(***********************************************************************) (* *) (* OCaml *) (* *) (* Xavier Leroy, projet Cristal, INRIA Rocquencourt *) (* *) (* Copyright 1996 Institut National de Recherche en Informatique et *) (* en Automatique. All rights reserved. This file is distributed *) (* under the terms of the GNU Library General Public License, with *) (* the special exception on linking described in file ../LICENSE. *) (* *) (***********************************************************************) (** Sets over ordered types. This module implements the set data structure, given a total ordering function over the set elements. All operations over sets are purely applicative (no side-effects). The implementation uses balanced binary trees, and is therefore reasonably efficient: insertion and membership take time logarithmic in the size of the set, for instance. The [Make] functor constructs implementations for any type, given a [compare] function. For instance: {[ module IntPairs = struct type t = int * int let compare (x0,y0) (x1,y1) = match Pervasives.compare x0 x1 with 0 -> Pervasives.compare y0 y1 | c -> c end module PairsSet = Set.Make(IntPairs) let m = PairsSet.(empty |> add (2,3) |> add (5,7) |> add (11,13)) ]} This creates a new module [PairsSet], with a new type [PairsSet.t] of sets of [int * int]. *) module type OrderedType = sig type t (** The type of the set elements. *) val compare : t -> t -> int (** A total ordering function over the set elements. This is a two-argument function [f] such that [f e1 e2] is zero if the elements [e1] and [e2] are equal, [f e1 e2] is strictly negative if [e1] is smaller than [e2], and [f e1 e2] is strictly positive if [e1] is greater than [e2]. Example: a suitable ordering function is the generic structural comparison function {!Pervasives.compare}. *) end (** Input signature of the functor {!Set.Make}. *) module type S = sig type elt (** The type of the set elements. *) type t (** The type of sets. *) val empty: t (** The empty set. *) val is_empty: t -> bool (** Test whether a set is empty or not. *) val mem: elt -> t -> bool (** [mem x s] tests whether [x] belongs to the set [s]. *) val add: elt -> t -> t (** [add x s] returns a set containing all elements of [s], plus [x]. If [x] was already in [s], [s] is returned unchanged (the result of the function is then physically equal to [s]). @before 4.03 Physical equality was not ensured. *) val singleton: elt -> t (** [singleton x] returns the one-element set containing only [x]. *) val remove: elt -> t -> t (** [remove x s] returns a set containing all elements of [s], except [x]. If [x] was not in [s], [s] is returned unchanged (the result of the function is then physically equal to [s]). @before 4.03 Physical equality was not ensured. *) val union: t -> t -> t (** Set union. *) val inter: t -> t -> t (** Set intersection. *) val diff: t -> t -> t (** Set difference. *) val compare: t -> t -> int (** Total ordering between sets. Can be used as the ordering function for doing sets of sets. *) val equal: t -> t -> bool (** [equal s1 s2] tests whether the sets [s1] and [s2] are equal, that is, contain equal elements. *) val subset: t -> t -> bool (** [subset s1 s2] tests whether the set [s1] is a subset of the set [s2]. *) val iter: (elt -> unit) -> t -> unit (** [iter f s] applies [f] in turn to all elements of [s]. The elements of [s] are presented to [f] in increasing order with respect to the ordering over the type of the elements. *) val fold: (elt -> 'a -> 'a) -> t -> 'a -> 'a (** [fold f s a] computes [(f xN ... (f x2 (f x1 a))...)], where [x1 ... xN] are the elements of [s], in increasing order. *) val for_all: (elt -> bool) -> t -> bool (** [for_all p s] checks if all elements of the set satisfy the predicate [p]. *) val exists: (elt -> bool) -> t -> bool (** [exists p s] checks if at least one element of the set satisfies the predicate [p]. *) val filter: (elt -> bool) -> t -> t (** [filter p s] returns the set of all elements in [s] that satisfy predicate [p]. If [p] satisfies every element in [s], [s] is returned unchanged (the result of the function is then physically equal to [s]). @before 4.03 Physical equality was not ensured.*) val partition: (elt -> bool) -> t -> t * t (** [partition p s] returns a pair of sets [(s1, s2)], where [s1] is the set of all the elements of [s] that satisfy the predicate [p], and [s2] is the set of all the elements of [s] that do not satisfy [p]. *) val cardinal: t -> int (** Return the number of elements of a set. *) val elements: t -> elt list (** Return the list of all elements of the given set. The returned list is sorted in increasing order with respect to the ordering [Ord.compare], where [Ord] is the argument given to {!Set.Make}. *) val min_elt: t -> elt (** Return the smallest element of the given set (with respect to the [Ord.compare] ordering), or raise [Not_found] if the set is empty. *) val max_elt: t -> elt (** Same as {!Set.S.min_elt}, but returns the largest element of the given set. *) val choose: t -> elt (** Return one element of the given set, or raise [Not_found] if the set is empty. Which element is chosen is unspecified, but equal elements will be chosen for equal sets. *) val split: elt -> t -> t * bool * t (** [split x s] returns a triple [(l, present, r)], where [l] is the set of elements of [s] that are strictly less than [x]; [r] is the set of elements of [s] that are strictly greater than [x]; [present] is [false] if [s] contains no element equal to [x], or [true] if [s] contains an element equal to [x]. *) val find: elt -> t -> elt (** [find x s] returns the element of [s] equal to [x] (according to [Ord.compare]), or raise [Not_found] if no such element exists. @since 4.01.0 *) val of_list: elt list -> t (** [of_list l] creates a set from a list of elements. This is usually more efficient than folding [add] over the list, except perhaps for lists with many duplicated elements. @since 4.02.0 *) end (** Output signature of the functor {!Set.Make}. *) module Make (Ord : OrderedType) : S with type elt = Ord.t (** Functor building an implementation of the set structure given a totally ordered type. *)