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class MatrixI extends MatriI with Error with Serializable

The MatrixI class stores and operates on Numeric Matrices of type Int. This class follows the gen.MatrixN framework and is provided for efficiency. Caveat: Only works for rectangular matrices. For matrix-like structures based on jagged arrays, where the second dimension varies,

See also

scalation.linalgebra.gen.HMatrix2

Linear Supertypes
Serializable, Serializable, MatriI, Error, AnyRef, Any
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  1. MatrixI
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Instance Constructors

  1. new MatrixI(b: MatriI)

    Construct a matrix and assign values from matrix 'b'.

    Construct a matrix and assign values from matrix 'b'.

    b

    the matrix of values to assign

  2. new MatrixI(dim: (Int, Int), u: Int*)

    Construct a matrix from repeated values.

    Construct a matrix from repeated values.

    dim

    the (row, column) dimensions

    u

    the repeated values

  3. new MatrixI(u: Array[Array[Int]])

    Construct a matrix and assign values from array of arrays 'u'.

    Construct a matrix and assign values from array of arrays 'u'.

    u

    the 2D array of values to assign

  4. new MatrixI(dim1: Int, dim2: Int, x: Int)

    Construct a 'dim1' by 'dim2' matrix and assign each element the value 'x'.

    Construct a 'dim1' by 'dim2' matrix and assign each element the value 'x'.

    dim1

    the row dimension

    dim2

    the column dimension

    x

    the scalar value to assign

  5. new MatrixI(dim1: Int)

    Construct a 'dim1' by 'dim1' square matrix.

    Construct a 'dim1' by 'dim1' square matrix.

    dim1

    the row and column dimension

  6. new MatrixI(d1: Int, d2: Int, v: Array[Array[Int]] = null)

    d1

    the first/row dimension

    d2

    the second/column dimension

    v

    the 2D array used to store matrix elements

Value Members

  1. final def !=(arg0: Any): Boolean
    Definition Classes
    AnyRef → Any
  2. final def ##(): Int
    Definition Classes
    AnyRef → Any
  3. def *(x: Int): MatrixI

    Multiply 'this' matrix by scalar 'x'.

    Multiply 'this' matrix by scalar 'x'.

    x

    the scalar to multiply by

    Definition Classes
    MatrixIMatriI
  4. def *(u: VectoI): VectorI

    Multiply 'this' matrix by (column) vector 'u' (vector elements beyond 'dim2' ignored).

    Multiply 'this' matrix by (column) vector 'u' (vector elements beyond 'dim2' ignored).

    u

    the vector to multiply by

    Definition Classes
    MatrixIMatriI
  5. def *(b: MatriI): MatrixI

    Multiply 'this' matrix by matrix 'b', transposing 'b' to improve efficiency.

    Multiply 'this' matrix by matrix 'b', transposing 'b' to improve efficiency. Use 'times' method to skip the transpose step.

    b

    the matrix to multiply by (requires 'sameCrossDimensions')

    Definition Classes
    MatrixIMatriI
  6. def *(b: MatrixI): MatrixI

    Multiply 'this' matrix by matrix 'b', transposing 'b' to improve efficiency.

    Multiply 'this' matrix by matrix 'b', transposing 'b' to improve efficiency. Use 'times' method to skip the transpose step.

    b

    the matrix to multiply by (requires 'sameCrossDimensions')

  7. def **(u: VectoI): MatrixI

    Multiply 'this' matrix by vector 'u' to produce another matrix 'a_ij * u_j'.

    Multiply 'this' matrix by vector 'u' to produce another matrix 'a_ij * u_j'. E.g., multiply a matrix by a diagonal matrix represented as a vector.

    u

    the vector to multiply by

    Definition Classes
    MatrixIMatriI
  8. def **:(u: VectoI): MatrixI

    Multiply vector 'u' by 'this' matrix to produce another matrix 'u_i * a_ij'.

    Multiply vector 'u' by 'this' matrix to produce another matrix 'u_i * a_ij'. E.g., multiply a diagonal matrix represented as a vector by a matrix. This operator is right associative.

    u

    the vector to multiply by

    Definition Classes
    MatrixIMatriI
  9. def **=(u: VectoI): MatrixI

    Multiply in-place 'this' matrix by vector 'u' to produce another matrix 'a_ij * u_j'.

    Multiply in-place 'this' matrix by vector 'u' to produce another matrix 'a_ij * u_j'.

    u

    the vector to multiply by

    Definition Classes
    MatrixIMatriI
  10. def *:(u: VectoI): VectoI

    Multiply (row) vector 'u' by 'this' matrix.

    Multiply (row) vector 'u' by 'this' matrix. Note '*:' is right associative. vector = vector *: matrix

    u

    the vector to multiply by

    Definition Classes
    MatriI
  11. def *=(x: Int): MatrixI

    Multiply in-place 'this' matrix by scalar 'x'.

    Multiply in-place 'this' matrix by scalar 'x'.

    x

    the scalar to multiply by

    Definition Classes
    MatrixIMatriI
  12. def *=(b: MatriI): MatrixI

    Multiply in-place 'this' matrix by matrix 'b', transposing 'b' to improve efficiency.

    Multiply in-place 'this' matrix by matrix 'b', transposing 'b' to improve efficiency. Use 'times_ip' method to skip the transpose step.

    b

    the matrix to multiply by (requires square and 'sameCrossDimensions')

    Definition Classes
    MatrixIMatriI
  13. def *=(b: MatrixI): MatrixI

    Multiply in-place 'this' matrix by matrix 'b', transposing 'b' to improve efficiency.

    Multiply in-place 'this' matrix by matrix 'b', transposing 'b' to improve efficiency. Use 'times_ip' method to skip the transpose step.

    b

    the matrix to multiply by (requires square and 'sameCrossDimensions')

  14. def +(x: Int): MatrixI

    Add 'this' matrix and scalar 'x'.

    Add 'this' matrix and scalar 'x'.

    x

    the scalar to add

    Definition Classes
    MatrixIMatriI
  15. def +(u: VectoI): MatrixI

    Add 'this' matrix and (row) vector 'u'.

    Add 'this' matrix and (row) vector 'u'.

    u

    the vector to add

    Definition Classes
    MatrixIMatriI
  16. def +(b: MatriI): MatrixI

    Add 'this' matrix and matrix 'b' for any type extending MatriI.

    Add 'this' matrix and matrix 'b' for any type extending MatriI.

    b

    the matrix to add (requires 'leDimensions')

    Definition Classes
    MatrixIMatriI
  17. def +(b: MatrixI): MatrixI

    Add 'this' matrix and matrix 'b'.

    Add 'this' matrix and matrix 'b'.

    b

    the matrix to add (requires 'leDimensions')

  18. def ++(b: MatriI): MatrixI

    Concatenate (row-wise) 'this' matrix and matrix 'b'.

    Concatenate (row-wise) 'this' matrix and matrix 'b'.

    b

    the matrix to be concatenated as the new last rows in new matrix

    Definition Classes
    MatrixIMatriI
  19. def ++^(b: MatriI): MatrixI

    Concatenate (column-wise) 'this' matrix and matrix 'b'.

    Concatenate (column-wise) 'this' matrix and matrix 'b'.

    b

    the matrix to be concatenated as the new last columns in new matrix

    Definition Classes
    MatrixIMatriI
  20. def +:(u: VectoI): MatrixI

    Concatenate (row) vector 'u' and 'this' matrix, i.e., prepend 'u' to 'this'.

    Concatenate (row) vector 'u' and 'this' matrix, i.e., prepend 'u' to 'this'.

    u

    the vector to be prepended as the new first row in new matrix

    Definition Classes
    MatrixIMatriI
  21. def +=(x: Int): MatrixI

    Add in-place 'this' matrix and scalar 'x'.

    Add in-place 'this' matrix and scalar 'x'.

    x

    the scalar to add

    Definition Classes
    MatrixIMatriI
  22. def +=(u: VectoI): MatrixI

    Add in-place 'this' matrix and (row) vector 'u'.

    Add in-place 'this' matrix and (row) vector 'u'.

    u

    the vector to add

    Definition Classes
    MatrixIMatriI
  23. def +=(b: MatriI): MatrixI

    Add in-place 'this' matrix and matrix 'b' for any type extending MatriI.

    Add in-place 'this' matrix and matrix 'b' for any type extending MatriI.

    b

    the matrix to add (requires 'leDimensions')

    Definition Classes
    MatrixIMatriI
  24. def +=(b: MatrixI): MatrixI

    Add in-place 'this' matrix and matrix 'b'.

    Add in-place 'this' matrix and matrix 'b'.

    b

    the matrix to add (requires 'leDimensions')

  25. def +^:(u: VectoI): MatrixI

    Concatenate (column) vector 'u' and 'this' matrix, i.e., prepend 'u' to 'this'.

    Concatenate (column) vector 'u' and 'this' matrix, i.e., prepend 'u' to 'this'.

    u

    the vector to be prepended as the new first column in new matrix

    Definition Classes
    MatrixIMatriI
  26. def -(x: Int): MatrixI

    From 'this' matrix subtract scalar 'x'.

    From 'this' matrix subtract scalar 'x'.

    x

    the scalar to subtract

    Definition Classes
    MatrixIMatriI
  27. def -(u: VectoI): MatrixI

    From 'this' matrix subtract (row) vector 'u'.

    From 'this' matrix subtract (row) vector 'u'.

    u

    the vector to subtract@param b the vector to subtract

    Definition Classes
    MatrixIMatriI
  28. def -(b: MatriI): MatrixI

    From 'this' matrix subtract matrix 'b' for any type extending MatriI.

    From 'this' matrix subtract matrix 'b' for any type extending MatriI.

    b

    the matrix to subtract (requires 'leDimensions')

    Definition Classes
    MatrixIMatriI
  29. def -(b: MatrixI): MatrixI

    From 'this' matrix subtract matrix 'b'.

    From 'this' matrix subtract matrix 'b'.

    b

    the matrix to subtract (requires 'leDimensions')

  30. def -=(x: Int): MatrixI

    From 'this' matrix subtract in-place scalar 'x'.

    From 'this' matrix subtract in-place scalar 'x'.

    x

    the scalar to subtract

    Definition Classes
    MatrixIMatriI
  31. def -=(u: VectoI): MatrixI

    From 'this' matrix subtract in-place (row) vector 'u'.

    From 'this' matrix subtract in-place (row) vector 'u'.

    u

    the vector to subtract@param b the vector to subtract

    Definition Classes
    MatrixIMatriI
  32. def -=(b: MatriI): MatrixI

    From 'this' matrix subtract in-place matrix 'b'.

    From 'this' matrix subtract in-place matrix 'b'.

    b

    the matrix to subtract (requires 'leDimensions')

    Definition Classes
    MatrixIMatriI
  33. def -=(b: MatrixI): MatrixI

    From 'this' matrix subtract in-place matrix 'b'.

    From 'this' matrix subtract in-place matrix 'b'.

    b

    the matrix to subtract (requires 'leDimensions')

  34. def /(x: Int): MatrixI

    Divide 'this' matrix by scalar 'x'.

    Divide 'this' matrix by scalar 'x'.

    x

    the scalar to divide by

    Definition Classes
    MatrixIMatriI
  35. def /=(x: Int): MatrixI

    Divide in-place 'this' matrix by scalar 'x'.

    Divide in-place 'this' matrix by scalar 'x'.

    x

    the scalar to divide by

    Definition Classes
    MatrixIMatriI
  36. def :+(u: VectoI): MatrixI

    Concatenate 'this' matrix and (row) vector 'u', i.e., append 'u' to 'this'.

    Concatenate 'this' matrix and (row) vector 'u', i.e., append 'u' to 'this'.

    u

    the vector to be appended as the new last row in new matrix

    Definition Classes
    MatrixIMatriI
  37. def :^+(u: VectoI): MatrixI

    Concatenate 'this' matrix and (column) vector 'u', i.e., append 'u' to 'this'.

    Concatenate 'this' matrix and (column) vector 'u', i.e., append 'u' to 'this'.

    u

    the vector to be appended as the new last column in new matrix

    Definition Classes
    MatrixIMatriI
  38. final def ==(arg0: Any): Boolean
    Definition Classes
    AnyRef → Any
  39. def apply(): Array[Array[Int]]

    Get the underlying 2D array for 'this' matrix.

  40. def apply(ir: Range, jr: Range): MatrixI

    Get a slice 'this' matrix row-wise on range 'ir' and column-wise on range 'jr'.

    Get a slice 'this' matrix row-wise on range 'ir' and column-wise on range 'jr'. Ex: b = a(2..4, 3..5)

    ir

    the row range

    jr

    the column range

    Definition Classes
    MatrixIMatriI
  41. def apply(i: Int): VectorI

    Get 'this' matrix's vector at the 'i'-th index position ('i'-th row).

    Get 'this' matrix's vector at the 'i'-th index position ('i'-th row).

    i

    the row index

    Definition Classes
    MatrixIMatriI
  42. def apply(i: Int, j: Int): Int

    Get 'this' matrix's element at the 'i,j'-th index position.

    Get 'this' matrix's element at the 'i,j'-th index position.

    i

    the row index

    j

    the column index

    Definition Classes
    MatrixIMatriI
  43. def apply(i: Int, jr: Range): VectoI

    Get a slice 'this' matrix row-wise at index 'i' and column-wise on range 'jr'.

    Get a slice 'this' matrix row-wise at index 'i' and column-wise on range 'jr'. Ex: u = a(2, 3..5)

    i

    the row index

    jr

    the column range

    Definition Classes
    MatriI
  44. def apply(ir: Range, j: Int): VectoI

    Get a slice 'this' matrix row-wise on range 'ir' and column-wise at index j.

    Get a slice 'this' matrix row-wise on range 'ir' and column-wise at index j. Ex: u = a(2..4, 3)

    ir

    the row range

    j

    the column index

    Definition Classes
    MatriI
  45. final def asInstanceOf[T0]: T0
    Definition Classes
    Any
  46. def bsolve(y: VectoI): VectorI

    Solve for 'x' using back substitution in the equation 'u*x = y' where 'this' matrix ('u') is upper triangular (see 'lud_npp' above).

    Solve for 'x' using back substitution in the equation 'u*x = y' where 'this' matrix ('u') is upper triangular (see 'lud_npp' above).

    y

    the constant vector

    Definition Classes
    MatrixIMatriI
  47. def clean(thres: Double = TOL, relative: Boolean = true): MatrixI

    Clean values in 'this' matrix at or below the threshold 'thres' by setting them to zero.

    Clean values in 'this' matrix at or below the threshold 'thres' by setting them to zero. Iterative algorithms give approximate values and if very close to zero, may throw off other calculations, e.g., in computing eigenvectors.

    thres

    the cutoff threshold (a small value)

    relative

    whether to use relative or absolute cutoff

    Definition Classes
    MatrixIMatriI
  48. def clone(): AnyRef
    Attributes
    protected[java.lang]
    Definition Classes
    AnyRef
    Annotations
    @throws( ... )
  49. def col(col: Int, from: Int = 0): VectorI

    Get column 'col' from the matrix, returning it as a vector.

    Get column 'col' from the matrix, returning it as a vector.

    col

    the column to extract from the matrix

    from

    the position to start extracting from

    Definition Classes
    MatrixIMatriI
  50. def copy(): MatrixI

    Create an exact copy of 'this' m-by-n matrix.

    Create an exact copy of 'this' m-by-n matrix.

    Definition Classes
    MatrixIMatriI
  51. def det: Int

    Compute the determinant of 'this' matrix.

    Compute the determinant of 'this' matrix. The value of the determinant indicates, among other things, whether there is a unique solution to a system of linear equations (a nonzero determinant).

    Definition Classes
    MatrixIMatriI
  52. def diag(p: Int, q: Int = 0): MatrixI

    Form a matrix '[Ip, this, Iq]' where Ir is a 'r-by-r' identity matrix, by positioning the three matrices 'Ip', 'this' and 'Iq' along the diagonal.

    Form a matrix '[Ip, this, Iq]' where Ir is a 'r-by-r' identity matrix, by positioning the three matrices 'Ip', 'this' and 'Iq' along the diagonal. Fill the rest of matrix with zeros.

    p

    the size of identity matrix Ip

    q

    the size of identity matrix Iq

    Definition Classes
    MatrixIMatriI
  53. def diag(b: MatriI): MatrixI

    Combine 'this' matrix with matrix 'b', placing them along the diagonal and filling in the bottom left and top right regions with zeros; '[this, b]'.

    Combine 'this' matrix with matrix 'b', placing them along the diagonal and filling in the bottom left and top right regions with zeros; '[this, b]'.

    b

    the matrix to combine with 'this' matrix

    Definition Classes
    MatrixIMatriI
  54. lazy val dim1: Int

    Dimension 1

    Dimension 1

    Definition Classes
    MatrixIMatriI
  55. lazy val dim2: Int

    Dimension 2

    Dimension 2

    Definition Classes
    MatrixIMatriI
  56. def dot(b: MatrixI): VectorI

    Compute the dot product of 'this' matrix and matrix 'b' that results in a vector, by taking the dot product for each column 'j' of both matrices.

    Compute the dot product of 'this' matrix and matrix 'b' that results in a vector, by taking the dot product for each column 'j' of both matrices.

    b

    the matrix to multiply by (requires same first dimensions)

    See also

    www.mathworks.com/help/matlab/ref/dot.html

  57. def dot(b: MatriI): VectorI

    Compute the dot product of 'this' matrix and matrix 'b' that results in a vector, by taking the dot product for each column 'j' of both matrices.

    Compute the dot product of 'this' matrix and matrix 'b' that results in a vector, by taking the dot product for each column 'j' of both matrices.

    b

    the matrix to multiply by (requires same first dimensions)

    Definition Classes
    MatrixIMatriI
    See also

    www.mathworks.com/help/matlab/ref/dot.html

  58. def dot(u: VectoI): VectorI

    Compute the dot product of 'this' matrix and vector 'u', by first transposing 'this' matrix and then multiplying by 'u' (i.e., 'a dot u = a.t * u').

    Compute the dot product of 'this' matrix and vector 'u', by first transposing 'this' matrix and then multiplying by 'u' (i.e., 'a dot u = a.t * u').

    u

    the vector to multiply by (requires same first dimensions)

    Definition Classes
    MatrixIMatriI
  59. final def eq(arg0: AnyRef): Boolean
    Definition Classes
    AnyRef
  60. def equals(b: Any): Boolean

    Override equals to determine whether 'this' matrix equals matrix 'b'.

    Override equals to determine whether 'this' matrix equals matrix 'b'.

    b

    the matrix to compare with this

    Definition Classes
    MatrixI → AnyRef → Any
  61. val fString: String

    Format string used for printing vector values (change using 'setFormat')

    Format string used for printing vector values (change using 'setFormat')

    Attributes
    protected
    Definition Classes
    MatriI
  62. def finalize(): Unit
    Attributes
    protected[java.lang]
    Definition Classes
    AnyRef
    Annotations
    @throws( classOf[java.lang.Throwable] )
  63. final def flaw(method: String, message: String): Unit

    Show the flaw by printing the error message.

    Show the flaw by printing the error message.

    method

    the method where the error occurred

    message

    the error message

    Definition Classes
    Error
  64. def foreach[U](f: (Array[Int]) ⇒ U): Unit

    Iterate over 'this' matrix row by row applying method 'f'.

    Iterate over 'this' matrix row by row applying method 'f'.

    f

    the function to apply

    Definition Classes
    MatriI
  65. final def getClass(): Class[_]
    Definition Classes
    AnyRef → Any
  66. def getDiag(k: Int = 0): VectorI

    Get the 'k'th diagonal of 'this' matrix.

    Get the 'k'th diagonal of 'this' matrix.

    k

    how far above the main diagonal, e.g., (-1, 0, 1) for (sub, main, super)

    Definition Classes
    MatrixIMatriI
  67. def hashCode(): Int

    Must also override hashCode for 'this' matrix to be compatible with equals.

    Must also override hashCode for 'this' matrix to be compatible with equals.

    Definition Classes
    MatrixI → AnyRef → Any
  68. def inverse: MatrixI

    Invert 'this' matrix (requires a square matrix) and use partial pivoting.

    Invert 'this' matrix (requires a square matrix) and use partial pivoting.

    Definition Classes
    MatrixIMatriI
  69. def inverse_ip(): MatrixI

    Invert in-place 'this' matrix (requires a square matrix) and uses partial pivoting.

    Invert in-place 'this' matrix (requires a square matrix) and uses partial pivoting. Note: this method turns the original matrix into the identity matrix. The inverse is returned and is captured by assignment.

    Definition Classes
    MatrixIMatriI
  70. def inverse_npp: MatrixI

    Invert 'this' matrix (requires a square matrix) and does not use partial pivoting.

  71. def isBidiagonal: Boolean

    Check whether 'this' matrix is bidiagonal (has non-zero elements only in main diagonal and super-diagonal).

    Check whether 'this' matrix is bidiagonal (has non-zero elements only in main diagonal and super-diagonal). The method may be overriding for efficiency.

    Definition Classes
    MatriI
  72. final def isInstanceOf[T0]: Boolean
    Definition Classes
    Any
  73. def isNonnegative: Boolean

    Check whether 'this' matrix is nonnegative (has no negative elements).

    Check whether 'this' matrix is nonnegative (has no negative elements).

    Definition Classes
    MatriI
  74. def isRectangular: Boolean

    Check whether 'this' matrix is rectangular (all rows have the same number of columns).

    Check whether 'this' matrix is rectangular (all rows have the same number of columns).

    Definition Classes
    MatrixIMatriI
  75. def isSquare: Boolean

    Check whether 'this' matrix is square (same row and column dimensions).

    Check whether 'this' matrix is square (same row and column dimensions).

    Definition Classes
    MatriI
  76. def isSymmetric: Boolean

    Check whether 'this' matrix is symmetric.

    Check whether 'this' matrix is symmetric.

    Definition Classes
    MatriI
  77. def isTridiagonal: Boolean

    Check whether 'this' matrix is bidiagonal (has non-zero elements only in main diagonal and super-diagonal).

    Check whether 'this' matrix is bidiagonal (has non-zero elements only in main diagonal and super-diagonal). The method may be overriding for efficiency.

    Definition Classes
    MatriI
  78. def leDimensions(b: MatriI): Boolean

    Check whether 'this' matrix dimensions are less than or equal to 'le' those of the other matrix 'b'.

    Check whether 'this' matrix dimensions are less than or equal to 'le' those of the other matrix 'b'.

    b

    the other matrix

    Definition Classes
    MatriI
  79. def lowerT: MatrixI

    Return the lower triangular of 'this' matrix (rest are zero).

    Return the lower triangular of 'this' matrix (rest are zero).

    Definition Classes
    MatrixIMatriI
  80. def lud_ip(): (MatrixI, MatrixI)

    Factor in-place 'this' matrix into the product of lower and upper triangular matrices '(l, u)' using the 'LU' Factorization algorithm.

    Factor in-place 'this' matrix into the product of lower and upper triangular matrices '(l, u)' using the 'LU' Factorization algorithm.

    Definition Classes
    MatrixIMatriI
  81. def lud_npp: (MatrixI, MatrixI)

    Factor 'this' matrix into the product of upper and lower triangular matrices '(l, u)' using the 'LU' Factorization algorithm.

    Factor 'this' matrix into the product of upper and lower triangular matrices '(l, u)' using the 'LU' Factorization algorithm. Caveat: This version requires square matrices and performs no partial pivoting.

    Definition Classes
    MatrixIMatriI
    See also

    Fac_LU for a more complete implementation

  82. def mag: Int

    Find the magnitude of 'this' matrix, the element value farthest from zero.

    Find the magnitude of 'this' matrix, the element value farthest from zero.

    Definition Classes
    MatriI
  83. def max(e: Int = dim1): Int

    Find the maximum element in 'this' matrix.

    Find the maximum element in 'this' matrix.

    e

    the ending row index (exclusive) for the search

    Definition Classes
    MatrixIMatriI
  84. def mdot(b: MatrixI): MatrixI

    Compute the matrix dot product of 'this' matrix and matrix 'b', by first transposing 'this' matrix and then multiplying by 'b' (i.e., 'a dot b = a.t * b').

    Compute the matrix dot product of 'this' matrix and matrix 'b', by first transposing 'this' matrix and then multiplying by 'b' (i.e., 'a dot b = a.t * b').

    b

    the matrix to multiply by (requires same first dimensions)

  85. def mdot(b: MatriI): MatrixI

    Compute the matrix dot product of 'this' matrix and matrix 'b', by first transposing 'this' matrix and then multiplying by 'b' (i.e., 'a dot b = a.t * b').

    Compute the matrix dot product of 'this' matrix and matrix 'b', by first transposing 'this' matrix and then multiplying by 'b' (i.e., 'a dot b = a.t * b').

    b

    the matrix to multiply by (requires same first dimensions)

    Definition Classes
    MatrixIMatriI
  86. def mean: VectoI

    Compute the column means of this matrix.

    Compute the column means of this matrix.

    Definition Classes
    MatriI
  87. def min(e: Int = dim1): Int

    Find the minimum element in 'this' matrix.

    Find the minimum element in 'this' matrix.

    e

    the ending row index (exclusive) for the search

    Definition Classes
    MatrixIMatriI
  88. final def ne(arg0: AnyRef): Boolean
    Definition Classes
    AnyRef
  89. def norm1: Int

    Compute the 1-norm of 'this' matrix, i.e., the maximum 1-norm of the column vectors.

    Compute the 1-norm of 'this' matrix, i.e., the maximum 1-norm of the column vectors. This is useful for comparing matrices '(a - b).norm1'.

    Definition Classes
    MatriI
  90. def normalizeU: MatrixI

    Create a normalized version of 'this' matrix.

  91. final def notify(): Unit
    Definition Classes
    AnyRef
  92. final def notifyAll(): Unit
    Definition Classes
    AnyRef
  93. def nullspace: VectorI

    Compute the (right) nullspace of 'this' 'm-by-n' matrix (requires 'n = m+1') by performing Gauss-Jordan reduction and extracting the negation of the last column augmented by 1.

    Compute the (right) nullspace of 'this' 'm-by-n' matrix (requires 'n = m+1') by performing Gauss-Jordan reduction and extracting the negation of the last column augmented by 1.

    nullspace (a) = set of orthogonal vectors v s.t. a * v = 0

    The left nullspace of matrix 'a' is the same as the right nullspace of 'a.t'. FIX: need a more robust algorithm for computing nullspace (@see Fac_QR.scala). FIX: remove the 'n = m+1' restriction.

    Definition Classes
    MatrixIMatriI
    See also

    /solving-ax-0-pivot-variables-special-solutions/MIT18_06SCF11_Ses1.7sum.pdf

    http://ocw.mit.edu/courses/mathematics/18-06sc-linear-algebra-fall-2011/ax-b-and-the-four-subspaces

  94. def nullspace_ip(): VectorI

    Compute in-place the (right) nullspace of 'this' 'm-by-n' matrix (requires 'n = m+1') by performing Gauss-Jordan reduction and extracting the negation of the last column augmented by 1.

    Compute in-place the (right) nullspace of 'this' 'm-by-n' matrix (requires 'n = m+1') by performing Gauss-Jordan reduction and extracting the negation of the last column augmented by 1.

    nullspace (a) = set of orthogonal vectors v s.t. a * v = 0

    The left nullspace of matrix 'a' is the same as the right nullspace of 'a.t'. FIX: need a more robust algorithm for computing nullspace (@see Fac_QR.scala). FIX: remove the 'n = m+1' restriction.

    Definition Classes
    MatrixIMatriI
    See also

    /solving-ax-0-pivot-variables-special-solutions/MIT18_06SCF11_Ses1.7sum.pdf

    http://ocw.mit.edu/courses/mathematics/18-06sc-linear-algebra-fall-2011/ax-b-and-the-four-subspaces

  95. val range1: Range

    Range for the storage array on dimension 1 (rows)

    Range for the storage array on dimension 1 (rows)

    Definition Classes
    MatriI
  96. val range2: Range

    Range for the storage array on dimension 2 (columns)

    Range for the storage array on dimension 2 (columns)

    Definition Classes
    MatriI
  97. def reduce: MatrixI

    Use Gauss-Jordan reduction on 'this' matrix to make the left part embed an identity matrix.

    Use Gauss-Jordan reduction on 'this' matrix to make the left part embed an identity matrix. A constraint on this 'm-by-n' matrix is that 'n >= m'. It can be used to solve 'a * x = b': augment 'a' with 'b' and call reduce. Takes '[a | b]' to '[I | x]'.

    Definition Classes
    MatrixIMatriI
  98. def reduce_ip(): Unit

    Use Gauss-Jordan reduction in-place on 'this' matrix to make the left part embed an identity matrix.

    Use Gauss-Jordan reduction in-place on 'this' matrix to make the left part embed an identity matrix. A constraint on this 'm-by-n' matrix is that 'n >= m'. It can be used to solve 'a * x = b': augment 'a' with 'b' and call reduce. Takes '[a | b]' to '[I | x]'.

    Definition Classes
    MatrixIMatriI
  99. def sameCrossDimensions(b: MatriI): Boolean

    Check whether 'this' matrix and the other matrix 'b' have the same cross dimensions.

    Check whether 'this' matrix and the other matrix 'b' have the same cross dimensions.

    b

    the other matrix

    Definition Classes
    MatriI
  100. def sameDimensions(b: MatriI): Boolean

    Check whether 'this' matrix and the other matrix 'b' have the same dimensions.

    Check whether 'this' matrix and the other matrix 'b' have the same dimensions.

    b

    the other matrix

    Definition Classes
    MatriI
  101. def selectCols(colIndex: Array[Int]): MatrixI

    Select columns from 'this' matrix according to the given index/basis.

    Select columns from 'this' matrix according to the given index/basis. Ex: Can be used to divide a matrix into a basis and a non-basis.

    colIndex

    the column index positions (e.g., (0, 2, 5))

    Definition Classes
    MatrixIMatriI
  102. def selectRows(rowIndex: Array[Int]): MatrixI

    Select rows from 'this' matrix according to the given index/basis.

    Select rows from 'this' matrix according to the given index/basis. The new matrix is formed by copying rows from the current matrix.

    rowIndex

    the row index positions (e.g., (0, 2, 5))

    Definition Classes
    MatrixIMatriI
  103. def selectRows2(rowIndex: Array[Int]): MatrixI

    Select rows from 'this' matrix according to the given index/basis.

    Select rows from 'this' matrix according to the given index/basis. The new matrix is formed by referencing rows in the current matrix, thereby saving space.

    rowIndex

    the row index positions (e.g., (0, 2, 5))

  104. def set(i: Int, u: VectoI, j: Int = 0): Unit

    Set 'this' matrix's 'i'-th row starting at column 'j' to the vector 'u'.

    Set 'this' matrix's 'i'-th row starting at column 'j' to the vector 'u'.

    i

    the row index

    u

    the vector value to assign

    j

    the starting column index

    Definition Classes
    MatrixIMatriI
  105. def set(u: Array[Array[Int]]): Unit

    Set all the values in 'this' matrix as copies of the values in 2D array 'u'.

    Set all the values in 'this' matrix as copies of the values in 2D array 'u'.

    u

    the 2D array of values to assign

    Definition Classes
    MatrixIMatriI
  106. def set(x: Int): Unit

    Set all the elements in 'this' matrix to the scalar 'x'.

    Set all the elements in 'this' matrix to the scalar 'x'.

    x

    the scalar value to assign

    Definition Classes
    MatrixIMatriI
  107. def setCol(col: Int, u: VectoI): Unit

    Set column 'col' of the matrix to a vector.

    Set column 'col' of the matrix to a vector.

    col

    the column to set

    u

    the vector to assign to the column

    Definition Classes
    MatrixIMatriI
  108. def setDiag(x: Int): Unit

    Set the main diagonal of 'this' matrix to the scalar 'x'.

    Set the main diagonal of 'this' matrix to the scalar 'x'.

    x

    the scalar to set the diagonal to

    Definition Classes
    MatrixIMatriI
  109. def setDiag(u: VectoI, k: Int = 0): Unit

    Set the 'k'th diagonal of 'this' matrix to the vector 'u'.

    Set the 'k'th diagonal of 'this' matrix to the vector 'u'.

    u

    the vector to set the diagonal to

    k

    how far above the main diagonal, e.g., (-1, 0, 1) for (sub, main, super)

    Definition Classes
    MatrixIMatriI
  110. def setFormat(newFormat: String): Unit

    Set the format to the 'newFormat'.

    Set the format to the 'newFormat'.

    newFormat

    the new format string

    Definition Classes
    MatriI
  111. def slice(r_from: Int, r_end: Int, c_from: Int, c_end: Int): MatrixI

    Slice 'this' matrix row-wise 'r_from' to 'r_end' and column-wise 'c_from' to 'c_end'.

    Slice 'this' matrix row-wise 'r_from' to 'r_end' and column-wise 'c_from' to 'c_end'.

    r_from

    the start of the row slice

    r_end

    the end of the row slice

    c_from

    the start of the column slice

    c_end

    the end of the column slice

    Definition Classes
    MatrixIMatriI
  112. def slice(from: Int, end: Int): MatrixI

    Slice 'this' matrix row-wise 'from' to 'end'.

    Slice 'this' matrix row-wise 'from' to 'end'.

    from

    the start row of the slice (inclusive)

    end

    the end row of the slice (exclusive)

    Definition Classes
    MatrixIMatriI
  113. def sliceCol(from: Int, end: Int): MatrixI

    Slice 'this' matrix column-wise 'from' to 'end'.

    Slice 'this' matrix column-wise 'from' to 'end'.

    from

    the start column of the slice (inclusive)

    end

    the end column of the slice (exclusive)

    Definition Classes
    MatrixIMatriI
  114. def sliceExclude(row: Int, col: Int): MatrixI

    Slice 'this' matrix excluding the given row and/or column.

    Slice 'this' matrix excluding the given row and/or column.

    row

    the row to exclude (0 until dim1, set to dim1 to keep all rows)

    col

    the column to exclude (0 until dim2, set to dim2 to keep all columns)

    Definition Classes
    MatrixIMatriI
  115. def solve(b: VectoI): VectoI

    Solve for 'x' in the equation 'a*x = b' where 'a' is 'this' matrix.

    Solve for 'x' in the equation 'a*x = b' where 'a' is 'this' matrix.

    b

    the constant vector.

    Definition Classes
    MatrixIMatriI
  116. def solve(l: MatriI, u: MatriI, b: VectoI): VectoI

    Solve for 'x' in the equation 'l*u*x = b' (see 'lud_npp' above).

    Solve for 'x' in the equation 'l*u*x = b' (see 'lud_npp' above).

    l

    the lower triangular matrix

    u

    the upper triangular matrix

    b

    the constant vector

    Definition Classes
    MatrixIMatriI
  117. def solve(lu: (MatriI, MatriI), b: VectoI): VectoI

    Solve for 'x' in the equation 'l*u*x = b' (see 'lud' above).

    Solve for 'x' in the equation 'l*u*x = b' (see 'lud' above).

    lu

    the lower and upper triangular matrices

    b

    the constant vector

    Definition Classes
    MatriI
  118. def sum: Int

    Compute the sum of 'this' matrix, i.e., the sum of its elements.

    Compute the sum of 'this' matrix, i.e., the sum of its elements.

    Definition Classes
    MatrixIMatriI
  119. def sumAbs: Int

    Compute the 'abs' sum of 'this' matrix, i.e., the sum of the absolute value of its elements.

    Compute the 'abs' sum of 'this' matrix, i.e., the sum of the absolute value of its elements. This is useful for comparing matrices '(a - b).sumAbs'.

    Definition Classes
    MatrixIMatriI
  120. def sumLower: Int

    Compute the sum of the lower triangular region of 'this' matrix.

    Compute the sum of the lower triangular region of 'this' matrix.

    Definition Classes
    MatrixIMatriI
  121. def swap(i: Int, k: Int, col: Int = 0): Unit

    Swap the elements in rows 'i' and 'k' starting from column 'col'.

    Swap the elements in rows 'i' and 'k' starting from column 'col'.

    i

    the first row in the swap

    k

    the second row in the swap

    col

    the starting column for the swap (default 0 => whole row)

    Definition Classes
    MatriI
  122. def swapCol(j: Int, l: Int, row: Int = 0): Unit

    Swap the elements in columns 'j' and 'l' starting from row 'row'.

    Swap the elements in columns 'j' and 'l' starting from row 'row'.

    j

    the first column in the swap

    l

    the second column in the swap

    row

    the starting row for the swap (default 0 => whole column)

    Definition Classes
    MatriI
  123. final def synchronized[T0](arg0: ⇒ T0): T0
    Definition Classes
    AnyRef
  124. def t: MatrixI

    Transpose 'this' matrix (columns => rows).

    Transpose 'this' matrix (columns => rows).

    Definition Classes
    MatrixIMatriI
  125. def times(b: MatrixI): MatrixI

    Multiply 'this' matrix by matrix 'b' without first transposing 'b'.

    Multiply 'this' matrix by matrix 'b' without first transposing 'b'.

    b

    the matrix to multiply by (requires 'sameCrossDimensions')

  126. def times_d(b: MatriI): MatrixI

    Multiply 'this' matrix by matrix 'b' using 'dot' product (concise solution).

    Multiply 'this' matrix by matrix 'b' using 'dot' product (concise solution).

    b

    the matrix to multiply by (requires 'sameCrossDimensions')

  127. def times_ip(b: MatrixI): Unit

    Multiply in-place 'this' matrix by matrix 'b' without first transposing 'b'.

    Multiply in-place 'this' matrix by matrix 'b' without first transposing 'b'. If 'b' and 'this' reference the same matrix 'b == this', a copy of the 'this' matrix is made.

    b

    the matrix to multiply by (requires square and 'sameCrossDimensions')

  128. def times_ip_pre(b: MatrixI, d: Int = 0): Unit

    Pre-multiply in-place 'this' ('a') matrix by matrix 'b', starting with column 'd'.

    Pre-multiply in-place 'this' ('a') matrix by matrix 'b', starting with column 'd'.

    a(d:m, d:n) = b a(d:m, d:n)

    b

    the matrix to pre-multiply by 'this' (requires square and 'sameCrossDimensions')

    d

    the column to start with

  129. def times_s(b: MatrixI): MatrixI

    Multiply 'this' matrix by matrix 'b' using the Strassen matrix multiplication algorithm.

    Multiply 'this' matrix by matrix 'b' using the Strassen matrix multiplication algorithm. Both matrices ('this' and 'b') must be square. Although the algorithm is faster than the traditional cubic algorithm, its requires more memory and is often less stable (due to round-off errors). FIX: could be make more efficient using a virtual slice 'vslice' method.

    b

    the matrix to multiply by (it has to be a square matrix)

    See also

    http://en.wikipedia.org/wiki/Strassen_algorithm

  130. def tip(): MatrixI

    Transpose, in-place, 'this' matrix (columns => rows).

    Transpose, in-place, 'this' matrix (columns => rows). FIX: may wish to use algorithm with better data locality.

  131. def toDense: MatrixI

    Convert 'this' matrix to a dense matrix.

    Convert 'this' matrix to a dense matrix.

    Definition Classes
    MatrixIMatriI
  132. def toInt: MatrixI

    Convert 'this' MatrixI into a MatrixI.

    Convert 'this' MatrixI into a MatrixI.

    Definition Classes
    MatrixIMatriI
  133. def toString(): String

    Convert 'this' real (double precision) matrix to a string.

    Convert 'this' real (double precision) matrix to a string.

    Definition Classes
    MatrixI → AnyRef → Any
  134. def trace: Int

    Compute the trace of 'this' matrix, i.e., the sum of the elements on the main diagonal.

    Compute the trace of 'this' matrix, i.e., the sum of the elements on the main diagonal. Should also equal the sum of the eigenvalues.

    Definition Classes
    MatrixIMatriI
    See also

    Eigen.scala

  135. def update(ir: Range, jr: Range, b: MatriI): Unit

    Set a slice 'this' matrix row-wise on range 'ir' and column-wise on range 'jr'.

    Set a slice 'this' matrix row-wise on range 'ir' and column-wise on range 'jr'. Ex: a(2..4, 3..5) = b

    ir

    the row range

    jr

    the column range

    b

    the matrix to assign

    Definition Classes
    MatrixIMatriI
  136. def update(i: Int, u: VectoI): Unit

    Set 'this' matrix's row at the 'i'-th index position to the vector 'u'.

    Set 'this' matrix's row at the 'i'-th index position to the vector 'u'.

    i

    the row index

    u

    the vector value to assign

    Definition Classes
    MatrixIMatriI
  137. def update(i: Int, j: Int, x: Int): Unit

    Set 'this' matrix's element at the 'i,j'-th index position to the scalar 'x'.

    Set 'this' matrix's element at the 'i,j'-th index position to the scalar 'x'.

    i

    the row index

    j

    the column index

    x

    the scalar value to assign

    Definition Classes
    MatrixIMatriI
  138. def update(i: Int, jr: Range, u: VectoI): Unit

    Set a slice of 'this' matrix row-wise at index 'i' and column-wise on range 'jr' to vector 'u'.

    Set a slice of 'this' matrix row-wise at index 'i' and column-wise on range 'jr' to vector 'u'. Ex: a(2, 3..5) = u

    i

    the row index

    jr

    the column range

    u

    the vector to assign

    Definition Classes
    MatriI
  139. def update(ir: Range, j: Int, u: VectoI): Unit

    Set a slice of 'this' matrix row-wise on range 'ir' and column-wise at index 'j' to vector 'u'.

    Set a slice of 'this' matrix row-wise on range 'ir' and column-wise at index 'j' to vector 'u'. Ex: a(2..4, 3) = u

    ir

    the row range

    j

    the column index

    u

    the vector to assign

    Definition Classes
    MatriI
  140. def upperT: MatrixI

    Return the upper triangular of 'this' matrix (rest are zero).

    Return the upper triangular of 'this' matrix (rest are zero).

    Definition Classes
    MatrixIMatriI
  141. final def wait(): Unit
    Definition Classes
    AnyRef
    Annotations
    @throws( ... )
  142. final def wait(arg0: Long, arg1: Int): Unit
    Definition Classes
    AnyRef
    Annotations
    @throws( ... )
  143. final def wait(arg0: Long): Unit
    Definition Classes
    AnyRef
    Annotations
    @throws( ... )
  144. def write(fileName: String): Unit

    Write 'this' matrix to a CSV-formatted text file with name 'fileName'.

    Write 'this' matrix to a CSV-formatted text file with name 'fileName'.

    fileName

    the name of file to hold the data

    Definition Classes
    MatrixIMatriI
  145. def zero(m: Int = dim1, n: Int = dim2): MatrixI

    Create an m-by-n matrix with all elements initialized to zero.

    Create an m-by-n matrix with all elements initialized to zero.

    m

    the number of rows

    n

    the number of columns

    Definition Classes
    MatrixIMatriI
  146. def ~^(p: Int): MatrixI

    Raise 'this' matrix to the 'p'th power (for some integer 'p' >= 1) using a divide and conquer algorithm.

    Raise 'this' matrix to the 'p'th power (for some integer 'p' >= 1) using a divide and conquer algorithm.

    p

    the power to raise 'this' matrix to

    Definition Classes
    MatrixIMatriI

Inherited from Serializable

Inherited from Serializable

Inherited from MatriI

Inherited from Error

Inherited from AnyRef

Inherited from Any

Ungrouped