// This file is part of Eigen, a lightweight C++ template library // for linear algebra. // // Copyright (C) 2008-2015 Gael Guennebaud // Copyright (C) 2007-2009 Benoit Jacob // // This Source Code Form is subject to the terms of the Mozilla // Public License v. 2.0. If a copy of the MPL was not distributed // with this file, You can obtain one at http://mozilla.org/MPL/2.0/. #ifndef EIGEN_CONSTANTS_H #define EIGEN_CONSTANTS_H namespace Eigen { /** This value means that a positive quantity (e.g., a size) is not known at compile-time, and that instead the value is * stored in some runtime variable. * * Changing the value of Dynamic breaks the ABI, as Dynamic is often used as a template parameter for Matrix. */ const int Dynamic = -1; /** This value means that a signed quantity (e.g., a signed index) is not known at compile-time, and that instead its value * has to be specified at runtime. */ const int DynamicIndex = 0xffffff; /** This value means that the increment to go from one value to another in a sequence is not constant for each step. */ const int UndefinedIncr = 0xfffffe; /** This value means +Infinity; it is currently used only as the p parameter to MatrixBase::lpNorm(). * The value Infinity there means the L-infinity norm. */ const int Infinity = -1; /** This value means that the cost to evaluate an expression coefficient is either very expensive or * cannot be known at compile time. * * This value has to be positive to (1) simplify cost computation, and (2) allow to distinguish between a very expensive and very very expensive expressions. * It thus must also be large enough to make sure unrolling won't happen and that sub expressions will be evaluated, but not too large to avoid overflow. */ const int HugeCost = 10000; /** \defgroup flags Flags * \ingroup Core_Module * * These are the possible bits which can be OR'ed to constitute the flags of a matrix or * expression. * * It is important to note that these flags are a purely compile-time notion. They are a compile-time property of * an expression type, implemented as enum's. They are not stored in memory at runtime, and they do not incur any * runtime overhead. * * \sa MatrixBase::Flags */ /** \ingroup flags * * for a matrix, this means that the storage order is row-major. * If this bit is not set, the storage order is column-major. * For an expression, this determines the storage order of * the matrix created by evaluation of that expression. * \sa \blank \ref TopicStorageOrders */ const unsigned int RowMajorBit = 0x1; /** \ingroup flags * means the expression should be evaluated by the calling expression */ const unsigned int EvalBeforeNestingBit = 0x2; /** \ingroup flags * \deprecated * means the expression should be evaluated before any assignment */ EIGEN_DEPRECATED const unsigned int EvalBeforeAssigningBit = 0x4; // FIXME deprecated /** \ingroup flags * * Short version: means the expression might be vectorized * * Long version: means that the coefficients can be handled by packets * and start at a memory location whose alignment meets the requirements * of the present CPU architecture for optimized packet access. In the fixed-size * case, there is the additional condition that it be possible to access all the * coefficients by packets (this implies the requirement that the size be a multiple of 16 bytes, * and that any nontrivial strides don't break the alignment). In the dynamic-size case, * there is no such condition on the total size and strides, so it might not be possible to access * all coeffs by packets. * * \note This bit can be set regardless of whether vectorization is actually enabled. * To check for actual vectorizability, see \a ActualPacketAccessBit. */ const unsigned int PacketAccessBit = 0x8; #ifdef EIGEN_VECTORIZE /** \ingroup flags * * If vectorization is enabled (EIGEN_VECTORIZE is defined) this constant * is set to the value \a PacketAccessBit. * * If vectorization is not enabled (EIGEN_VECTORIZE is not defined) this constant * is set to the value 0. */ const unsigned int ActualPacketAccessBit = PacketAccessBit; #else const unsigned int ActualPacketAccessBit = 0x0; #endif /** \ingroup flags * * Short version: means the expression can be seen as 1D vector. * * Long version: means that one can access the coefficients * of this expression by coeff(int), and coeffRef(int) in the case of a lvalue expression. These * index-based access methods are guaranteed * to not have to do any runtime computation of a (row, col)-pair from the index, so that it * is guaranteed that whenever it is available, index-based access is at least as fast as * (row,col)-based access. Expressions for which that isn't possible don't have the LinearAccessBit. * * If both PacketAccessBit and LinearAccessBit are set, then the * packets of this expression can be accessed by packet(int), and writePacket(int) in the case of a * lvalue expression. * * Typically, all vector expressions have the LinearAccessBit, but there is one exception: * Product expressions don't have it, because it would be troublesome for vectorization, even when the * Product is a vector expression. Thus, vector Product expressions allow index-based coefficient access but * not index-based packet access, so they don't have the LinearAccessBit. */ const unsigned int LinearAccessBit = 0x10; /** \ingroup flags * * Means the expression has a coeffRef() method, i.e. is writable as its individual coefficients are directly addressable. * This rules out read-only expressions. * * Note that DirectAccessBit and LvalueBit are mutually orthogonal, as there are examples of expression having one but note * the other: * \li writable expressions that don't have a very simple memory layout as a strided array, have LvalueBit but not DirectAccessBit * \li Map-to-const expressions, for example Map, have DirectAccessBit but not LvalueBit * * Expressions having LvalueBit also have their coeff() method returning a const reference instead of returning a new value. */ const unsigned int LvalueBit = 0x20; /** \ingroup flags * * Means that the underlying array of coefficients can be directly accessed as a plain strided array. The memory layout * of the array of coefficients must be exactly the natural one suggested by rows(), cols(), * outerStride(), innerStride(), and the RowMajorBit. This rules out expressions such as Diagonal, whose coefficients, * though referencable, do not have such a regular memory layout. * * See the comment on LvalueBit for an explanation of how LvalueBit and DirectAccessBit are mutually orthogonal. */ const unsigned int DirectAccessBit = 0x40; /** \deprecated \ingroup flags * * means the first coefficient packet is guaranteed to be aligned. * An expression cannot has the AlignedBit without the PacketAccessBit flag. * In other words, this means we are allow to perform an aligned packet access to the first element regardless * of the expression kind: * \code * expression.packet(0); * \endcode */ EIGEN_DEPRECATED const unsigned int AlignedBit = 0x80; const unsigned int NestByRefBit = 0x100; /** \ingroup flags * * for an expression, this means that the storage order * can be either row-major or column-major. * The precise choice will be decided at evaluation time or when * combined with other expressions. * \sa \blank \ref RowMajorBit, \ref TopicStorageOrders */ const unsigned int NoPreferredStorageOrderBit = 0x200; /** \ingroup flags * * Means that the underlying coefficients can be accessed through pointers to the sparse (un)compressed storage format, * that is, the expression provides: * \code inline const Scalar* valuePtr() const; inline const Index* innerIndexPtr() const; inline const Index* outerIndexPtr() const; inline const Index* innerNonZeroPtr() const; \endcode */ const unsigned int CompressedAccessBit = 0x400; // list of flags that are inherited by default const unsigned int HereditaryBits = RowMajorBit | EvalBeforeNestingBit; /** \defgroup enums Enumerations * \ingroup Core_Module * * Various enumerations used in %Eigen. Many of these are used as template parameters. */ /** \ingroup enums * Enum containing possible values for the \c Mode or \c UpLo parameter of * MatrixBase::selfadjointView() and MatrixBase::triangularView(), and selfadjoint solvers. */ enum UpLoType { /** View matrix as a lower triangular matrix. */ Lower=0x1, /** View matrix as an upper triangular matrix. */ Upper=0x2, /** %Matrix has ones on the diagonal; to be used in combination with #Lower or #Upper. */ UnitDiag=0x4, /** %Matrix has zeros on the diagonal; to be used in combination with #Lower or #Upper. */ ZeroDiag=0x8, /** View matrix as a lower triangular matrix with ones on the diagonal. */ UnitLower=UnitDiag|Lower, /** View matrix as an upper triangular matrix with ones on the diagonal. */ UnitUpper=UnitDiag|Upper, /** View matrix as a lower triangular matrix with zeros on the diagonal. */ StrictlyLower=ZeroDiag|Lower, /** View matrix as an upper triangular matrix with zeros on the diagonal. */ StrictlyUpper=ZeroDiag|Upper, /** Used in BandMatrix and SelfAdjointView to indicate that the matrix is self-adjoint. */ SelfAdjoint=0x10, /** Used to support symmetric, non-selfadjoint, complex matrices. */ Symmetric=0x20 }; /** \ingroup enums * Enum for indicating whether a buffer is aligned or not. */ enum AlignmentType { Unaligned=0, /**< Data pointer has no specific alignment. */ Aligned8=8, /**< Data pointer is aligned on a 8 bytes boundary. */ Aligned16=16, /**< Data pointer is aligned on a 16 bytes boundary. */ Aligned32=32, /**< Data pointer is aligned on a 32 bytes boundary. */ Aligned64=64, /**< Data pointer is aligned on a 64 bytes boundary. */ Aligned128=128, /**< Data pointer is aligned on a 128 bytes boundary. */ AlignedMask=255, Aligned=16, /**< \deprecated Synonym for Aligned16. */ #if EIGEN_MAX_ALIGN_BYTES==128 AlignedMax = Aligned128 #elif EIGEN_MAX_ALIGN_BYTES==64 AlignedMax = Aligned64 #elif EIGEN_MAX_ALIGN_BYTES==32 AlignedMax = Aligned32 #elif EIGEN_MAX_ALIGN_BYTES==16 AlignedMax = Aligned16 #elif EIGEN_MAX_ALIGN_BYTES==8 AlignedMax = Aligned8 #elif EIGEN_MAX_ALIGN_BYTES==0 AlignedMax = Unaligned #else #error Invalid value for EIGEN_MAX_ALIGN_BYTES #endif }; /** \ingroup enums * Enum used by DenseBase::corner() in Eigen2 compatibility mode. */ // FIXME after the corner() API change, this was not needed anymore, except by AlignedBox // TODO: find out what to do with that. Adapt the AlignedBox API ? enum CornerType { TopLeft, TopRight, BottomLeft, BottomRight }; /** \ingroup enums * Enum containing possible values for the \p Direction parameter of * Reverse, PartialReduxExpr and VectorwiseOp. */ enum DirectionType { /** For Reverse, all columns are reversed; * for PartialReduxExpr and VectorwiseOp, act on columns. */ Vertical, /** For Reverse, all rows are reversed; * for PartialReduxExpr and VectorwiseOp, act on rows. */ Horizontal, /** For Reverse, both rows and columns are reversed; * not used for PartialReduxExpr and VectorwiseOp. */ BothDirections }; /** \internal \ingroup enums * Enum to specify how to traverse the entries of a matrix. */ enum TraversalType { /** \internal Default traversal, no vectorization, no index-based access */ DefaultTraversal, /** \internal No vectorization, use index-based access to have only one for loop instead of 2 nested loops */ LinearTraversal, /** \internal Equivalent to a slice vectorization for fixed-size matrices having good alignment * and good size */ InnerVectorizedTraversal, /** \internal Vectorization path using a single loop plus scalar loops for the * unaligned boundaries */ LinearVectorizedTraversal, /** \internal Generic vectorization path using one vectorized loop per row/column with some * scalar loops to handle the unaligned boundaries */ SliceVectorizedTraversal, /** \internal Special case to properly handle incompatible scalar types or other defecting cases*/ InvalidTraversal, /** \internal Evaluate all entries at once */ AllAtOnceTraversal }; /** \internal \ingroup enums * Enum to specify whether to unroll loops when traversing over the entries of a matrix. */ enum UnrollingType { /** \internal Do not unroll loops. */ NoUnrolling, /** \internal Unroll only the inner loop, but not the outer loop. */ InnerUnrolling, /** \internal Unroll both the inner and the outer loop. If there is only one loop, * because linear traversal is used, then unroll that loop. */ CompleteUnrolling }; /** \internal \ingroup enums * Enum to specify whether to use the default (built-in) implementation or the specialization. */ enum SpecializedType { Specialized, BuiltIn }; /** \ingroup enums * Enum containing possible values for the \p _Options template parameter of * Matrix, Array and BandMatrix. */ enum StorageOptions { /** Storage order is column major (see \ref TopicStorageOrders). */ ColMajor = 0, /** Storage order is row major (see \ref TopicStorageOrders). */ RowMajor = 0x1, // it is only a coincidence that this is equal to RowMajorBit -- don't rely on that /** Align the matrix itself if it is vectorizable fixed-size */ AutoAlign = 0, /** Don't require alignment for the matrix itself (the array of coefficients, if dynamically allocated, may still be requested to be aligned) */ // FIXME --- clarify the situation DontAlign = 0x2 }; /** \ingroup enums * Enum for specifying whether to apply or solve on the left or right. */ enum SideType { /** Apply transformation on the left. */ OnTheLeft = 1, /** Apply transformation on the right. */ OnTheRight = 2 }; /* the following used to be written as: * * struct NoChange_t {}; * namespace { * EIGEN_UNUSED NoChange_t NoChange; * } * * on the ground that it feels dangerous to disambiguate overloaded functions on enum/integer types. * However, this leads to "variable declared but never referenced" warnings on Intel Composer XE, * and we do not know how to get rid of them (bug 450). */ enum NoChange_t { NoChange }; enum Sequential_t { Sequential }; enum Default_t { Default }; /** \internal \ingroup enums * Used in AmbiVector. */ enum AmbiVectorMode { IsDense = 0, IsSparse }; /** \ingroup enums * Used as template parameter in DenseCoeffBase and MapBase to indicate * which accessors should be provided. */ enum AccessorLevels { /** Read-only access via a member function. */ ReadOnlyAccessors, /** Read/write access via member functions. */ WriteAccessors, /** Direct read-only access to the coefficients. */ DirectAccessors, /** Direct read/write access to the coefficients. */ DirectWriteAccessors }; /** \ingroup enums * Enum with options to give to various decompositions. */ enum DecompositionOptions { /** \internal Not used (meant for LDLT?). */ Pivoting = 0x01, /** \internal Not used (meant for LDLT?). */ NoPivoting = 0x02, /** Used in JacobiSVD to indicate that the square matrix U is to be computed. */ ComputeFullU = 0x04, /** Used in JacobiSVD to indicate that the thin matrix U is to be computed. */ ComputeThinU = 0x08, /** Used in JacobiSVD to indicate that the square matrix V is to be computed. */ ComputeFullV = 0x10, /** Used in JacobiSVD to indicate that the thin matrix V is to be computed. */ ComputeThinV = 0x20, /** Used in SelfAdjointEigenSolver and GeneralizedSelfAdjointEigenSolver to specify * that only the eigenvalues are to be computed and not the eigenvectors. */ EigenvaluesOnly = 0x40, /** Used in SelfAdjointEigenSolver and GeneralizedSelfAdjointEigenSolver to specify * that both the eigenvalues and the eigenvectors are to be computed. */ ComputeEigenvectors = 0x80, /** \internal */ EigVecMask = EigenvaluesOnly | ComputeEigenvectors, /** Used in GeneralizedSelfAdjointEigenSolver to indicate that it should * solve the generalized eigenproblem \f$ Ax = \lambda B x \f$. */ Ax_lBx = 0x100, /** Used in GeneralizedSelfAdjointEigenSolver to indicate that it should * solve the generalized eigenproblem \f$ ABx = \lambda x \f$. */ ABx_lx = 0x200, /** Used in GeneralizedSelfAdjointEigenSolver to indicate that it should * solve the generalized eigenproblem \f$ BAx = \lambda x \f$. */ BAx_lx = 0x400, /** \internal */ GenEigMask = Ax_lBx | ABx_lx | BAx_lx }; /** \ingroup enums * Possible values for the \p QRPreconditioner template parameter of JacobiSVD. */ enum QRPreconditioners { /** Do not specify what is to be done if the SVD of a non-square matrix is asked for. */ NoQRPreconditioner, /** Use a QR decomposition without pivoting as the first step. */ HouseholderQRPreconditioner, /** Use a QR decomposition with column pivoting as the first step. */ ColPivHouseholderQRPreconditioner, /** Use a QR decomposition with full pivoting as the first step. */ FullPivHouseholderQRPreconditioner }; #ifdef Success #error The preprocessor symbol 'Success' is defined, possibly by the X11 header file X.h #endif /** \ingroup enums * Enum for reporting the status of a computation. */ enum ComputationInfo { /** Computation was successful. */ Success = 0, /** The provided data did not satisfy the prerequisites. */ NumericalIssue = 1, /** Iterative procedure did not converge. */ NoConvergence = 2, /** The inputs are invalid, or the algorithm has been improperly called. * When assertions are enabled, such errors trigger an assert. */ InvalidInput = 3 }; /** \ingroup enums * Enum used to specify how a particular transformation is stored in a matrix. * \sa Transform, Hyperplane::transform(). */ enum TransformTraits { /** Transformation is an isometry. */ Isometry = 0x1, /** Transformation is an affine transformation stored as a (Dim+1)^2 matrix whose last row is * assumed to be [0 ... 0 1]. */ Affine = 0x2, /** Transformation is an affine transformation stored as a (Dim) x (Dim+1) matrix. */ AffineCompact = 0x10 | Affine, /** Transformation is a general projective transformation stored as a (Dim+1)^2 matrix. */ Projective = 0x20 }; /** \internal \ingroup enums * Enum used to choose between implementation depending on the computer architecture. */ namespace Architecture { enum Type { Generic = 0x0, SSE = 0x1, AltiVec = 0x2, VSX = 0x3, NEON = 0x4, #if defined EIGEN_VECTORIZE_SSE Target = SSE #elif defined EIGEN_VECTORIZE_ALTIVEC Target = AltiVec #elif defined EIGEN_VECTORIZE_VSX Target = VSX #elif defined EIGEN_VECTORIZE_NEON Target = NEON #else Target = Generic #endif }; } /** \internal \ingroup enums * Enum used as template parameter in Product and product evaluators. */ enum ProductImplType { DefaultProduct=0, LazyProduct, AliasFreeProduct, CoeffBasedProductMode, LazyCoeffBasedProductMode, OuterProduct, InnerProduct, GemvProduct, GemmProduct }; /** \internal \ingroup enums * Enum used in experimental parallel implementation. */ enum Action {GetAction, SetAction}; /** The type used to identify a dense storage. */ struct Dense {}; /** The type used to identify a general sparse storage. */ struct Sparse {}; /** The type used to identify a general solver (factored) storage. */ struct SolverStorage {}; /** The type used to identify a permutation storage. */ struct PermutationStorage {}; /** The type used to identify a permutation storage. */ struct TranspositionsStorage {}; /** The type used to identify a matrix expression */ struct MatrixXpr {}; /** The type used to identify an array expression */ struct ArrayXpr {}; // An evaluator must define its shape. By default, it can be one of the following: struct DenseShape { static std::string debugName() { return "DenseShape"; } }; struct SolverShape { static std::string debugName() { return "SolverShape"; } }; struct HomogeneousShape { static std::string debugName() { return "HomogeneousShape"; } }; struct DiagonalShape { static std::string debugName() { return "DiagonalShape"; } }; struct BandShape { static std::string debugName() { return "BandShape"; } }; struct TriangularShape { static std::string debugName() { return "TriangularShape"; } }; struct SelfAdjointShape { static std::string debugName() { return "SelfAdjointShape"; } }; struct PermutationShape { static std::string debugName() { return "PermutationShape"; } }; struct TranspositionsShape { static std::string debugName() { return "TranspositionsShape"; } }; struct SparseShape { static std::string debugName() { return "SparseShape"; } }; namespace internal { // random access iterators based on coeff*() accessors. struct IndexBased {}; // evaluator based on iterators to access coefficients. struct IteratorBased {}; /** \internal * Constants for comparison functors */ enum ComparisonName { cmp_EQ = 0, cmp_LT = 1, cmp_LE = 2, cmp_UNORD = 3, cmp_NEQ = 4, cmp_GT = 5, cmp_GE = 6 }; } // end namespace internal } // end namespace Eigen #endif // EIGEN_CONSTANTS_H