lsolve.qmr: Quasi Minimal Residual Method

Description

Quasia-Minimal Resudial(QMR) method is another remedy of the BiCG which shows rather irregular convergence behavior. It adapts to solve the reduced tridiagonal system in a least squares sense and its convergence is known to be quite smoother than BiCG.

Usage

lsolve.qmr(
  A,
  B,
  xinit = NA,
  reltol = 1e-05,
  maxiter = 1000,
  preconditioner = diag(ncol(A)),
  verbose = TRUE
)

Value

a named list containing

x: solution; a vector of length \(n\) or a matrix of size \((n\times k)\).
iter: the number of iterations required.
errors: a vector of errors for stopping criterion.

Arguments

A: an \((m\times n)\) dense or sparse matrix. See also sparseMatrix.
B: a vector of length \(m\) or an \((m\times k)\) matrix (dense or sparse) for solving \(k\) systems simultaneously.
xinit: a length-\(n\) vector for initial starting point. NA to start from a random initial point near 0.
reltol: tolerance level for stopping iterations.
maxiter: maximum number of iterations allowed.
preconditioner: an \((n\times n)\) preconditioning matrix; default is an identity matrix.
verbose: a logical; TRUE to show progress of computation.

References

freund_qmr:_1991Rlinsolve

Examples

Run this code

# \donttest{
## Overdetermined System
set.seed(100)
A = matrix(rnorm(10*5),nrow=10)
x = rnorm(5)
b = A%*%x

out1 = lsolve.cg(A,b)
out2 = lsolve.bicg(A,b)
out3 = lsolve.qmr(A,b)
matout = cbind(matrix(x),out1$x, out2$x, out3$x);
colnames(matout) = c("true x","CG result", "BiCG result", "QMR result")
print(matout)
# }

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