Column-major dense matrix.
Column-major dense matrix. The entry values are stored in a single array of doubles with columns listed in sequence. For example, the following matrix
1.0 2.0 3.0 4.0 5.0 6.0
is stored as [1.0, 3.0, 5.0, 2.0, 4.0, 6.0]
.
number of rows
number of columns
matrix entries in column major
number of rows
number of columns
matrix entries in column major if not transposed or in row major otherwise
whether the matrix is transposed. If true, values
stores the matrix in
row major.
Gets the (i, j)-th element.
Gets the (i, j)-th element.
Returns an iterator of column vectors.
Returns an iterator of column vectors. This operation could be expensive, depending on the underlying storage.
Get a deep copy of the matrix.
Get a deep copy of the matrix.
whether the matrix is transposed.
whether the matrix is transposed. If true, values
stores the matrix in
row major.
Convenience method for Matrix
-Vector
multiplication.
Convenience method for Matrix
-Vector
multiplication.
Convenience method for Matrix
-DenseVector
multiplication.
Convenience method for Matrix
-DenseVector
multiplication. For binary compatibility.
Convenience method for Matrix
-DenseMatrix
multiplication.
Convenience method for Matrix
-DenseMatrix
multiplication.
Find the number of values stored explicitly.
Find the number of values stored explicitly. These values can be zero as well.
number of columns
number of columns
Find the number of non-zero active values.
Find the number of non-zero active values.
number of rows
number of rows
Returns an iterator of row vectors.
Returns an iterator of row vectors. This operation could be expensive, depending on the underlying storage.
Converts to a dense array in column major.
Converts to a dense array in column major.
Generate a SparseMatrix
from the given DenseMatrix
.
Generate a SparseMatrix
from the given DenseMatrix
. The new matrix will have isTransposed
set to false.
A human readable representation of the matrix with maximum lines and width
A human readable representation of the matrix with maximum lines and width
A human readable representation of the matrix
A human readable representation of the matrix
Transpose the Matrix.
Transpose the Matrix. Returns a new Matrix
instance sharing the same underlying data.
matrix entries in column major if not transposed or in row major otherwise
matrix entries in column major if not transposed or in row major otherwise
Column-major dense matrix. The entry values are stored in a single array of doubles with columns listed in sequence. For example, the following matrix
is stored as
[1.0, 3.0, 5.0, 2.0, 4.0, 6.0]
.