package owl

N-dimensional array type, i.e. Bigarray Genarray type.

``empty m n`` creates an ``m`` by ``n`` matrix without initialising the values of elements in ``x``.

``create m n a`` creates an ``m`` by ``n`` matrix and all the elements of ``x`` are initialised with the value ``a``.

``init m n f`` creates a matrix ``x`` of shape ``m x n``, then using ``f`` to initialise the elements in ``x``. The input of ``f`` is 1-dimensional index of the matrix. You need to explicitly convert it if you need 2D index. The function ``Owl_utils.ind`` can help you.

``init_2d m n f`` s almost the same as ``init`` but ``f`` receives 2D index as input. It is more convenient since you don't have to convert the index by yourself, but this also means ``init_2d`` is slower than ``init``.

``zeros m n`` creates an ``m`` by ``n`` matrix where all the elements are initialised to zeros.

``ones m n`` creates an ``m`` by ``n`` matrix where all the elements are ones.

``eye m`` creates an ``m`` by ``m`` identity matrix.

``complex re im`` constructs a complex ndarray/matrix from ``re`` and ``im``. ``re`` and ``im`` contain the real and imaginary part of ``x`` respectively.

Note that both ``re`` and ``im`` can be complex but must have same type. The real part of ``re`` will be the real part of ``x`` and the imaginary part of ``im`` will be the imaginary part of ``x``.

``complex rho theta`` constructs a complex ndarray/matrix from polar coordinates ``rho`` and ``theta``. ``rho`` contains the magnitudes and ``theta`` contains phase angles. Note that the behaviour is undefined if ``rho`` has negative elelments or ``theta`` has infinity elelments.

``sequential ~a ~step m n`` creates an ``m`` by ``n`` matrix. The elements in ``x`` are initialised sequentiallly from ``~a`` and is increased by ``~step``.

The default value of ``~a`` is zero whilst the default value of ``~step`` is one.

``uniform m n`` creates an ``m`` by ``n`` matrix where all the elements follow a uniform distribution in ``(0,1)`` interval. ``uniform ~scale:a m n`` adjusts the interval to ``(0,a)``.

``gaussian m n`` creates an ``m`` by ``n`` matrix where all the elements in ``x`` follow a Gaussian distribution with specified sigma. By default ``sigma = 1``.

`` semidef n `` returns an random ``n`` by ``n`` positive semi-definite matrix.

``linspace a b n`` linearly divides the interval ``a,b`` into ``n`` pieces by creating an ``m`` by ``1`` row vector. E.g., ``linspace 0. 5. 5`` will create a row vector ``0;1;2;3;4;5``.

``logspace base a b n`` ... the default value of base is ``e``.

``meshgrid a1 b1 a2 b2 n1 n2`` is similar to the ``meshgrid`` function in Matlab. It returns two matrices ``x`` and ``y`` where the row vectors in ``x`` are linearly spaced between ``a1,b1`` by ``n1`` whilst the column vectors in ``y`` are linearly spaced between ``(a2,b2)`` by ``n2``.

``meshup x y`` creates mesh grids by using two row vectors ``x`` and ``y``.

``bernoulli k ~p:0.3 m n``

``diagm k v`` creates a diagonal matrix using the elements in ``v`` as diagonal values. ``k`` specifies the main diagonal index. If ``k > 0`` then it is above the main diagonal, if ``k < 0`` then it is below the main diagonal. This function is the same as the ``diag`` function in Matlab.

``triu k x`` returns the element on and above the ``k``th diagonal of ``x``. ``k = 0`` is the main diagonal, ``k > 0`` is above the main diagonal, and ``k < 0`` is below the main diagonal.

``tril k x`` returns the element on and below the ``k``th diagonal of ``x``. ``k = 0`` is the main diagonal, ``k > 0`` is above the main diagonal, and ``k < 0`` is below the main diagonal.

``symmetric ~upper x`` creates a symmetric matrix using either upper or lower triangular part of ``x``. If ``upper`` is ``true`` then it uses the upper part, if ``upper`` is ``false``, then ``symmetric`` uses the lower part. By default ``upper`` is true.

``hermitian ~upper x`` creates a hermitian matrix based on ``x``. By default, the upper triangular part is used for creating the hermitian matrix, but you use the lower part by setting ``upper=false``

``bidiagonal upper dv ev`` creates a bidiagonal matrix using ``dv`` and ``ev``. Both ``dv`` and ``ev`` are row vectors. ``dv`` is the main diagonal. If ``upper`` is ``true`` then ``ev`` is superdiagonal; if ``upper`` is ``false`` then ``ev`` is subdiagonal. By default, ``upper`` is ``true``.

NOTE: because the diagonal elements in a hermitian matrix must be real, the function set the imaginary part of the diagonal elements to zero by default. In other words, if the diagonal elements of ``x`` have non-zero imaginary parts, the imaginary parts will be dropped without a warning.

``toeplitz ~c r`` generates a toeplitz matrix using ``r`` and ``c``. Both ``r`` and ``c`` are row vectors of the same length. If the first elements of ``c`` is different from that of ``r``, ``r``'s first element will be used.

Note: 1) If ``c`` is not passed in, then ``c = r`` will be used. 2) If ``c`` is not passed in and ``r`` is complex, the ``c = conj r`` will be used. 3) If ``r`` and ``c`` have different length, then the result is a rectangular matrix.

``hankel ~r c`` generates a hankel matrix using ``r`` and ``c``. ``c`` will be the first column and ``r`` will be the last row of the returned matrix.

Note: 1) If only ``c`` is passed in, the elelments below the anti-diagnoal are zero. 2) If the last element of ``c`` is different from the first element of ``r`` then the first element of ``c`` prevails. 3) ``c`` and ``r`` can have different length, the return will be an rectangular matrix.

``hadamard k n`` constructs a hadamard matrix of order ``n``. For a hadamard ``H``, we have ``H'*H = n*I``. Currrently, this function handles only the cases where ``n``, ``n/12``, or ``n/20`` is a power of 2.

``magic k n`` constructs a ``n x n`` magic square matrix ``x``. The elements in ``x`` are consecutive numbers increasing from ``1`` to ``n^2``. ``n`` must ``n >= 3``.

There are three different algorithms to deal with ``n`` is odd, singly even, and doubly even respectively.

If ``x`` is an ``m`` by ``n`` matrix, ``shape x`` returns ``(m,n)``, i.e., the size of two dimensions of ``x``.

``row_num x`` returns the number of rows in matrix ``x``.

``col_num x`` returns the number of columns in matrix ``x``.

``numel x`` returns the number of elements in matrix ``x``. It is equivalent to ``(row_num x) * (col_num x)``.

``nnz x`` returns the number of non-zero elements in ``x``.

``density x`` returns the percentage of non-zero elements in ``x``.

``size_in_bytes x`` returns the size of ``x`` in bytes in memory.

``same_shape x y`` returns ``true`` if two matrics have the same shape.

Refer to :doc:`owl_dense_ndarray_generic`.

``kind x`` returns the type of matrix ``x``.

``get x i j`` returns the value of element ``(i,j)`` of ``x``. The shorthand for ``get x i j`` is ``x.,j``

``set x i j a`` sets the element ``(i,j)`` of ``x`` to value ``a``. The shorthand for ``set x i j a`` is ``x.,j <- a``

``get_index i x`` returns an array of element values specified by the indices ``i``. The length of array ``i`` equals the number of dimensions of ``x``. The arrays in ``i`` must have the same length, and each represents the indices in that dimension.

E.g., ``| [|1;2|]; [|3;4|] |`` returns the value of elements at position ``(1,3)`` and ``(2,4)`` respectively.

``set_index`` sets the value of elements in ``x`` according to the indices specified by ``i``. The length of array ``i`` equals the number of dimensions of ``x``. The arrays in ``i`` must have the same length, and each represents the indices in that dimension.

``get_fancy s x`` returns a copy of the slice in ``x``. The slice is defined by ``a`` which is an ``int array``. Please refer to the same function in the ``Owl_dense_ndarray_generic`` documentation for more details.

``set_fancy axis x y`` set the slice defined by ``axis`` in ``x`` according to the values in ``y``. ``y`` must have the same shape as the one defined by ``axis``.

About the slice definition of ``axis``, please refer to ``slice`` function.

``get_slice axis x`` aims to provide a simpler version of ``get_fancy``. This function assumes that every list element in the passed in ``in list list`` represents a range, i.e., ``R`` constructor.

E.g., ``[];[0;3];[0]`` is equivalent to ``R []; R [0;3]; R [0]``.

``set_slice axis x y`` aims to provide a simpler version of ``set_slice``. This function assumes that every list element in the passed in ``in list list`` represents a range, i.e., ``R`` constructor.

E.g., ``[];[0;3];[0]`` is equivalent to ``R []; R [0;3]; R [0]``.

``row x i`` returns row ``i`` of ``x``. Note: Unlike ``col``, the return value is simply a view onto the original row in ``x``, so modifying ``row``'s value also alters ``x``.

The function supports nagative indices.

``col x j`` returns column ``j`` of ``x``. Note: Unlike ``row``, the return value is a copy of the original row in ``x``.

The function supports nagative indices.

``rows x a`` returns the rows (defined in an int array ``a``) of ``x``. The returned rows will be combined into a new dense matrix. The order of rows in the new matrix is the same as that in the array ``a``.

The function supports nagative indices.

Similar to ``rows``, ``cols x a`` returns the columns (specified in array ``a``) of x in a new dense matrix.

The function supports nagative indices.

``resize x s`` please refer to the Ndarray document.

``reshape x s`` returns a new ``m`` by ``n`` matrix from the ``m'`` by ``n'`` matrix ``x``. Note that ``(m * n)`` must be equal to ``(m' * n')``, and the returned matrix shares the same memory with the original ``x``.

``flatten x`` reshape ``x`` into a ``1`` by ``n`` row vector without making a copy. Therefore the returned value shares the same memory space with original ``x``.

``reverse x`` reverse the order of all elements in the flattened ``x`` and returns the results in a new matrix. The original ``x`` remains intact.

``flip ~axis x`` flips a matrix/ndarray along ``axis``. By default ``axis = 0``. The result is returned in a new matrix/ndarray, so the original ``x`` remains intact.

``rotate x d`` rotates ``x`` clockwise ``d`` degrees. ``d`` must be multiple times of ``90``, otherwise the function will fail. If ``x`` is an n-dimensional array, then the function rotates the plane formed by the first and second dimensions.

``reset x`` resets all the elements of ``x`` to zero value.

``fill x a`` fills the ``x`` with value ``a``.

``copy x`` returns a copy of matrix ``x``.

``copy_row_to v x i`` copies an ``1`` by ``n`` row vector ``v`` to the ``ith`` row in an ``m`` by ``n`` matrix ``x``.

``copy_col_to v x j`` copies an ``1`` by ``n`` column vector ``v`` to the ``jth`` column in an ``m`` by ``n`` matrix ``x``.

``concat_vertical x y`` concats two matrices ``x`` and ``y`` vertically, therefore their column numbers must be the same.

The associated operator is ``@=``, please refer to :doc:`owl_operator`.

``concat_horizontal x y`` concats two matrices ``x`` and ``y`` horizontally, therefore their row numbers must be the same.

The associated operator is ``@||``, please refer to :doc:`owl_operator`.

``concat_vh`` is used to assemble small parts of matrices into a bigger one. E.g. ``| [|a; b; c|]; [|d; e; f|]; [|g; h; i|] |`` will be concatenated into a big matrix as follows.

Please refer to :doc:`owl_dense_ndarray_generic`. for details.

``concatenate ~axis:1 x`` concatenates an array of matrices along the second dimension. For the matrices in ``x``, they must have the same shape except the dimension specified by ``axis``. The default value of ``axis`` is 0, i.e., the lowest dimension on a marix, i.e., rows.

``split ~axis parts x`` splits an ndarray ``x`` into parts along the specified ``axis``. This function is the inverse operation of ``concatenate``. The elements in ``x`` must sum up to the dimension in the specified axis.

Please refer to :doc:`owl_dense_ndarray_generic`. for details.

``transpose x`` transposes an ``m`` by ``n`` matrix to ``n`` by ``m`` one.

``ctranspose x`` performs conjugate transpose of a complex matrix ``x``. If ``x`` is a real matrix, then ``ctranspose x`` is equivalent to ``transpose x``.

``diag k x`` returns the ``k``th diagonal elements of ``x``. ``k > 0`` means above the main diagonal and ``k < 0`` means the below the main diagonal.

``swap_rows x i i'`` swaps the row ``i`` with row ``i'`` of ``x``.

``swap_cols x j j'`` swaps the column ``j`` with column ``j'`` of ``x``.

``tile x a`` provides the exact behaviour as ``numpy.tile`` function.

``repeat x a`` repeats the elements ``x`` according the repetition specified by ``a``.

``padd ~v:0. [1;1] x``

``dropout ~rate:0.3 x`` drops out 30% of the elements in ``x``, in other words, by setting their values to zeros.

``top x n`` returns the indices of ``n`` greatest values of ``x``. The indices are arranged according to the corresponding element values, from the greatest one to the smallest one.

``bottom x n`` returns the indices of ``n`` smallest values of ``x``. The indices are arranged according to the corresponding element values, from the smallest one to the greatest one.

``sort x`` performs quicksort of the elelments in ``x``. A new copy is returned as result, the original ``x`` remains intact. If you want to perform in-place sorting, please use `sort_` instead.

``argsort x`` returns the indices with which the elements in ``x`` are sorted in increasing order. Note that the returned index ndarray has the same shape as that of ``x``, and the indices are 1D indices.

``iteri f x`` iterates all the elements in ``x`` and applies the user defined function ``f : int -> int -> float -> 'a``. ``f i j v`` takes three parameters, ``i`` and ``j`` are the coordinates of current element, and ``v`` is its value.

``iter f x`` is the same as as ``iteri f x`` except the coordinates of the current element is not passed to the function ``f : float -> 'a``

``mapi f x`` maps each element in ``x`` to a new value by applying ``f : int -> int -> float -> float``. The first two parameters are the coordinates of the element, and the third parameter is the value.

``map f x`` is similar to ``mapi f x`` except the coordinates of the current element is not passed to the function ``f : float -> float``

``foldi ~axis f a x`` folds (or reduces) the elements in ``x`` from left along the specified ``axis`` using passed in function ``f``. ``a`` is the initial element and in ``f i acc b`` ``acc`` is the accumulater and ``b`` is one of the elemets in ``x`` along the same axis. Note that ``i`` is 1d index of ``b``.

Similar to ``foldi``, except that the index of an element is not passed to ``f``.

``scan ~axis f x`` scans the ``x`` along the specified ``axis`` using passed in function ``f``. ``f acc a b`` returns an updated ``acc`` which will be passed in the next call to ``f i acc a``. This function can be used to implement accumulative operations such as ``sum`` and ``prod`` functions. Note that the ``i`` is 1d index of ``a`` in ``x``.

Similar to ``scani``, except that the index of an element is not passed to ``f``.

``filteri f x`` uses ``f : int -> int -> float -> bool`` to filter out certain elements in ``x``. An element will be included if ``f`` returns ``true``. The returned result is a list of coordinates of the selected elements.

Similar to ``filteri``, but the coordinates of the elements are not passed to the function ``f : float -> bool``.

Similar to `iteri` but 2d indices ``(i,j)`` are passed to the user function.

Similar to `mapi` but 2d indices ``(i,j)`` are passed to the user function.

Similar to `foldi` but 2d indices ``(i,j)`` are passed to the user function.

Similar to `scani` but 2d indices ``(i,j)`` are passed to the user function.

Similar to `filteri` but 2d indices ``(i,j)`` are returned.

Similar to `iter2i` but 2d indices ``(i,j)`` are passed to the user function.

Similar to `map2i` but 2d indices ``(i,j)`` are passed to the user function.

Similar to ``iteri`` but applies to two matrices ``x`` and ``y``. Both ``x`` and ``y`` must have the same shape.

Similar to ``iter2i``, except that the index is not passed to ``f``.

``map2i f x y`` applies ``f`` to two elements of the same position in both ``x`` and ``y``. Note that 1d index is passed to funciton ``f``.

``map2 f x y`` is similar to ``map2i f x y`` except the index is not passed.

``iteri_rows f x`` iterates every row in ``x`` and applies function ``f : int -> mat -> unit`` to each of them.

Similar to ``iteri_rows`` except row number is not passed to ``f``.

``iter2_rows f x y`` iterates rows of two matrices ``x`` and ```y``.

Similar to ``iter2iter2i_rows`` but without passing in indices.

``iteri_cols f x`` iterates every column in ``x`` and applies function ``f : int -> mat -> unit`` to each of them. Column number is passed to ``f`` as the first parameter.

Similar to ``iteri_cols`` except col number is not passed to ``f``.

``filteri_rows f x`` uses function ``f : int -> mat -> bool`` to check each row in ``x``, then returns an int array containing the indices of those rows which satisfy the function ``f``.

Similar to ``filteri_rows`` except that the row indices are not passed to ``f``.

``filteri_cols f x`` uses function ``f : int -> mat -> bool`` to check each column in ``x``, then returns an int array containing the indices of those columns which satisfy the function ``f``.

Similar to ``filteri_cols`` except that the column indices are not passed to ``f``.

``fold_rows f a x`` folds all the rows in ``x`` using function ``f``. The order of folding is from the first row to the last one.

``fold_cols f a x`` folds all the columns in ``x`` using function ``f``. The order of folding is from the first column to the last one.

``mapi_rows f x`` maps every row in ``x`` to a type ``'a`` value by applying function ``f : int -> mat -> 'a`` to each of them. The results is an array of all the returned values.

Similar to ``mapi_rows`` except row number is not passed to ``f``.

``mapi_cols f x`` maps every column in ``x`` to a type ``'a`` value by applying function ``f : int -> mat -> 'a``.

Similar to ``mapi_cols`` except column number is not passed to ``f``.

``mapi_by_row d f x`` applies ``f`` to each row of a ``m`` by ``n`` matrix ``x``, then uses the returned ``d`` dimensional row vectors to assemble a new ``m`` by ``d`` matrix.

``map_by_row d f x`` is similar to ``mapi_by_row`` except that the row indices are not passed to ``f``.

``mapi_by_col d f x`` applies ``f`` to each column of a ``m`` by ``n`` matrix ``x``, then uses the returned ``d`` dimensional column vectors to assemble a new ``d`` by ``n`` matrix.

``map_by_col d f x`` is similar to ``mapi_by_col`` except that the column indices are not passed to ``f``.

``mapi_at_row f x i`` creates a new matrix by applying function ``f`` only to the ``i``th row in matrix ``x``.

``map_at_row f x i`` is similar to ``mapi_at_row`` except that the coordinates of an element is not passed to ``f``.

``mapi_at_col f x j`` creates a new matrix by applying function ``f`` only to the ``j``th column in matrix ``x``.

``map_at_col f x i`` is similar to ``mapi_at_col`` except that the coordinates of an element is not passed to ``f``.

``exists f x`` checks all the elements in ``x`` using ``f``. If at least one element satisfies ``f`` then the function returns ``true`` otherwise ``false``.