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pracma (version 1.9.9)

itersolve: Iterative Methods

Description

Iterative solutions of systems of linear equations.

Usage

itersolve(A, b, x0 = NULL, nmax = 1000, tol = .Machine$double.eps^(0.5), method = c("Gauss-Seidel", "Jacobi", "Richardson"))

Arguments

A
numerical matrix, square and non-singular.
b
numerical vector or column vector.
x0
starting solution for iteration; defaults to null vector.
nmax
maximum number of iterations.
tol
relative tolerance.
method
iterative method, Gauss-Seidel, Jacobi, or Richardson.

Value

Returns a list with components x the solution, iter the number of iterations, and method the name of the method applied.

Details

Iterative methods are based on splitting the matrix A=(P-A)-A with a so-called `preconditioner' matrix P. The methods differ in how to choose this preconditioner.

References

Quarteroni, A., and F. Saleri (2006). Scientific Computing with MATLAB and Octave. Springer-Verlag, Berlin Heidelberg.

See Also

qrSolve

Examples

Run this code
N <- 10
A <- Diag(rep(3,N)) + Diag(rep(-2, N-1), k=-1) + Diag(rep(-1, N-1), k=1)
b <- A %*% rep(1, N)
x0 <- rep(0, N)

itersolve(A, b, tol = 1e-8, method = "Gauss-Seidel")
# [1]  1  1  1  1  1  1  1  1  1  1
# [1]  87
itersolve(A, b, x0 = 1:10, tol = 1e-8, method = "Jacobi")
# [1]  1  1  1  1  1  1  1  1  1  1
# [1]  177

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