Category:Algorithm level
Jump to navigation
Jump to search
Pages in category "Algorithm level"
The following 88 pages are in this category, out of 88 total.
B
C
D
G
- Gabow's edge connectivity algorithm
- Gaussian elimination with column pivoting
- Gaussian elimination with complete pivoting
- Gaussian elimination with diagonal pivoting
- Gaussian elimination with row pivoting
- Gaussian elimination, compact scheme for tridiagonal matrices, serial variant
- Gaussian elimination, compact scheme for tridiagonal matrices, serial version
- GHS algorithm
- Givens method
H
- Hessenberg QR algorithm as implemented in SCALAPACK
- High Performance Conjugate Gradient (HPCG) benchmark
- Hopcroft–Karp algorithm
- Horners method
- Householder (reflections) method for reducing a complex Hermitian matrix to symmetric tridiagonal form
- Householder (reflections) method for reducing a symmetric matrix to tridiagonal form
- Householder (reflections) method for the QR decomposition of a square matrix, real point-wise version
- Householder (reflections) reduction of a matrix to bidiagonal form
- Hungarian algorithm
L
N
P
Q
R
S
- Serial Jacobi (rotations) method for symmetric matrices
- Serial Jacobi (rotations) method with thresholds for symmetric matrices
- Shiloach-Vishkin algorithm for finding the connected components
- Single-qubit transform of a state vector
- Stochastic dual dynamic programming (SDDP)
- Stone doubling algorithm for solving bidiagonal SLAEs
- Stone doubling algorithm for the LU decomposition of a tridiagonal matrix
- Symmetric QR algorithm as implemented in SCALAPACK
T
- Tarjan's algorithm for finding the bridges of a graph
- Tarjan's biconnected components algorithm
- Tarjan's strongly connected components algorithm
- Tarjan-Vishkin biconnected components algorithm
- The classical Jacobi (rotations) method with pivoting for symmetric matrices
- The serial-parallel summation method
- Thomas algorithm, pointwise version
- Two-qubit transform of a state vector
- Two-sided Thomas algorithm, block variant
- Two-sided Thomas algorithm, pointwise version