Книга: Standard Template Library Programmer
adjacent_difference
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adjacent_difference
Category: algorithms
Component type: function
Prototype
Adjacent_difference is an overloaded name; there are actually two adjacent_difference functions.
template <class InputIterator, class OutputIterator>
OutputIterator adjacent_difference(InputIterator first, InputIterator last, OutputIterator result);
template <class InputIterator, class OutputIterator, class BinaryFunction>
OutputIterator adjacent_difference(InputIterator first, InputIterator last, OutputIterator result, BinaryFunction binary_op);
Description
Adjacent_difference calculates the differences of adjacent elements in the range [first, last). This is, *first is assigned to *result[1], and, for each iterator i in the range [first + 1, last), the difference of *i and *(i – 1) is assigned to *(result + (i – first)). [2]
The first version of adjacent_difference uses operator- to calculate differences, and the second version uses a user-supplied binary function. In the first version, for each iterator i in the range [first + 1, last), *i – *(i – 1) is assigned to *(result + (i – first)). In the second version, the value that is assigned to *(result + 1) is instead binary_op(*i, *(i – 1)).
Definition
Defined in the standard header numeric, and in the nonstandard backward-compatibility header algo.h.
Requirements on types
For the first version:
• ForwardIterator is a model of Forward Iterator.
• OutputIterator is a model of Output Iterator.
• If x and y are objects of ForwardIterator's value type, then x – y is defined.
• InputIterator's value type is convertible to a type in OutputIterator's set of value types.
• The return type of x – y is convertible to a type in OutputIterator's set of value types. For the second version:
• ForwardIterator is a model of Forward Iterator.
• OutputIterator is a model of Output Iterator.
• BinaryFunction is a model of Binary Function.
• InputIterator's value type is convertible to a BinaryFunction's first argument type and second argument type.
• InputIterator's value type is convertible to a type in OutputIterator's set of value types.
• BinaryFunction's result type is convertible to a type in OutputIterator's set of value types.
Preconditions
• [first, last) is a valid range.
• [result, result + (last – first)) is a valid range.
Complexity
Linear. Zero applications of the binary operation if [first, last) is an empty range, otherwise exactly (last – first) – 1 applications.
Example
int main() {
int A[] = {1, 4, 9, 16, 25, 36, 49, 64, 81, 100};
const int N = sizeof(A) / sizeof(int);
int B[N];
cout << "A[]: ";
copy(A, A + N, ostream_iterator<int>(cout, " "));
cout << endl;
adjacent_difference(A, A + N, B);
cout << "Differences: ";
copy(B, B + N, ostream_iterator<int>(cout, " "));
cout << endl;
cout << "Reconstruct: ";
partial_sum(B, B + N, ostream_iterator<int>(cout, " "));
cout << endl;
}
Notes
[1] The reason it is useful to store the value of the first element, as well as simply storing the differences, is that this provides enough information to reconstruct the input range. In particular, if addition and subtraction have the usual arithmetic definitions, then adjacent_difference and partial_sum are inverses of each other.
[2] Note that result is permitted to be the same iterator as first. This is useful for computing differences "in place".
See also
partial_sum, accumulate, inner_product, count
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