Tables

Most of the requirements on containers are presented in the ISO standard in the form of tables. In order to avoid massive duplication of effort while documenting all the classes, we follow the standard's lead and present the base information here. Individual classes will only document their departures from these tables (removed functions, additional functions, changes, etc).

We will not try to duplicate all of the surrounding text (footnotes, explanations, etc.) from the standard, because that would also entail a duplication of effort. Some of the surrounding text has been paraphrased here for clarity. If you are uncertain about the meaning or interpretation of these notes, consult a good textbook, and/or purchase your own copy of the standard (it's cheap, see our FAQ).

The table numbers are the same as those used in the standard. Tables can be jumped to using their number, e.g., "tables.html#67". Only Tables 65 through 69 are presented. Some of the active Defect Reports are also noted or incorporated.


Table 65 --- Container Requirements

Anything calling itself a container must meet these minimum requirements.
expression result type operational semantics notes, pre-/post-conditions, assertions complexity
X::value_type T   T is Assignable compile time
X::reference lvalue of T     compile time
X::const_reference const lvalue of T     compile time
X::iterator iterator type pointing to T   Any iterator category except output iterator. Convertible to X::const_iterator. compile time
X::const_iterator iterator type pointing to const T   Any iterator category except output iterator. compile time
X::difference_type signed integral type   identical to the difference type of X::iterator and X::const_iterator compile time
X::size_type unsigned integral type   size_type can represent any non-negative value of difference_type compile time
X u;     post: u.size() == 0 constant
X();     X().size == 0 constant
X(a);     a == X(a) linear
X u(a);
X u = a;
    post: u == a. Equivalent to: X u; u = a; linear
(&a)->~X(); void   dtor is applied to every element of a; all the memory is deallocated linear
a.begin() iterator; const_iterator for constant a     constant
a.end() iterator; const_iterator for constant a     constant
a == b convertible to bool   == is an equivalence relation. a.size()==b.size() && equal(a.begin(),a.end(),b.begin()) linear
a != b convertible to bool   equivalent to !(a==b) linear
a.swap(b) void   swap(a,b) may or may not have constant complexity
r = a X&   r == a linear
a.size() size_type a.end() - a.begin()   may or may not have constant complexity
a.max_size() size_type size() of the largest possible container   may or may not have constant complexity
a.empty() convertible to bool a.size() == 0   constant
a < b convertible to bool lexographical_compare( a.begin, a.end(), b.begin(), b.end()) pre: < is defined for T and is a total ordering relation linear
a > b convertible to bool b < a   linear
a <= b convertible to bool !(a > b)   linear
a >= b convertible to bool !(a < b)   linear

Table 66 --- Reversible Container Requirements

If a container's iterator is bidirectional or random-access, then the container also meets these requirements. Deque, list, vector, map, multimap, set, and multiset are such containers.
expression result type notes, pre-/post-conditions, assertions complexity
X::reverse_iterator iterator type pointing to T reverse_iterator<iterator> compile time
X::const_reverse_iterator iterator type pointing to const T reverse_iterator<const_iterator> compile time
a.rbegin() reverse_iterator; const_reverse_iterator for constant a reverse_iterator(end()) constant
a.rend() reverse_iterator; const_reverse_iterator for constant a reverse_iterator(begin()) constant

Table 67 --- Sequence Requirements

These are in addition to the requirements of containers. Deque, list, and vector are such containers.
expression result type notes, pre-/post-conditions, assertions
X(n,t)
X a(n,t)
  constructs a sequence with n copies of t
post: size() == n
X(i,j)
X a(i,j)
  constructs a sequence equal to the range [i,j)
post: size() == distance(i,j)
a.insert(p,t) iterator (points to the inserted copy of t) inserts a copy of t before p
a.insert(p,n,t) void inserts n copies of t before p
a.insert(p,i,j) void inserts copies of elements in [i,j) before p
pre: i, j are not iterators into a
a.erase(q) iterator (points to the element following q (prior to erasure)) erases the element pointed to by q
a.erase(q1,q1) iterator (points to the element pointed to by q2 (prior to erasure)) erases the elements in the range [q1,q2)
a.clear() void erase(begin(),end())
post: size() == 0

Table 68 --- Optional Sequence Operations

These operations are only included in containers when the operation can be done in constant time.
expression result type operational semantics container
a.front() reference; const_reference for constant a *a.begin() vector, list, deque
a.back() reference; const_reference for constant a *--a.end() vector, list, deque
a.push_front(x) void a.insert(a.begin(),x) list, deque
a.push_back(x) void a.insert(a.end(),x) vector, list, deque
a.pop_front() void a.erase(a.begin()) list, deque
a.pop_back() void a.erase(--a.end()) vector, list, deque
a[n] reference; const_reference for constant a *(a.begin() + n) vector, deque
a.at(n) reference; const_reference for constant a *(a.begin() + n)
throws out_of_range if n>=a.size()
vector, deque

Table 69 --- Associative Container Requirements

These are in addition to the requirements of containers. Map, multimap, set, and multiset are such containers. An associative container supports unique keys (and is written as a_uniq instead of a) if it may contain at most one element for each key. Otherwise it supports equivalent keys (and is written a_eq). Examples of the former are set and map, examples of the latter are multiset and multimap.
expression result type notes, pre-/post-conditions, assertions complexity
X::key_type Key Key is Assignable compile time
X::key_compare Compare defaults to less<key_type> compile time
X::value_compare a binary predicate type same as key_compare for set and multiset; an ordering relation on pairs induced by the first component (Key) for map and multimap compile time
X(c)
X a(c)
  constructs an empty container which uses c as a comparison object constant
X()
X a
  constructs an empty container using Compare() as a comparison object constant
X(i,j,c)
X a(i,j,c)
  constructs an empty container and inserts elements from the range [i,j) into it; uses c as a comparison object NlogN in general where N is distance(i,j); linear if [i,j) is sorted with value_comp()
X(i,j)
X a(i,j)
  same as previous, but uses Compare() as a comparison object same as previous
a.key_comp() X::key_compare returns the comparison object out of which a was constructed constant
a.value_comp() X::value_compare returns an object constructed out of the comparison object constant
a_uniq.insert(t) pair<iterator,bool> "Inserts t if and only if there is no element in the container with key equivalent to the key of t. The bool component of the returned pair is true -iff- the insertion took place, and the iterator component of the pair points to the element with key equivalent to the key of t." logarithmic
a_eq.insert(t) iterator inserts t, returns the iterator pointing to the inserted element logarithmic
a.insert(p,t) iterator possibly inserts t (depending on whether a_uniq or a_eq); returns iterator pointing to the element with key equivalent to the key of t; iterator p is a hint pointing to where the insert should start to search logarithmic in general, amortized constant if t is inserted right after p
[but see DR 233 and our specific notes]
a.insert(i,j) void pre: i, j are not iterators into a. possibly inserts each element from the range [i,j) (depending on whether a_uniq or a_eq) Nlog(size()+N) where N is distance(i,j) in general
a.erase(k) size_type erases all elements with key equivalent to k; returns number of erased elements log(size()) + count(k)
a.erase(q) void erases the element pointed to by q amortized constant
a.erase(q1,q2) void erases all the elements in the range [q1,q2) log(size()) + distance(q1,q2)
a.clear() void erases everything; post: size() == 0 linear
a.find(k) iterator; const_iterator for constant a returns iterator pointing to element with key equivalent to k, or a.end() if no such element found logarithmic
a.count(k) size_type returns number of elements with key equivalent to k log(size()) + count(k)
a.lower_bound(k) iterator; const_iterator for constant a returns iterator pointing to the first element with key not less than k logarithmic
a.upper_bound(k) iterator; const_iterator for constant a returns iterator pointing to the first element with key greater than k logarithmic
a.equal_range(k) pair<iterator,iterator>; pair<const_iterator, const_iterator> for constant a equivalent to make_pair(a.lower_bound(k), a.upper_bound(k)) logarithmic


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