CGAL 5.1.5 - CGAL and Solvers
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Concepts | |
concept | DiagonalizeTraits< FT, dim > |
Concept providing functions to extract eigenvectors and eigenvalues from covariance matrices represented by an array a , using symmetric diagonalization. More... | |
concept | MixedIntegerProgramVariable |
MixedIntegerProgramVariable is a concept of a variable in a Mixed Integer Programming (MIP) problem. More... | |
concept | MixedIntegerProgramLinearConstraint< FT > |
MixedIntegerProgramLinearConstraint is a concept of a linear constraint in a Mixed Integer Programming (MIP) problem. More... | |
concept | MixedIntegerProgramLinearObjective< FT > |
MixedIntegerProgramLinearObjective is a concept of the linear objective function in a Mixed Integer Programming (MIP) problem. More... | |
concept | MixedIntegerProgramTraits< FT > |
Concept describing the set of requirements for (constrained or unconstrained) Mixed Integer Programming (MIP) problems. A model of this concept stores the integer variables, linear objective, and linear constraints (if any) and provides a method to solve the problem. More... | |
concept | NormalEquationSparseLinearAlgebraTraits_d |
Concept describing the set of requirements for solving the normal equation \( A^t A X = A^t B \), \( A \) being a matrix, \( At \) its transpose matrix, \( B \) and \( X \) being two vectors. More... | |
concept | SparseLinearAlgebraTraits_d |
The concept SparseLinearAlgebraTraits_d is used to solve sparse linear systems A \( \times \) X = B. More... | |
concept | SparseLinearAlgebraWithFactorTraits_d |
Concept describing the set of requirements for a direct sparse linear system solver with factorization. A model of this concept stores the left-hand matrix (denoted \( A \)) and provides an additional factorization method to solve the system for different right-hand vectors. More... | |
concept | SvdTraits |
The concept SvdTraits describes the linear algebra types and algorithms needed to solve in the least square sense a linear system with a singular value decomposition. More... | |