Displaying 8 results from an estimated 8 matches for "tridiagonals".
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tridiagonal
2013 Apr 09
1
Solving tridiagonal matrix in R
Dear R Users,
I am trying to solve a tridiagonal matrix in R. I am wondering if there is
an inbuilt R function or package to solve that. I tried looking on google
but couldn't find something that would help directly. Any help is highly
appreciated.
Thanks.
Janesh
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2003 Oct 01
4
Solving a tridiagonal system
I need to find solutions to a tridiagonal system. By
this I mean a set of linear equations Ax = d where A
is a square matrix containing elements A[i,i-1],
A[i,i] and A[i,i+1] for i in 1:nrow, and zero
elsewhere. R is probably not the ideal way to do this,
but this is part of a larger problem that requires R.
In my application it is much easier (and much faster)
to generate the diagonal and
2010 Jul 17
0
Computing the power of a matrix efficiently and accurately
Good day,
I would like to know if there is an efficient and accurate method for
computing the power of a tridiagonal matrix in R? The "obvious" method would
be eigen-decomposition, but I find that this is not very accurate, probably
because the dimensions of the matrix I am considering are large and the
eigenvectors are not well approximated. Here is an example of what I am
trying to
2013 Apr 25
2
Vectorized code for generating the Kac (Clement) matrix
Hi,
I am generating large Kac matrices (also known as Clement matrix). This a tridiagonal matrix. I was wondering whether there is a vectorized solution that avoids the `for' loops to the following code:
n <- 1000
Kacmat <- matrix(0, n+1, n+1)
for (i in 1:n) Kacmat[i, i+1] <- n - i + 1
for (i in 2:(n+1)) Kacmat[i, i-1] <- i-1
The above code is fast, but I am curious about
2005 Nov 14
1
(no subject)
Hi,
I am trying to solve a model that consists of rather stiff ODEs in R.
I use the package ODEsolve (lsoda) to solve these ODEs.
To speed up the integration, the jacobian is also specified.
Basically, the model is a one-dimensional advection-diffusion problem,
and thus the jacobian is a tridiagonal matrix.
The size of this jacobian is 100*100.
In the original package
2006 Dec 19
1
preserving sparse matrices (Matrix)
Hi,
I have sparse (tridiagonal) matrices, and I use the Matrix package for
handling them. For certain computations, I need to either set the
first row to zero, or double the last row. I find that neither
operation preserves sparsity, eg
> m <- Diagonal(5)
> m
5 x 5 diagonal matrix of class "ddiMatrix"
[,1] [,2] [,3] [,4] [,5]
[1,] 1 . . . .
[2,] . 1
2006 Oct 18
1
Calculation of Eigen values.
Dear all R users,
Can anyone tell me to calculate Eigen value of any real symmetric matrix
which algorithm R uses? Is it Jacobi method ? If not is it possible to get
explicit algorithm for calculating it?
Thanks and regards,
Arun
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2009 Mar 25
2
Listing of LAPACK error codes
Professor Ripley commented on LAPACK error codes:
https://stat.ethz.ch/pipermail/r-help/2007-March/127702.html and says
"Internal LAPACK errors are usually problems with arithmetic accuracy,
and as such are compiler- and CPU-specific."
Is there a listing for the error codes from Lapack routine 'dsyevr'?
Especially I am interested about the meaning and handling of error codes 1