class Matrix
The Matrix
class represents a mathematical matrix. It provides methods for creating matrices, operating on them arithmetically and algebraically, and determining their mathematical properties such as trace, rank, inverse, determinant, or eigensystem.
Constants
- SELECTORS
- VERSION
Attributes
Returns the number of columns.
Returns the number of columns.
instance creations
Public Class Methods
Creates a matrix where each argument is a row.
Matrix[ [25, 93], [-1, 66] ] # => 25 93 # -1 66
# File matrix.rb, line 78 def Matrix.[](*rows) rows(rows, false) end
Creates a matrix of size row_count
x column_count
. It fills the values by calling the given block, passing the current row and column. Returns an enumerator if no block is given.
m = Matrix.build(2, 4) {|row, col| col - row } # => Matrix[[0, 1, 2, 3], [-1, 0, 1, 2]] m = Matrix.build(3) { rand } # => a 3x3 matrix with random elements
# File matrix.rb, line 123 def Matrix.build(row_count, column_count = row_count) row_count = CoercionHelper.coerce_to_int(row_count) column_count = CoercionHelper.coerce_to_int(column_count) raise ArgumentError if row_count < 0 || column_count < 0 return to_enum :build, row_count, column_count unless block_given? rows = Array.new(row_count) do |i| Array.new(column_count) do |j| yield i, j end end new rows, column_count end
Creates a single-column matrix where the values of that column are as given in column
.
Matrix.column_vector([4,5,6]) # => 4 # 5 # 6
# File matrix.rb, line 209 def Matrix.column_vector(column) column = convert_to_array(column) new [column].transpose, 1 end
Creates a matrix using columns
as an array of column vectors.
Matrix.columns([[25, 93], [-1, 66]]) # => 25 -1 # 93 66
# File matrix.rb, line 108 def Matrix.columns(columns) rows(columns, false).transpose end
Create a matrix by combining matrices entrywise, using the given block
x = Matrix[[6, 6], [4, 4]] y = Matrix[[1, 2], [3, 4]] Matrix.combine(x, y) {|a, b| a - b} # => Matrix[[5, 4], [1, 0]]
# File matrix.rb, line 288 def Matrix.combine(*matrices) return to_enum(__method__, *matrices) unless block_given? return Matrix.empty if matrices.empty? matrices.map!(&CoercionHelper.method(:coerce_to_matrix)) x = matrices.first matrices.each do |m| raise ErrDimensionMismatch unless x.row_count == m.row_count && x.column_count == m.column_count end rows = Array.new(x.row_count) do |i| Array.new(x.column_count) do |j| yield matrices.map{|m| m[i,j]} end end new rows, x.column_count end
Creates a matrix where the diagonal elements are composed of values
.
Matrix.diagonal(9, 5, -3) # => 9 0 0 # 0 5 0 # 0 0 -3
# File matrix.rb, line 143 def Matrix.diagonal(*values) size = values.size return Matrix.empty if size == 0 rows = Array.new(size) {|j| row = Array.new(size, 0) row[j] = values[j] row } new rows end
Creates a empty matrix of row_count
x column_count
. At least one of row_count
or column_count
must be 0.
m = Matrix.empty(2, 0) m == Matrix[ [], [] ] # => true n = Matrix.empty(0, 3) n == Matrix.columns([ [], [], [] ]) # => true m * n # => Matrix[[0, 0, 0], [0, 0, 0]]
# File matrix.rb, line 227 def Matrix.empty(row_count = 0, column_count = 0) raise ArgumentError, "One size must be 0" if column_count != 0 && row_count != 0 raise ArgumentError, "Negative size" if column_count < 0 || row_count < 0 new([[]]*row_count, column_count) end
Create a matrix by stacking matrices horizontally
x = Matrix[[1, 2], [3, 4]] y = Matrix[[5, 6], [7, 8]] Matrix.hstack(x, y) # => Matrix[[1, 2, 5, 6], [3, 4, 7, 8]]
# File matrix.rb, line 262 def Matrix.hstack(x, *matrices) x = CoercionHelper.coerce_to_matrix(x) result = x.send(:rows).map(&:dup) total_column_count = x.column_count matrices.each do |m| m = CoercionHelper.coerce_to_matrix(m) if m.row_count != x.row_count raise ErrDimensionMismatch, "The given matrices must have #{x.row_count} rows, but one has #{m.row_count}" end result.each_with_index do |row, i| row.concat m.send(:rows)[i] end total_column_count += m.column_count end new result, total_column_count end
Creates an n
by n
identity matrix.
Matrix.identity(2) # => 1 0 # 0 1
# File matrix.rb, line 171 def Matrix.identity(n) scalar(n, 1) end
Matrix.new
is private; use ::rows
, ::columns
, ::[]
, etc… to create.
# File matrix.rb, line 322 def initialize(rows, column_count = rows[0].size) # No checking is done at this point. rows must be an Array of Arrays. # column_count must be the size of the first row, if there is one, # otherwise it *must* be specified and can be any integer >= 0 @rows = rows @column_count = column_count end
Creates a single-row matrix where the values of that row are as given in row
.
Matrix.row_vector([4,5,6]) # => 4 5 6
# File matrix.rb, line 196 def Matrix.row_vector(row) row = convert_to_array(row) new [row] end
Creates a matrix where rows
is an array of arrays, each of which is a row of the matrix. If the optional argument copy
is false, use the given arrays as the internal structure of the matrix without copying.
Matrix.rows([[25, 93], [-1, 66]]) # => 25 93 # -1 66
# File matrix.rb, line 90 def Matrix.rows(rows, copy = true) rows = convert_to_array(rows, copy) rows.map! do |row| convert_to_array(row, copy) end size = (rows[0] || []).size rows.each do |row| raise ErrDimensionMismatch, "row size differs (#{row.size} should be #{size})" unless row.size == size end new rows, size end
Creates an n
by n
diagonal matrix where each diagonal element is value
.
Matrix.scalar(2, 5) # => 5 0 # 0 5
# File matrix.rb, line 161 def Matrix.scalar(n, value) diagonal(*Array.new(n, value)) end
Create a matrix by stacking matrices vertically
x = Matrix[[1, 2], [3, 4]] y = Matrix[[5, 6], [7, 8]] Matrix.vstack(x, y) # => Matrix[[1, 2], [3, 4], [5, 6], [7, 8]]
# File matrix.rb, line 241 def Matrix.vstack(x, *matrices) x = CoercionHelper.coerce_to_matrix(x) result = x.send(:rows).map(&:dup) matrices.each do |m| m = CoercionHelper.coerce_to_matrix(m) if m.column_count != x.column_count raise ErrDimensionMismatch, "The given matrices must have #{x.column_count} columns, but one has #{m.column_count}" end result.concat(m.send(:rows)) end new result, x.column_count end
Creates a zero matrix.
Matrix.zero(2) # => 0 0 # 0 0
# File matrix.rb, line 185 def Matrix.zero(row_count, column_count = row_count) rows = Array.new(row_count){Array.new(column_count, 0)} new rows, column_count end
Public Instance Methods
Matrix
multiplication.
Matrix[[2,4], [6,8]] * Matrix.identity(2) # => 2 4 # 6 8
# File matrix.rb, line 1058 def *(m) # m is matrix or vector or number case(m) when Numeric new_rows = @rows.collect {|row| row.collect {|e| e * m } } return new_matrix new_rows, column_count when Vector m = self.class.column_vector(m) r = self * m return r.column(0) when Matrix raise ErrDimensionMismatch if column_count != m.row_count m_rows = m.rows new_rows = rows.map do |row_i| Array.new(m.column_count) do |j| vij = 0 column_count.times do |k| vij += row_i[k] * m_rows[k][j] end vij end end return new_matrix new_rows, m.column_count else return apply_through_coercion(m, __method__) end end
Matrix
exponentiation. Equivalent to multiplying the matrix by itself N times. Non integer exponents will be handled by diagonalizing the matrix.
Matrix[[7,6], [3,9]] ** 2 # => 67 96 # 48 99
# File matrix.rb, line 1237 def **(exp) case exp when Integer case when exp == 0 _make_sure_it_is_invertible = inverse self.class.identity(column_count) when exp < 0 inverse.power_int(-exp) else power_int(exp) end when Numeric v, d, v_inv = eigensystem v * self.class.diagonal(*d.each(:diagonal).map{|e| e ** exp}) * v_inv else raise ErrOperationNotDefined, ["**", self.class, exp.class] end end
Matrix
addition.
Matrix.scalar(2,5) + Matrix[[1,0], [-4,7]] # => 6 0 # -4 12
# File matrix.rb, line 1093 def +(m) case m when Numeric raise ErrOperationNotDefined, ["+", self.class, m.class] when Vector m = self.class.column_vector(m) when Matrix else return apply_through_coercion(m, __method__) end raise ErrDimensionMismatch unless row_count == m.row_count && column_count == m.column_count rows = Array.new(row_count) {|i| Array.new(column_count) {|j| self[i, j] + m[i, j] } } new_matrix rows, column_count end
# File matrix.rb, line 1283 def +@ self end
Matrix
subtraction.
Matrix[[1,5], [4,2]] - Matrix[[9,3], [-4,1]] # => -8 2 # 8 1
# File matrix.rb, line 1120 def -(m) case m when Numeric raise ErrOperationNotDefined, ["-", self.class, m.class] when Vector m = self.class.column_vector(m) when Matrix else return apply_through_coercion(m, __method__) end raise ErrDimensionMismatch unless row_count == m.row_count && column_count == m.column_count rows = Array.new(row_count) {|i| Array.new(column_count) {|j| self[i, j] - m[i, j] } } new_matrix rows, column_count end
Unary matrix negation.
-Matrix[[1,5], [4,2]] # => -1 -5 # -4 -2
# File matrix.rb, line 1292 def -@ collect {|e| -e } end
Matrix
division (multiplication by the inverse).
Matrix[[7,6], [3,9]] / Matrix[[2,9], [3,1]] # => -7 1 # -3 -6
# File matrix.rb, line 1147 def /(other) case other when Numeric rows = @rows.collect {|row| row.collect {|e| e / other } } return new_matrix rows, column_count when Matrix return self * other.inverse else return apply_through_coercion(other, __method__) end end
Returns true
if and only if the two matrices contain equal elements.
# File matrix.rb, line 1021 def ==(other) return false unless Matrix === other && column_count == other.column_count # necessary for empty matrices rows == other.rows end
Returns element (i
,j
) of the matrix. That is: row i
, column j
.
# File matrix.rb, line 337 def [](i, j) @rows.fetch(i){return nil}[j] end
Set element or elements of matrix.
# File matrix.rb, line 351 def []=(i, j, v) raise FrozenError, "can't modify frozen Matrix" if frozen? rows = check_range(i, :row) or row = check_int(i, :row) columns = check_range(j, :column) or column = check_int(j, :column) if rows && columns set_row_and_col_range(rows, columns, v) elsif rows set_row_range(rows, column, v) elsif columns set_col_range(row, columns, v) else set_value(row, column, v) end end
Returns the absolute value elementwise
# File matrix.rb, line 1299 def abs collect(&:abs) end
Returns the adjoint of the matrix.
Matrix[ [i,1],[2,-i] ].adjoint # => -i 2 # 1 i
# File matrix.rb, line 1566 def adjoint conjugate.transpose end
Returns the adjugate of the matrix.
Matrix[ [7,6],[3,9] ].adjugate # => 9 -6 # -3 7
# File matrix.rb, line 793 def adjugate raise ErrDimensionMismatch unless square? Matrix.build(row_count, column_count) do |row, column| cofactor(column, row) end end
Returns true
if this is an antisymmetric matrix. Raises an error if matrix is not square.
# File matrix.rb, line 973 def antisymmetric? raise ErrDimensionMismatch unless square? each_with_index(:upper) do |e, row, col| return false unless e == -rows[col][row] end true end
The coerce method provides support for Ruby type coercion. This coercion mechanism is used by Ruby to handle mixed-type numeric operations: it is intended to find a compatible common type between the two operands of the operator. See also Numeric#coerce.
# File matrix.rb, line 1619 def coerce(other) case other when Numeric return Scalar.new(other), self else raise TypeError, "#{self.class} can't be coerced into #{other.class}" end end
Returns the (row, column) cofactor which is obtained by multiplying the first minor by (-1)**(row + column).
Matrix.diagonal(9, 5, -3, 4).cofactor(1, 1) # => -108
# File matrix.rb, line 778 def cofactor(row, column) raise RuntimeError, "cofactor of empty matrix is not defined" if empty? raise ErrDimensionMismatch unless square? det_of_minor = first_minor(row, column).determinant det_of_minor * (-1) ** (row + column) end
Returns a matrix that is the result of iteration of the given block over all elements of the matrix. Elements can be restricted by passing an argument:
-
:all (default): yields all elements
-
:diagonal: yields only elements on the diagonal
-
:off_diagonal: yields all elements except on the diagonal
-
:lower: yields only elements on or below the diagonal
-
:strict_lower: yields only elements below the diagonal
-
:strict_upper: yields only elements above the diagonal
-
:upper: yields only elements on or above the diagonal Matrix[ [1,2], [3,4] ].collect { |e| e**2 } # => 1 4 # 9 16
# File matrix.rb, line 508 def collect(which = :all, &block) # :yield: e return to_enum(:collect, which) unless block_given? dup.collect!(which, &block) end
Invokes the given block for each element of matrix, replacing the element with the value returned by the block. Elements can be restricted by passing an argument:
-
:all (default): yields all elements
-
:diagonal: yields only elements on the diagonal
-
:off_diagonal: yields all elements except on the diagonal
-
:lower: yields only elements on or below the diagonal
-
:strict_lower: yields only elements below the diagonal
-
:strict_upper: yields only elements above the diagonal
-
:upper: yields only elements on or above the diagonal
# File matrix.rb, line 526 def collect!(which = :all) return to_enum(:collect!, which) unless block_given? raise FrozenError, "can't modify frozen Matrix" if frozen? each_with_index(which){ |e, row_index, col_index| @rows[row_index][col_index] = yield e } end
Returns column vector number j
of the matrix as a Vector
(starting at 0 like an array). When a block is given, the elements of that vector are iterated.
# File matrix.rb, line 477 def column(j) # :yield: e if block_given? return self if j >= column_count || j < -column_count row_count.times do |i| yield @rows[i][j] end self else return nil if j >= column_count || j < -column_count col = Array.new(row_count) {|i| @rows[i][j] } Vector.elements(col, false) end end
Returns an array of the column vectors of the matrix. See Vector
.
# File matrix.rb, line 1640 def column_vectors Array.new(column_count) {|i| column(i) } end
Creates new matrix by combining with other_matrices entrywise, using the given block.
x = Matrix[[6, 6], [4, 4]] y = Matrix[[1, 2], [3, 4]] x.combine(y) {|a, b| a - b} # => Matrix[[5, 4], [1, 0]]
# File matrix.rb, line 315 def combine(*matrices, &block) Matrix.combine(self, *matrices, &block) end
Returns the conjugate of the matrix.
Matrix[[Complex(1,2), Complex(0,1), 0], [1, 2, 3]] # => 1+2i i 0 # 1 2 3 Matrix[[Complex(1,2), Complex(0,1), 0], [1, 2, 3]].conjugate # => 1-2i -i 0 # 1 2 3
# File matrix.rb, line 1554 def conjugate collect(&:conjugate) end
Returns the determinant of the matrix.
Beware that using Float values can yield erroneous results because of their lack of precision. Consider using exact types like Rational or BigDecimal instead.
Matrix[[7,6], [3,9]].determinant # => 45
# File matrix.rb, line 1317 def determinant raise ErrDimensionMismatch unless square? m = @rows case row_count # Up to 4x4, give result using Laplacian expansion by minors. # This will typically be faster, as well as giving good results # in case of Floats when 0 +1 when 1 + m[0][0] when 2 + m[0][0] * m[1][1] - m[0][1] * m[1][0] when 3 m0, m1, m2 = m + m0[0] * m1[1] * m2[2] - m0[0] * m1[2] * m2[1] \ - m0[1] * m1[0] * m2[2] + m0[1] * m1[2] * m2[0] \ + m0[2] * m1[0] * m2[1] - m0[2] * m1[1] * m2[0] when 4 m0, m1, m2, m3 = m + m0[0] * m1[1] * m2[2] * m3[3] - m0[0] * m1[1] * m2[3] * m3[2] \ - m0[0] * m1[2] * m2[1] * m3[3] + m0[0] * m1[2] * m2[3] * m3[1] \ + m0[0] * m1[3] * m2[1] * m3[2] - m0[0] * m1[3] * m2[2] * m3[1] \ - m0[1] * m1[0] * m2[2] * m3[3] + m0[1] * m1[0] * m2[3] * m3[2] \ + m0[1] * m1[2] * m2[0] * m3[3] - m0[1] * m1[2] * m2[3] * m3[0] \ - m0[1] * m1[3] * m2[0] * m3[2] + m0[1] * m1[3] * m2[2] * m3[0] \ + m0[2] * m1[0] * m2[1] * m3[3] - m0[2] * m1[0] * m2[3] * m3[1] \ - m0[2] * m1[1] * m2[0] * m3[3] + m0[2] * m1[1] * m2[3] * m3[0] \ + m0[2] * m1[3] * m2[0] * m3[1] - m0[2] * m1[3] * m2[1] * m3[0] \ - m0[3] * m1[0] * m2[1] * m3[2] + m0[3] * m1[0] * m2[2] * m3[1] \ + m0[3] * m1[1] * m2[0] * m3[2] - m0[3] * m1[1] * m2[2] * m3[0] \ - m0[3] * m1[2] * m2[0] * m3[1] + m0[3] * m1[2] * m2[1] * m3[0] else # For bigger matrices, use an efficient and general algorithm. # Currently, we use the Gauss-Bareiss algorithm determinant_bareiss end end
deprecated; use Matrix#determinant
# File matrix.rb, line 1398 def determinant_e warn "Matrix#determinant_e is deprecated; use #determinant", uplevel: 1 determinant end
Returns true
if this is a diagonal matrix. Raises an error if matrix is not square.
# File matrix.rb, line 839 def diagonal? raise ErrDimensionMismatch unless square? each(:off_diagonal).all?(&:zero?) end
Yields all elements of the matrix, starting with those of the first row, or returns an Enumerator if no block given. Elements can be restricted by passing an argument:
-
:all (default): yields all elements
-
:diagonal: yields only elements on the diagonal
-
:off_diagonal: yields all elements except on the diagonal
-
:lower: yields only elements on or below the diagonal
-
:strict_lower: yields only elements below the diagonal
-
:strict_upper: yields only elements above the diagonal
-
:upper: yields only elements on or above the diagonal
Matrix[ [1,2], [3,4] ].each { |e| puts e } # => prints the numbers 1 to 4 Matrix[ [1,2], [3,4] ].each(:strict_lower).to_a # => [3]
# File matrix.rb, line 556 def each(which = :all, &block) # :yield: e return to_enum :each, which unless block_given? last = column_count - 1 case which when :all @rows.each do |row| row.each(&block) end when :diagonal @rows.each_with_index do |row, row_index| yield row.fetch(row_index){return self} end when :off_diagonal @rows.each_with_index do |row, row_index| column_count.times do |col_index| yield row[col_index] unless row_index == col_index end end when :lower @rows.each_with_index do |row, row_index| 0.upto([row_index, last].min) do |col_index| yield row[col_index] end end when :strict_lower @rows.each_with_index do |row, row_index| [row_index, column_count].min.times do |col_index| yield row[col_index] end end when :strict_upper @rows.each_with_index do |row, row_index| (row_index+1).upto(last) do |col_index| yield row[col_index] end end when :upper @rows.each_with_index do |row, row_index| row_index.upto(last) do |col_index| yield row[col_index] end end else raise ArgumentError, "expected #{which.inspect} to be one of :all, :diagonal, :off_diagonal, :lower, :strict_lower, :strict_upper or :upper" end self end
Same as each
, but the row index and column index in addition to the element
Matrix[ [1,2], [3,4] ].each_with_index do |e, row, col| puts "#{e} at #{row}, #{col}" end # => Prints: # 1 at 0, 0 # 2 at 0, 1 # 3 at 1, 0 # 4 at 1, 1
# File matrix.rb, line 616 def each_with_index(which = :all) # :yield: e, row, column return to_enum :each_with_index, which unless block_given? last = column_count - 1 case which when :all @rows.each_with_index do |row, row_index| row.each_with_index do |e, col_index| yield e, row_index, col_index end end when :diagonal @rows.each_with_index do |row, row_index| yield row.fetch(row_index){return self}, row_index, row_index end when :off_diagonal @rows.each_with_index do |row, row_index| column_count.times do |col_index| yield row[col_index], row_index, col_index unless row_index == col_index end end when :lower @rows.each_with_index do |row, row_index| 0.upto([row_index, last].min) do |col_index| yield row[col_index], row_index, col_index end end when :strict_lower @rows.each_with_index do |row, row_index| [row_index, column_count].min.times do |col_index| yield row[col_index], row_index, col_index end end when :strict_upper @rows.each_with_index do |row, row_index| (row_index+1).upto(last) do |col_index| yield row[col_index], row_index, col_index end end when :upper @rows.each_with_index do |row, row_index| row_index.upto(last) do |col_index| yield row[col_index], row_index, col_index end end else raise ArgumentError, "expected #{which.inspect} to be one of :all, :diagonal, :off_diagonal, :lower, :strict_lower, :strict_upper or :upper" end self end
Returns the Eigensystem of the matrix; see EigenvalueDecomposition
.
m = Matrix[[1, 2], [3, 4]] v, d, v_inv = m.eigensystem d.diagonal? # => true v.inv == v_inv # => true (v * d * v_inv).round(5) == m # => true
# File matrix.rb, line 1521 def eigensystem EigenvalueDecomposition.new(self) end
Deprecated.
Use map(&:to_f)
# File matrix.rb, line 1663 def elements_to_f warn "Matrix#elements_to_f is deprecated, use map(&:to_f)", uplevel: 1 map(&:to_f) end
Deprecated.
Use map(&:to_i)
# File matrix.rb, line 1671 def elements_to_i warn "Matrix#elements_to_i is deprecated, use map(&:to_i)", uplevel: 1 map(&:to_i) end
Deprecated.
Use map(&:to_r)
# File matrix.rb, line 1679 def elements_to_r warn "Matrix#elements_to_r is deprecated, use map(&:to_r)", uplevel: 1 map(&:to_r) end
Returns true
if this is an empty matrix, i.e. if the number of rows or the number of columns is 0.
# File matrix.rb, line 848 def empty? column_count == 0 || row_count == 0 end
# File matrix.rb, line 1027 def eql?(other) return false unless Matrix === other && column_count == other.column_count # necessary for empty matrices rows.eql? other.rows end
Returns the submatrix obtained by deleting the specified row and column.
Matrix.diagonal(9, 5, -3, 4).first_minor(1, 2) # => 9 0 0 # 0 0 0 # 0 0 4
# File matrix.rb, line 751 def first_minor(row, column) raise RuntimeError, "first_minor of empty matrix is not defined" if empty? unless 0 <= row && row < row_count raise ArgumentError, "invalid row (#{row.inspect} for 0..#{row_count - 1})" end unless 0 <= column && column < column_count raise ArgumentError, "invalid column (#{column.inspect} for 0..#{column_count - 1})" end arrays = to_a arrays.delete_at(row) arrays.each do |array| array.delete_at(column) end new_matrix arrays, column_count - 1 end
# File matrix.rb, line 534 def freeze @rows.each(&:freeze).freeze super end
Hadamard product
Matrix[[1,2], [3,4]].hadamard_product(Matrix[[1,2], [3,2]]) # => 1 4 # 9 8
# File matrix.rb, line 1167 def hadamard_product(m) combine(m){|a, b| a * b} end
Returns a hash-code for the matrix.
# File matrix.rb, line 1044 def hash @rows.hash end
Returns true
if this is an hermitian matrix. Raises an error if matrix is not square.
# File matrix.rb, line 856 def hermitian? raise ErrDimensionMismatch unless square? each_with_index(:upper).all? do |e, row, col| e == rows[col][row].conj end end
Returns a new matrix resulting by stacking horizontally the receiver with the given matrices
x = Matrix[[1, 2], [3, 4]] y = Matrix[[5, 6], [7, 8]] x.hstack(y) # => Matrix[[1, 2, 5, 6], [3, 4, 7, 8]]
# File matrix.rb, line 1412 def hstack(*matrices) self.class.hstack(self, *matrices) end
Returns the imaginary part of the matrix.
Matrix[[Complex(1,2), Complex(0,1), 0], [1, 2, 3]] # => 1+2i i 0 # 1 2 3 Matrix[[Complex(1,2), Complex(0,1), 0], [1, 2, 3]].imaginary # => 2i i 0 # 0 0 0
# File matrix.rb, line 1579 def imaginary collect(&:imaginary) end
The index method is specialized to return the index as [row, column] It also accepts an optional selector
argument, see each
for details.
Matrix[ [1,2], [3,4] ].index(&:even?) # => [0, 1] Matrix[ [1,1], [1,1] ].index(1, :strict_lower) # => [1, 0]
# File matrix.rb, line 679 def index(*args) raise ArgumentError, "wrong number of arguments(#{args.size} for 0-2)" if args.size > 2 which = (args.size == 2 || SELECTORS.include?(args.last)) ? args.pop : :all return to_enum :find_index, which, *args unless block_given? || args.size == 1 if args.size == 1 value = args.first each_with_index(which) do |e, row_index, col_index| return row_index, col_index if e == value end else each_with_index(which) do |e, row_index, col_index| return row_index, col_index if yield e end end nil end
Overrides Object#inspect
# File matrix.rb, line 1704 def inspect if empty? "#{self.class}.empty(#{row_count}, #{column_count})" else "#{self.class}#{@rows.inspect}" end end
Returns the inverse of the matrix.
Matrix[[-1, -1], [0, -1]].inverse # => -1 1 # 0 -1
# File matrix.rb, line 1178 def inverse raise ErrDimensionMismatch unless square? self.class.I(row_count).send(:inverse_from, self) end
Returns the Laplace expansion along given row or column.
Matrix[[7,6], [3,9]].laplace_expansion(column: 1) # => 45 Matrix[[Vector[1, 0], Vector[0, 1]], [2, 3]].laplace_expansion(row: 0) # => Vector[3, -2]
# File matrix.rb, line 810 def laplace_expansion(row: nil, column: nil) num = row || column if !num || (row && column) raise ArgumentError, "exactly one the row or column arguments must be specified" end raise ErrDimensionMismatch unless square? raise RuntimeError, "laplace_expansion of empty matrix is not defined" if empty? unless 0 <= num && num < row_count raise ArgumentError, "invalid num (#{num.inspect} for 0..#{row_count - 1})" end send(row ? :row : :column, num).map.with_index { |e, k| e * cofactor(*(row ? [num, k] : [k,num])) }.inject(:+) end
Returns true
if this is a lower triangular matrix.
# File matrix.rb, line 866 def lower_triangular? each(:strict_upper).all?(&:zero?) end
Returns the LUP decomposition of the matrix; see LUPDecomposition
.
a = Matrix[[1, 2], [3, 4]] l, u, p = a.lup l.lower_triangular? # => true u.upper_triangular? # => true p.permutation? # => true l * u == p * a # => true a.lup.solve([2, 5]) # => Vector[(1/1), (1/2)]
# File matrix.rb, line 1536 def lup LUPDecomposition.new(self) end
Returns a section of the matrix. The parameters are either:
-
start_row, nrows, start_col, ncols; OR
-
row_range, col_range
Matrix.diagonal(9, 5, -3).minor(0..1, 0..2) # => 9 0 0 # 0 5 0
Like Array#[], negative indices count backward from the end of the row or column (-1 is the last element). Returns nil if the starting row or column is greater than row_count
or column_count
respectively.
# File matrix.rb, line 710 def minor(*param) case param.size when 2 row_range, col_range = param from_row = row_range.first from_row += row_count if from_row < 0 to_row = row_range.end to_row += row_count if to_row < 0 to_row += 1 unless row_range.exclude_end? size_row = to_row - from_row from_col = col_range.first from_col += column_count if from_col < 0 to_col = col_range.end to_col += column_count if to_col < 0 to_col += 1 unless col_range.exclude_end? size_col = to_col - from_col when 4 from_row, size_row, from_col, size_col = param return nil if size_row < 0 || size_col < 0 from_row += row_count if from_row < 0 from_col += column_count if from_col < 0 else raise ArgumentError, param.inspect end return nil if from_row > row_count || from_col > column_count || from_row < 0 || from_col < 0 rows = @rows[from_row, size_row].collect{|row| row[from_col, size_col] } new_matrix rows, [column_count - from_col, size_col].min end
Returns true
if this is a normal matrix. Raises an error if matrix is not square.
# File matrix.rb, line 874 def normal? raise ErrDimensionMismatch unless square? rows.each_with_index do |row_i, i| rows.each_with_index do |row_j, j| s = 0 rows.each_with_index do |row_k, k| s += row_i[k] * row_j[k].conj - row_k[i].conj * row_k[j] end return false unless s == 0 end end true end
Returns true
if this is an orthogonal matrix Raises an error if matrix is not square.
# File matrix.rb, line 892 def orthogonal? raise ErrDimensionMismatch unless square? rows.each_with_index do |row_i, i| rows.each_with_index do |row_j, j| s = 0 row_count.times do |k| s += row_i[k] * row_j[k] end return false unless s == (i == j ? 1 : 0) end end true end
Returns true
if this is a permutation matrix Raises an error if matrix is not square.
# File matrix.rb, line 911 def permutation? raise ErrDimensionMismatch unless square? cols = Array.new(column_count) rows.each_with_index do |row, i| found = false row.each_with_index do |e, j| if e == 1 return false if found || cols[j] found = cols[j] = true elsif e != 0 return false end end return false unless found end true end
Returns the rank of the matrix. Beware that using Float values can yield erroneous results because of their lack of precision. Consider using exact types like Rational or BigDecimal instead.
Matrix[[7,6], [3,9]].rank # => 2
# File matrix.rb, line 1425 def rank # We currently use Bareiss' multistep integer-preserving gaussian elimination # (see comments on determinant) a = to_a last_column = column_count - 1 last_row = row_count - 1 pivot_row = 0 previous_pivot = 1 0.upto(last_column) do |k| switch_row = (pivot_row .. last_row).find {|row| a[row][k] != 0 } if switch_row a[switch_row], a[pivot_row] = a[pivot_row], a[switch_row] unless pivot_row == switch_row pivot = a[pivot_row][k] (pivot_row+1).upto(last_row) do |i| ai = a[i] (k+1).upto(last_column) do |j| ai[j] = (pivot * ai[j] - ai[k] * a[pivot_row][j]) / previous_pivot end end pivot_row += 1 previous_pivot = pivot end end pivot_row end
deprecated; use Matrix#rank
# File matrix.rb, line 1456 def rank_e warn "Matrix#rank_e is deprecated; use #rank", uplevel: 1 rank end
Returns the real part of the matrix.
Matrix[[Complex(1,2), Complex(0,1), 0], [1, 2, 3]] # => 1+2i i 0 # 1 2 3 Matrix[[Complex(1,2), Complex(0,1), 0], [1, 2, 3]].real # => 1 0 0 # 1 2 3
# File matrix.rb, line 1593 def real collect(&:real) end
Returns true
if all entries of the matrix are real.
# File matrix.rb, line 932 def real? all?(&:real?) end
Returns an array containing matrices corresponding to the real and imaginary parts of the matrix
m.rect == [m.real, m.imag] # ==> true for all matrices m
# File matrix.rb, line 1603 def rect [real, imag] end
Returns true
if this is a regular (i.e. non-singular) matrix.
# File matrix.rb, line 939 def regular? not singular? end
Returns a matrix with entries rounded to the given precision (see Float#round)
# File matrix.rb, line 1464 def round(ndigits=0) map{|e| e.round(ndigits)} end
Returns row vector number i
of the matrix as a Vector
(starting at 0 like an array). When a block is given, the elements of that vector are iterated.
# File matrix.rb, line 463 def row(i, &block) # :yield: e if block_given? @rows.fetch(i){return self}.each(&block) self else Vector.elements(@rows.fetch(i){return nil}) end end
Returns the number of rows.
# File matrix.rb, line 448 def row_count @rows.size end
Returns an array of the row vectors of the matrix. See Vector
.
# File matrix.rb, line 1631 def row_vectors Array.new(row_count) {|i| row(i) } end
Returns true
if this is a singular matrix.
# File matrix.rb, line 946 def singular? determinant == 0 end
Returns true
if this is a square matrix.
# File matrix.rb, line 953 def square? column_count == row_count end
Returns true
if this is a symmetric matrix. Raises an error if matrix is not square.
# File matrix.rb, line 961 def symmetric? raise ErrDimensionMismatch unless square? each_with_index(:strict_upper) do |e, row, col| return false if e != rows[col][row] end true end
Returns an array of arrays that describe the rows of the matrix.
# File matrix.rb, line 1656 def to_a @rows.collect(&:dup) end
Explicit conversion to a Matrix
. Returns self
# File matrix.rb, line 1649 def to_matrix self end
Overrides Object#to_s
# File matrix.rb, line 1691 def to_s if empty? "#{self.class}.empty(#{row_count}, #{column_count})" else "#{self.class}[" + @rows.collect{|row| "[" + row.collect{|e| e.to_s}.join(", ") + "]" }.join(", ")+"]" end end
Returns the trace (sum of diagonal elements) of the matrix.
Matrix[[7,6], [3,9]].trace # => 16
# File matrix.rb, line 1473 def trace raise ErrDimensionMismatch unless square? (0...column_count).inject(0) do |tr, i| tr + @rows[i][i] end end
Returns the transpose of the matrix.
Matrix[[1,2], [3,4], [5,6]] # => 1 2 # 3 4 # 5 6 Matrix[[1,2], [3,4], [5,6]].transpose # => 1 3 5 # 2 4 6
# File matrix.rb, line 1491 def transpose return self.class.empty(column_count, 0) if row_count.zero? new_matrix @rows.transpose, row_count end
Returns true
if this is a unitary matrix Raises an error if matrix is not square.
# File matrix.rb, line 986 def unitary? raise ErrDimensionMismatch unless square? rows.each_with_index do |row_i, i| rows.each_with_index do |row_j, j| s = 0 row_count.times do |k| s += row_i[k].conj * row_j[k] end return false unless s == (i == j ? 1 : 0) end end true end
Returns true
if this is an upper triangular matrix.
# File matrix.rb, line 1003 def upper_triangular? each(:strict_lower).all?(&:zero?) end
Returns a new matrix resulting by stacking vertically the receiver with the given matrices
x = Matrix[[1, 2], [3, 4]] y = Matrix[[5, 6], [7, 8]] x.vstack(y) # => Matrix[[1, 2], [3, 4], [5, 6], [7, 8]]
# File matrix.rb, line 1505 def vstack(*matrices) self.class.vstack(self, *matrices) end
Returns true
if this is a matrix with only zero elements
# File matrix.rb, line 1010 def zero? all?(&:zero?) end
Protected Instance Methods
# File matrix.rb, line 1257 def power_int(exp) # assumes `exp` is an Integer > 0 # # Previous algorithm: # build M**2, M**4 = (M**2)**2, M**8, ... and multiplying those you need # e.g. M**0b1011 = M**11 = M * M**2 * M**8 # ^ ^ # (highlighted the 2 out of 5 multiplications involving `M * x`) # # Current algorithm has same number of multiplications but with lower exponents: # M**11 = M * (M * M**4)**2 # ^ ^ ^ # (highlighted the 3 out of 5 multiplications involving `M * x`) # # This should be faster for all (non nil-potent) matrices. case when exp == 1 self when exp.odd? self * power_int(exp - 1) else sqrt = power_int(exp / 2) sqrt * sqrt end end
Private Instance Methods
# File matrix.rb, line 376 def check_int(val, direction) count = direction == :row ? row_count : column_count CoercionHelper.check_int(val, count, direction) end
Returns range or nil
# File matrix.rb, line 370 def check_range(val, direction) return unless val.is_a?(Range) count = direction == :row ? row_count : column_count CoercionHelper.check_range(val, count, direction) end
Private. Use Matrix#determinant
Returns the determinant of the matrix, using Bareiss’ multistep integer-preserving gaussian elimination. It has the same computational cost order O(n^3) as standard Gaussian elimination. Intermediate results are fraction free and of lower complexity. A matrix of Integers will have thus intermediate results that are also Integers, with smaller bignums (if any), while a matrix of Float will usually have intermediate results with better precision.
# File matrix.rb, line 1368 def determinant_bareiss size = row_count last = size - 1 a = to_a no_pivot = Proc.new{ return 0 } sign = +1 pivot = 1 size.times do |k| previous_pivot = pivot if (pivot = a[k][k]) == 0 switch = (k+1 ... size).find(no_pivot) {|row| a[row][k] != 0 } a[switch], a[k] = a[k], a[switch] pivot = a[k][k] sign = -sign end (k+1).upto(last) do |i| ai = a[i] (k+1).upto(last) do |j| ai[j] = (pivot * ai[j] - ai[k] * a[k][j]) / previous_pivot end end end sign * pivot end
Called for dup & clone.
# File matrix.rb, line 1036 def initialize_copy(m) super @rows = @rows.map(&:dup) unless frozen? end
# File matrix.rb, line 432 def set_col_range(row, col_range, value) value = if value.is_a?(Vector) value.to_a elsif value.is_a?(Matrix) raise ErrDimensionMismatch unless value.row_count == 1 value.row(0).to_a else Array.new(col_range.size, value) end raise ErrDimensionMismatch unless col_range.size == value.size @rows[row][col_range] = value end
# File matrix.rb, line 425 def set_column_vector(row_range, col, value) value.each_with_index do |e, index| r = row_range.begin + index @rows[r][col] = e end end
# File matrix.rb, line 387 def set_row_and_col_range(row_range, col_range, value) if value.is_a?(Matrix) if row_range.size != value.row_count || col_range.size != value.column_count raise ErrDimensionMismatch, [ 'Expected a Matrix of dimensions', "#{row_range.size}x#{col_range.size}", 'got', "#{value.row_count}x#{value.column_count}", ].join(' ') end source = value.instance_variable_get :@rows row_range.each_with_index do |row, i| @rows[row][col_range] = source[i] end elsif value.is_a?(Vector) raise ErrDimensionMismatch, 'Expected a Matrix or a value, got a Vector' else value_to_set = Array.new(col_range.size, value) row_range.each do |i| @rows[i][col_range] = value_to_set end end end
# File matrix.rb, line 411 def set_row_range(row_range, col, value) if value.is_a?(Vector) raise ErrDimensionMismatch unless row_range.size == value.size set_column_vector(row_range, col, value) elsif value.is_a?(Matrix) raise ErrDimensionMismatch unless value.column_count == 1 value = value.column(0) raise ErrDimensionMismatch unless row_range.size == value.size set_column_vector(row_range, col, value) else @rows[row_range].each{|e| e[col] = value } end end
# File matrix.rb, line 381 def set_value(row, col, value) raise ErrDimensionMismatch, "Expected a a value, got a #{value.class}" if value.respond_to?(:to_matrix) @rows[row][col] = value end