finite elements |
| ►CFiniteElementInterface | Interface for global-valued finite elements |
| CTraits | Types of component objects |
| CFiniteElementInterfaceSwitch | Switch for uniform treatment of finite element with either the local or the global interface |
| CFixedOrderLocalBasisTraits | Construct LocalBasisTraits with fixed diff order |
| CGenericLocalFiniteElement | A LocalFiniteElement implementation based on three TopologyFactories providing the LocalBasis, LocalCoefficients, and LocalInterpolations. Note the key type for all three factories must coincide |
| CHierarchicalP2LocalFiniteElement | |
| CHierarchicalP2WithElementBubbleLocalFiniteElement | |
| CHierarchicalPrismP2LocalBasis | |
| CHierarchicalPrismP2LocalFiniteElement | |
| CHierarchicalPrismP2LocalInterpolation | |
| CHierarchicalSimplexP2LocalBasis | |
| CHierarchicalSimplexP2LocalBasis< D, R, 1 > | Hierarchical P2 basis in 1d |
| CHierarchicalSimplexP2LocalBasis< D, R, 2 > | Hierarchical P2 basis in 2d |
| CHierarchicalSimplexP2LocalBasis< D, R, 3 > | Hierarchical P2 basis in 3d |
| CHierarchicalSimplexP2LocalInterpolation | |
| CHierarchicalSimplexP2WithElementBubbleLocalBasis | |
| CHierarchicalSimplexP2WithElementBubbleLocalBasis< D, R, 1 > | Hierarchical P2 basis in 1d |
| CHierarchicalSimplexP2WithElementBubbleLocalBasis< D, R, 2 > | Hierarchical P2 basis in 1d |
| CHierarchicalSimplexP2WithElementBubbleLocalBasis< D, R, 3 > | Hierarchical P2 basis in 1d |
| CHierarchicalSimplexP2WithElementBubbleLocalCoefficients | The local finite element needed for the Zou-Kornhuber estimator for Signorini problems |
| CHierarchicalSimplexP2WithElementBubbleLocalInterpolation | |
| CIdentity | |
| ►CInterpolationHelper | |
| CHelper | |
| CHelper< Basis, Matrix, false > | |
| CHelper< Func, Vector, true > | |
| CInterpolationInterface | Interface for global-valued interpolation |
| CL2LocalFiniteElement | Takes the basis factory from a given LocalFiniteElement (derived from GenericLocalFiniteElement) and replaces the coefficients with dg local keys, i.e., attaches all degrees of freedom to the codimension zero entity and uses a l2 interpolation |
| CLagrangeBasisFactory | |
| CLagrangeCoefficientsFactory | |
| CLagrangeCoefficientsFactoryTraits | |
| CLagrangeInterpolationFactory | |
| CLagrangeInterpolationFactoryTraits | |
| CLagrangeLocalFiniteElement | Lagrange local finite elements for a given set of interpolation points |
| CLagrangePoint | |
| CLFEMatrix | |
| CLFETensor | |
| CLFETensor< F, 0, 0 > | |
| CLFETensor< F, 0, deriv > | |
| CLFETensor< F, dimD, 0 > | |
| CLFETensorAxpy | |
| CLFETensorAxpy< Derivatives< F1, dimD, 1, d, derivative >, Vec2, deriv > | |
| CLFETensorAxpy< Derivatives< F1, dimD, 1, d, value >, Vec2, deriv > | |
| CLFETensorAxpy< Derivatives< F1, dimD, dimR, d, derivative >, Vec2, deriv > | |
| CLFETensorAxpy< Derivatives< F1, dimD, dimR, d, value >, Vec2, deriv > | |
| CLocalBasisTraits | Type traits for LocalBasisVirtualInterface |
| CLocalBasisVirtualImp | Class for wrapping a basis using the virtual interface |
| CLocalBasisVirtualImp< LocalBasisTraits< DF, n, D, RF, m, R, J, 0 >, Imp > | Class for wrapping a basis using the virtual interface |
| CLocalBasisVirtualInterface | Virtual base class for a local basis |
| CLocalBasisVirtualInterfaceBase< LocalBasisTraits< DF, n, D, RF, m, R, J, 0 > > | Virtual base class for a local basis |
| CLocalCoefficientsContainer | |
| CLocalCoefficientsVirtualImp | Class for wrapping local coefficients using the virtual interface |
| CLocalCoefficientsVirtualInterface | Virtual base class for local coefficients |
| CLocalFiniteElementCloneFactory | |
| CLocalFiniteElementCloneFactoryHelper | |
| CLocalFiniteElementCloneFactoryHelper< Imp, true > | |
| CLocalFiniteElementFunctionBase | Return a proper base class for functions to use with LocalInterpolation |
| CLocalFiniteElementTraits | Traits helper struct |
| CLocalFiniteElementVirtualImp | Class for wrapping a finite element using the virtual interface |
| CLocalFiniteElementVirtualInterface | Virtual base class for local finite elements with functions |
| CLocalFiniteElementVirtualInterface< LocalBasisTraits< DF, n, D, RF, m, R, J, 0 > > | Virtual base class for local finite elements with functions |
| CLocalInterpolationVirtualImp | Class for wrapping a local interpolation using the virtual interface |
| CLocalInterpolationVirtualInterface | Virtual base class for a local interpolation |
| CLocalInterpolationVirtualInterfaceBase | Virtual base class for a local interpolation |
| CLocalKey | Describe position of one degree of freedom |
| CLocalL2Interpolation | A local L2 interpolation taking a test basis and a quadrature rule |
| CLocalL2Interpolation< B, Q, false > | |
| CLocalL2Interpolation< B, Q, true > | |
| CLocalL2InterpolationBase | |
| CLocalL2InterpolationFactory | A factory class for the local l2 interpolations taking a basis factory |
| CLocalL2InterpolationFactoryTraits | |
| CLocalLagrangeInterpolation | |
| CLocalToGlobalBasisAdaptorTraits | Traits class for local-to-global basis adaptors |
| CLocalToGlobalInterpolationAdaptor | Convert a local interpolation into a global interpolation |
| CLowerOrderLocalBasisTraits | Construct LocalBasisTraits with one diff order lower |
| CMimeticLocalBasis | |
| CMimeticLocalCoefficients | ! |
| CMimeticLocalFiniteElement | |
| CMimeticLocalInterpolation | |
| CMonomialBasis | |
| ►CMonomialBasisFactory | |
| CEvaluationBasisFactory | |
| CMonomialBasisFactoryTraits | |
| CMonomialBasisHelper | |
| CMonomialBasisImpl | |
| CMonomialBasisImpl< Impl::Point, F > | |
| CMonomialBasisImpl< Impl::Prism< BaseTopology >, F > | |
| CMonomialBasisImpl< Impl::Pyramid< BaseTopology >, F > | |
| ►CMonomialBasisProvider | |
| CEvaluationBasisFactory | |
| CMonomialBasisSize | |
| CMonomialBasisSize< Impl::Point > | |
| CMonomialBasisSize< Impl::Prism< BaseTopology > > | |
| CMonomialBasisSize< Impl::Pyramid< BaseTopology > > | |
| ►CMonomialEvaluator | |
| CBaseIterator | |
| CIterator | |
| CMonomialFiniteElementFactory | Factory for global-valued MonomFiniteElement objects |
| CMonomialLocalBasis | Constant shape function |
| CMonomialLocalCoefficients | Layout map for monomial finite elements |
| CMonomialLocalFiniteElement | Monomial basis for discontinuous Galerkin methods |
| CMonomialLocalInterpolation | |
| CMult | |
| CMult< Field, FieldVector< Field2, dimRange > > | |
| CMultiIndex | |
| ►COrthonormalBasisFactory | |
| CEvaluationBasisFactory | |
| COrthonormalBasisFactoryTraits | |
| COrthonormalLocalFiniteElement | A class providing orthonormal basis functions |
| CP0LocalBasis | Constant shape function |
| CP0LocalCoefficients | Layout map for P0 elements |
| CP0LocalFiniteElement | The local p0 finite element on all types of reference elements |
| CP0LocalInterpolation | |
| CP1LocalBasis | Linear Lagrange shape functions on the simplex |
| CP1LocalCoefficients | Local coefficients for simplex P1 elements |
| CP1LocalFiniteElement | The local p1 finite element on simplices |
| CP1LocalInterpolation | |
| CP23DLocalBasis | Quadratic Lagrange shape functions on the tetrahedron |
| CP23DLocalCoefficients | Layout map for P23D elements |
| CP23DLocalFiniteElement | |
| CP23DLocalInterpolation | |
| CP2LocalFiniteElement | |
| CP2LocalFiniteElement< D, R, 2 > | |
| CP2LocalFiniteElement< D, R, 3 > | |
| ►CPk1DFiniteElement | Langrange finite element of arbitrary order on triangles |
| CTraits | |
| CPk1DFiniteElementFactory | Factory for Pk1DFiniteElement objects |
| CPk1DLocalBasis | Lagrange shape functions of arbitrary order on the 1D reference triangle |
| CPk1DLocalCoefficients | Layout map for Pk elements |
| CPk1DLocalFiniteElement | |
| CPk1DLocalInterpolation | |
| ►CPk2DFiniteElement | Langrange finite element of arbitrary order on triangles |
| CTraits | |
| CPk2DFiniteElementFactory | Factory for Pk2DFiniteElement objects |
| CPk2DLocalBasis | Lagrange shape functions of arbitrary order on the reference triangle |
| CPk2DLocalCoefficients | Layout map for P0 elements |
| CPk2DLocalFiniteElement | |
| CPk2DLocalInterpolation | |
| CPk3DLocalBasis | Lagrange shape functions of arbitrary order on the reference tetrahedron |
| CPk3DLocalBasis< D, R, 0 > | |
| CPk3DLocalCoefficients | Please doc me! |
| CPk3DLocalFiniteElement | |
| CPk3DLocalInterpolation | |
| CPkLocalFiniteElement | General Lagrange finite element with arbitrary dimension and polynomial order |
| CPkLocalFiniteElement< D, R, 1, k > | General Lagrange finite element – specialization for a 2d reference element |
| CPkLocalFiniteElement< D, R, 2, k > | General Lagrange finite element – specialization for a 2d reference element |
| CPkLocalFiniteElement< D, R, 3, k > | General Lagrange finite element – specialization for a 3d reference element |
| ►CPolynomialBasis | |
| CConvert | |
| CConvert< dummy, DomainVector > | |
| CPolynomialBasisWithMatrix | |
| ►CPowerBasis | Meta-basis turning a scalar basis into vector-valued basis |
| CTraits | Types of domain and range |
| CPowerCoefficients | Meta-coefficients turning a scalar coefficients into vector-valued coefficients |
| ►CPowerFiniteElement | Meta-finite element turning a scalar finite element into vector-valued one |
| CTraits | Types of component objects |
| CPowerFiniteElementFactory | Factory for meta-finite elements turning scalar finite elements into vector-valued ones |
| CPowerInterpolation | Meta-interpolation turning a scalar interpolation into vector-valued interpolation |
| CPQ22DLocalFiniteElement | |
| CPQkLocalFiniteElementCache | A cache that stores all available Pk/Qk like local finite elements for the given dimension and order |
| CPQkLocalFiniteElementFactory | Factory to create any kind of Pk/Qk like element wrapped for the virtual interface |
| CPrecision | |
| CPrecision< double > | |
| CPrecision< float > | |
| CPrecision< long double > | |
| CPrismP1LocalBasis | Linear Lagrange shape functions on the prism |
| CPrismP1LocalCoefficients | Layout map for PrismP1 elements |
| CPrismP1LocalFiniteElement | First-order Lagrangian finite element on a prism |
| CPrismP1LocalInterpolation | |
| CPrismP2LocalBasis | Quadratic Lagrange shape functions on the prism |
| CPrismP2LocalCoefficients | Layout map for PrismP2 elements |
| CPrismP2LocalFiniteElement | |
| CPrismP2LocalInterpolation | |
| CPyramidP1LocalBasis | Linear Lagrange shape functions on the pyramid |
| CPyramidP1LocalCoefficients | Layout map for PyramidP1 elements |
| CPyramidP1LocalFiniteElement | First-order Lagrangian finite element on a prism |
| CPyramidP1LocalInterpolation | |
| CPyramidP2LocalBasis | Quadratic Lagrange shape functions on the pyramid |
| CPyramidP2LocalCoefficients | Layout map for PyramidP2 elements |
| CPyramidP2LocalFiniteElement | |
| CPyramidP2LocalInterpolation | |
| CQ1FiniteElementFactory | Factory for global-valued Q1 elements |
| CQ1LocalBasis | Lagrange shape functions of order 1 on the reference cube |
| CQ1LocalCoefficients | Layout map for Q1 elements |
| CQ1LocalFiniteElement | The local Q1 finite element on cubes |
| CQ1LocalInterpolation | |
| CQ2FiniteElementFactory | Factory for global-valued Q23D elements |
| CQkLocalBasis | Lagrange shape functions of order k on the reference cube |
| CQkLocalCoefficients | Attaches a shape function to an entity |
| CQkLocalFiniteElement | General Lagrange finite element for cubes with arbitrary dimension and polynomial order |
| CQkLocalInterpolation | |
| CQkLocalInterpolation< 0, d, LB > | |
| CRannacherTurek2DLocalBasis | |
| CRannacherTurek3DLocalBasis | |
| CRannacherTurekLocalBasis | Rannacher-Turek shape functions |
| CRannacherTurekLocalBasis< D, R, 2 > | |
| CRannacherTurekLocalBasis< D, R, 3 > | |
| CRannacherTurekLocalCoefficients | Layout for Rannacher-Turek elements |
| CRannacherTurekLocalFiniteElement | Rannacher-Turek shape functions |
| CRannacherTurekLocalInterpolation | Please doc me |
| CRaviartThomasBasisFactory | |
| CRaviartThomasCoefficientsFactory | |
| CRaviartThomasCoefficientsFactoryTraits | |
| CRaviartThomasCubeLocalFiniteElement | Raviart-Thomas local finite elements for cubes |
| CRaviartThomasCubeLocalFiniteElement< D, R, 2, 0 > | Raviart-Thomas local finite elements for cubes with dimension 2 and order 0 |
| CRaviartThomasCubeLocalFiniteElement< D, R, 2, 1 > | Raviart-Thomas local finite elements for cubes with dimension 2 and order 1 |
| CRaviartThomasCubeLocalFiniteElement< D, R, 2, 2 > | Raviart-Thomas local finite elements for cubes with dimension 2 and order 2 |
| CRaviartThomasCubeLocalFiniteElement< D, R, 2, 3 > | Raviart-Thomas local finite elements for cubes with dimension 2 and order 3 |
| CRaviartThomasCubeLocalFiniteElement< D, R, 2, 4 > | Raviart-Thomas local finite elements for cubes with dimension 2 and order 4 |
| CRaviartThomasCubeLocalFiniteElement< D, R, 3, 0 > | Raviart-Thomas local finite elements for cubes with dimension 3 and order 0 |
| CRaviartThomasCubeLocalFiniteElement< D, R, 3, 1 > | Raviart-Thomas local finite elements for cubes with dimension 3 and order 1 |
| CRaviartThomasL2Interpolation | An L2-based interpolation for Raviart Thomas |
| CRaviartThomasL2InterpolationFactory | |
| CRaviartThomasL2InterpolationFactoryTraits | |
| CRaviartThomasSimplexLocalFiniteElement | Raviart-Thomas local finite elements of arbitrary order for simplices of arbitrary dimension |
| CRefinedP0LocalBasis | Uniformly refined constant shape functions on a unit simplex in R^dim |
| CRefinedP0LocalCoefficients | Layout map for RefinedP0 elements |
| CRefinedP0LocalFiniteElement | Local finite element that is piecewise P0 on a once uniformly refined reference geometry |
| CRefinedP0LocalFiniteElement< D, R, 1 > | Local finite element that is piecewise P0 on a once uniformly refined reference geometry |
| CRefinedP0LocalFiniteElement< D, R, 2 > | Local finite element that is piecewise P0 on a once uniformly refined reference geometry |
| CRefinedP0LocalFiniteElement< D, R, 3 > | Local finite element that is piecewise P0 on a once uniformly refined reference geometry |
| CRefinedP0LocalInterpolation | |
| CRefinedP0LocalInterpolation< RefinedP0LocalBasis< D, R, 1 > > | |
| CRefinedP0LocalInterpolation< RefinedP0LocalBasis< D, R, 2 > > | |
| CRefinedP0LocalInterpolation< RefinedP0LocalBasis< D, R, 3 > > | |
| CRefinedP1LocalBasis | |
| CRefinedP1LocalBasis< D, R, 1 > | Uniformly refined linear Lagrange shape functions in 1D |
| CRefinedP1LocalBasis< D, R, 2 > | Uniformly refined linear Lagrange shape functions on the triangle |
| CRefinedP1LocalBasis< D, R, 3 > | Uniformly refined linear Lagrange shape functions on the 3D-simplex (tetrahedron) |
| CRefinedP1LocalFiniteElement | |
| CRefinedP1LocalFiniteElement< D, R, 2 > | |
| CRefinedP1LocalFiniteElement< D, R, 3 > | |
| CRefinedSimplexLocalBasis | |
| CRefinedSimplexLocalBasis< D, 1 > | Base class for LocalBasis classes based on uniform refinement in 1D; provides numbering and local coordinates of subelements |
| CRefinedSimplexLocalBasis< D, 2 > | Base class for LocalBasis classes based on uniform refinement in 2D; provides numbering and local coordinates of subelements |
| CRefinedSimplexLocalBasis< D, 3 > | Base class for LocalBasis classes based on uniform refinement in 3D; provides numbering and local coordinates of subelements |
| CRT02DLocalBasis | Lowest order Raviart-Thomas shape functions on the reference triangle |
| CRT02DLocalCoefficients | Layout map for RT0 elements |
| CRT02DLocalFiniteElement | Zero order Raviart-Thomas shape functions on triangles |
| CRT02DLocalInterpolation | |
| CRT0Cube2DLocalBasis | Lowest order Raviart-Thomas shape functions on the reference quadrilateral |
| CRT0Cube2DLocalCoefficients | Layout map for RT0 elements on quadrilaterals |
| CRT0Cube2DLocalFiniteElement | Zero order Raviart-Thomas shape functions on rectangles |
| CRT0Cube2DLocalInterpolation | Lowest order Raviart-Thomas shape functions on the reference quadrilateral |
| CRT0Cube3DLocalBasis | Lowest order Raviart-Thomas shape functions on the reference hexahedron |
| CRT0Cube3DLocalCoefficients | Layout map for RT0 elements on quadrilaterals |
| CRT0Cube3DLocalFiniteElement | Zero order Raviart-Thomas shape functions on cubes |
| CRT0Cube3DLocalInterpolation | Lowest order Raviart-Thomas shape functions on the reference hexahedron |
| CRT12DLocalBasis | First order Raviart-Thomas shape functions on the reference triangle |
| CRT12DLocalCoefficients | Layout map for Raviart-Thomas-1 elements on the reference triangle |
| CRT12DLocalFiniteElement | First order Raviart-Thomas shape functions on triangles |
| CRT12DLocalInterpolation | First order Raviart-Thomas shape functions on the reference quadrilateral |
| CRT1Cube2DLocalBasis | First order Raviart-Thomas shape functions on the reference quadrilateral |
| CRT1Cube2DLocalCoefficients | Layout map for Raviart-Thomas-1 elements on quadrilaterals |
| CRT1Cube2DLocalFiniteElement | First order Raviart-Thomas shape functions on quadrilaterals |
| CRT1Cube2DLocalInterpolation | First order Raviart-Thomas shape functions on the reference quadrilateral |
| CRT1Cube3DLocalBasis | First order Raviart-Thomas shape functions on the reference hexahedron |
| CRT1Cube3DLocalCoefficients | Layout map for Raviart-Thomas-1 elements on quadrilaterals |
| CRT1Cube3DLocalFiniteElement | First order Raviart-Thomas shape functions on cubes |
| CRT1Cube3DLocalInterpolation | First order Raviart-Thomas shape functions on the reference hexahedron |
| CRT2Cube2DLocalBasis | Second order Raviart-Thomas shape functions on the reference quadrilateral |
| CRT2Cube2DLocalCoefficients | Layout map for Raviart-Thomas-2 elements on quadrilaterals |
| CRT2Cube2DLocalFiniteElement | Second order Raviart-Thomas shape functions on cubes |
| CRT2Cube2DLocalInterpolation | Second order Raviart-Thomas shape functions on the reference triangle |
| CRT3Cube2DLocalBasis | Second order Raviart-Thomas shape functions on the reference quadrilateral |
| CRT3Cube2DLocalCoefficients | Layout map for Raviart-Thomas-3 elements on quadrilaterals |
| CRT3Cube2DLocalFiniteElement | Second order Raviart-Thomas shape functions on cubes |
| CRT3Cube2DLocalInterpolation | Second order Raviart-Thomas shape functions on the reference quadrilateral |
| CRT4Cube2DLocalBasis | Second order Raviart-Thomas shape functions on the reference quadrilateral |
| CRT4Cube2DLocalCoefficients | Layout map for Raviart-Thomas-4 elements on quadrilaterals |
| CRT4Cube2DLocalFiniteElement | Second order Raviart-Thomas shape functions on cubes |
| CRT4Cube2DLocalInterpolation | Second order Raviart-Thomas shape functions on the reference triangle |
| CRTL2InterpolationBuilder | |
| ►CRTPreBasisFactory | |
| CEvaluationBasisFactory | |
| CRTPreBasisFactoryTraits | |
| CRTVecMatrix | |
| CScalarLocalToGlobalBasisAdaptor | Convert a simple scalar local basis into a global basis |
| ►CScalarLocalToGlobalFiniteElementAdaptor | Convert a simple scalar local finite element into a global finite element |
| CTraits | |
| CScalarLocalToGlobalFiniteElementAdaptorFactory | Factory for ScalarLocalToGlobalFiniteElementAdaptor objects |
| CSparseCoeffMatrix | |
| CStandardBiMonomialBasis | |
| ►CStandardEvaluator | |
| CIterator | |
| CStandardMonomialBasis | |
| CUnity | A class representing the unit of a given Field |
| CUnity< MultiIndex< dim, F > > | |
| CVirtualMonomialBasis | |
| CVirtualMonomialBasisImpl | |
| CZero | A class representing the zero of a given Field |
| CZero< MultiIndex< dim, F > > | |
| ►NONBCompute | |
| CIntegral | |
| CIntegral< Dune::Impl::Point > | |
| CIntegral< Dune::Impl::Prism< Base > > | |
| CIntegral< Dune::Impl::Pyramid< Base > > | |
| CONBMatrix | |
