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package lacaml
Module D.Vec
type t = vecVector operations
Creation of vectors
val random :
?rnd_state:Random.State.t ->
?from:float ->
?range:float ->
int ->
vecrandom ?rnd_state ?from ?range n
Unary vector operations
val abs : unopabs ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the absolute value of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val signum : unopsignum ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the sign value (-1 for negative numbers, 0 (or -0) for zero, 1 for positive numbers, nan for nan) of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val sqr : unopsqr ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the square of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val sqrt : unopsqrt ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the square root of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val cbrt : unopcbrt ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the cubic root of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val exp : unopexp ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the exponential of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val exp2 : unopexp2 ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the base-2 exponential of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val expm1 : unopexpm1 ?n ?ofsy ?incy ?y ?ofsx ?incx x computes exp x -. 1. for n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val log : unoplog ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the logarithm of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val log10 : unoplog10 ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the base-10 logarithm of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val log2 : unoplog2 ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the base-2 logarithm of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val log1p : unoplog1p ?n ?ofsy ?incy ?y ?ofsx ?incx x computes log (1 + x) for n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val sin : unopsin ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the sine of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val cos : unopcos ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the cosine of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val tan : unoptan ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the tangent of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val asin : unopasin ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the arc sine of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val acos : unopacos ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the arc cosine of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val atan : unopatan ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the arc tangent of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val sinh : unopsinh ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the hyperbolic sine of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val cosh : unopcosh ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the hyperbolic cosine of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val tanh : unoptanh ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the hyperbolic tangent of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val asinh : unopasinh ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the hyperbolic arc sine of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val acosh : unopcosh ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the hyperbolic arc cosine of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val atanh : unopatanh ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the hyperbolic arc tangent of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val floor : unopfloor ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the floor of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val ceil : unopceil ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the ceiling of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val round : unopround ?n ?ofsy ?incy ?y ?ofsx ?incx x rounds the n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val trunc : unoptrunc ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the truncation of the n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val erf : unoperf ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the error function for n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val erfc : unoperfc ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the complementary error function for n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val logistic : unoplogistic ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the logistict function 1/(1 + exp(-a) for n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val relu : unoprelu ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the rectified linear unit function max(x, 0) for n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val softplus : unopsoftplus ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the softplus function log(1 + exp(x) for n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val softsign : unopsoftsign ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the softsign function x / (1 + abs(x)) for n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
Binary vector operations
val pow : binoppow ?n ?ofsz ?incz ?z ?ofsx ?incx x ?ofsy ?incy y computes pow(a, b) of n elements of vectors x and y elementwise, using incx and incy as incremental steps respectively. If z is given, the result will be stored in there using increments of incz, otherwise a fresh vector will be used. The resulting vector is returned.
val atan2 : binopatan2 ?n ?ofsz ?incz ?z ?ofsx ?incx x ?ofsy ?incy y computes atan2(x, y) of n elements of vectors x and y elementwise, using incx and incy as incremental steps respectively. If z is given, the result will be stored in there using increments of incz, otherwise a fresh vector will be used. The resulting vector is returned.
NOTE: WARNING! From a geometric point of view, the atan2 function takes the y-coordinate in x and the x-coordinate in y. This confusion is a sad consequence of the C99-standard reversing the argument order for atan2 for no good reason.
val hypot : binophypot ?n ?ofsz ?incz ?z ?ofsx ?incx x ?ofsy ?incy y computes sqrt(x*x + y*y) of n elements of vectors x and y elementwise, using incx and incy as incremental steps respectively. If z is given, the result will be stored in there using increments of incz, otherwise a fresh vector will be used. The resulting vector is returned.
val min2 : binopmin2 ?n ?ofsz ?incz ?z ?ofsx ?incx x ?ofsy ?incy y computes the minimum of n elements of vectors x and y elementwise, using incx and incy as incremental steps respectively. If z is given, the result will be stored in there using increments of incz, otherwise a fresh vector will be used. The resulting vector is returned.
val max2 : binopmax2 ?n ?ofsz ?incz ?z ?ofsx ?incx x ?ofsy ?incy y computes the maximum of n elements of vectors x and y elementwise, using incx and incy as incremental steps respectively. If z is given, the result will be stored in there using increments of incz, otherwise a fresh vector will be used. The resulting vector is returned.
Miscellaneous functions
val log_sum_exp : ?n:int -> ?ofsx:int -> ?incx:int -> vec -> floatlog_sum_exp ?n ?ofsx ?incx x computes the logarithm of the sum of exponentials of the n elements in vector x, separated by incx incremental steps.
Creation/conversion of vectors and dimension accessor
val create : int -> veccreate n
val make : int -> float -> vecmake n x
val make0 : int -> vecmake0 n x
val init : int -> (int -> float) -> vecinit n f
val of_array : float array -> vecof_array ar
val to_array : vec -> float arrayto_array v
val of_list : float list -> vecof_list l
val to_list : vec -> float listto_list v
val empty : vecempty, the empty vector.
val dim : vec -> intdim x
val has_zero_dim : vec -> boolhas_zero_dim vec checks whether vector vec has a dimension of size zero. In this case it cannot contain data.
Iterators over vectors
val map :
(float -> float) ->
?n:int ->
?ofsy:int ->
?incy:int ->
?y:vec ->
?ofsx:int ->
?incx:int ->
vec ->
vecmap f ?n ?ofsx ?incx x
val iter : (float -> unit) -> ?n:int -> ?ofsx:int -> ?incx:int -> vec -> unititer ?n ?ofsx ?incx f x applies function f in turn to all elements of vector x.
val iteri :
(int -> float -> unit) ->
?n:int ->
?ofsx:int ->
?incx:int ->
vec ->
unititeri ?n ?ofsx ?incx f x same as iter but additionally passes the index of the element as first argument and the element itself as second argument.
val fold :
('a -> float -> 'a) ->
'a ->
?n:int ->
?ofsx:int ->
?incx:int ->
vec ->
'afold f a ?n ?ofsx ?incx x is f (... (f (f a x.{ofsx}) x.{ofsx + incx}) ...) x.{ofsx + (n-1)*incx} if incx > 0 and the same in the reverse order of appearance of the x values if incx < 0.
Operations on one vector
val max : ?n:int -> ?ofsx:int -> ?incx:int -> vec -> floatmax ?n ?ofsx ?incx x computes the greater of the n elements in vector x (2-norm), separated by incx incremental steps. NaNs are ignored. If only NaNs are encountered, the negative infinity value will be returned.
val min : ?n:int -> ?ofsx:int -> ?incx:int -> vec -> floatmin ?n ?ofsx ?incx x computes the smaller of the n elements in vector x (2-norm), separated by incx incremental steps. NaNs are ignored. If only NaNs are encountered, the infinity value will be returned.
val sort :
?cmp:(float -> float -> int) ->
?decr:bool ->
?n:int ->
?ofsp:int ->
?incp:int ->
?p:(int, Bigarray.int_elt, Bigarray.fortran_layout) Bigarray.Array1.t ->
?ofsx:int ->
?incx:int ->
vec ->
unitsort ?cmp ?n ?ofsx ?incx x sorts the array x in increasing order according to the comparison function cmp.
val fill : ?n:int -> ?ofsx:int -> ?incx:int -> vec -> float -> unitfill ?n ?ofsx ?incx x a fills vector x with value a in the designated range.
val sum : ?n:int -> ?ofsx:int -> ?incx:int -> vec -> floatsum ?n ?ofsx ?incx x computes the sum of the n elements in vector x, separated by incx incremental steps.
val prod : ?n:int -> ?ofsx:int -> ?incx:int -> vec -> floatprod ?n ?ofsx ?incx x computes the product of the n elements in vector x, separated by incx incremental steps.
val add_const : float -> unopadd_const c ?n ?ofsy ?incy ?y ?ofsx ?incx x adds constant c to the n elements of vector x and stores the result in y, using incx and incy as incremental steps respectively. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val sqr_nrm2 : ?stable:bool -> ?n:int -> ?ofsx:int -> ?incx:int -> vec -> floatsqr_nrm2 ?stable ?n ?c ?ofsx ?incx x computes the square of the 2-norm (Euclidean norm) of vector x separated by incx incremental steps. If stable is true, this is equivalent to squaring the result of calling the BLAS-function nrm2, which avoids over- and underflow if possible. If stable is false (default), dot will be called instead for greatly improved performance.
val ssqr : ?n:int -> ?c:float -> ?ofsx:int -> ?incx:int -> vec -> floatssqr ?n ?c ?ofsx ?incx x computes the sum of squared differences of the n elements in vector x from constant c, separated by incx incremental steps. Please do not confuse with sqr_nrm2! The current function behaves differently with complex numbers when zero is passed in for c. It computes the square for each entry then, whereas sqr_nrm2 uses the conjugate transpose in the product. The latter will therefore always return a real number.
val neg : unopneg ?n ?ofsy ?incy ?y ?ofsx ?incx x negates n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
val reci : unopreci ?n ?ofsy ?incy ?y ?ofsx ?incx x computes the reciprocal value of n elements of the vector x using incx as incremental steps. If y is given, the result will be stored in there using increments of incy, otherwise a fresh vector will be used. The resulting vector is returned.
Operations on two vectors
val add : binopadd ?n ?ofsz ?incz ?z ?ofsx ?incx x ?ofsy ?incy y adds n elements of vectors x and y elementwise, using incx and incy as incremental steps respectively. If z is given, the result will be stored in there using increments of incz, otherwise a fresh vector will be used. The resulting vector is returned.
val sub : binopsub ?n ?ofsz ?incz ?z ?ofsx ?incx x ?ofsy ?incy y subtracts n elements of vectors x and y elementwise, using incx and incy as incremental steps respectively. If z is given, the result will be stored in there using increments of incz, otherwise a fresh vector will be used. The resulting vector is returned.
val mul : binopmul ?n ?ofsz ?incz ?z ?ofsx ?incx x ?ofsy ?incy y multiplies n elements of vectors x and y elementwise, using incx and incy as incremental steps respectively. If z is given, the result will be stored in there using increments of incz, otherwise a fresh vector will be used. The resulting vector is returned.
val div : binopdiv ?n ?ofsz ?incz ?z ?ofsx ?incx x ?ofsy ?incy y divides n elements of vectors x and y elementwise, using incx and incy as incremental steps respectively. If z is given, the result will be stored in there using increments of incz, otherwise a fresh vector will be used. The resulting vector is returned.
val zpxy :
?n:int ->
?ofsz:int ->
?incz:int ->
vec ->
?ofsx:int ->
?incx:int ->
vec ->
?ofsy:int ->
?incy:int ->
vec ->
unitzpxy ?n ?ofsz ?incz z ?ofsx ?incx x ?ofsy ?incy y multiplies n elements of vectors x and y elementwise, using incx and incy as incremental steps respectively, and adds the result to and stores it in the specified range in z. This function is useful for convolutions.
val zmxy :
?n:int ->
?ofsz:int ->
?incz:int ->
vec ->
?ofsx:int ->
?incx:int ->
vec ->
?ofsy:int ->
?incy:int ->
vec ->
unitzmxy ?n ?ofsz ?incz z ?ofsx ?incx x ?ofsy ?incy y multiplies n elements of vectors x and y elementwise, using incx and incy as incremental steps respectively, and substracts the result from and stores it in the specified range in z. This function is useful for convolutions.