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It appears to me that std::copy_if would be very useful for filtering containers:

std::vector<int> vec { 1, 2, 3, 4 };
auto itEnd = std::copy_if(vec.begin(), vec.end(), vec.begin(),
                          [](int i) { return i > 2; });
vec.resize(itEnd - vec.begin());

However, std::copy_if is specified that the input and output ranges may not overlap.

Is there an alternative?

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Wouldn't remove_if solve your problem much more nicely? –  Kerrek SB Mar 25 '14 at 10:05

1 Answer 1

up vote 19 down vote accepted

copy_if is primarily for copying a range to another range/container I.e. by design, the nature of the algorithm is to copy the elements satisfying some condition to another (non-overlapping) range or to a new container.

remove_if is more appropriate for what you need; it is exactly for filtering out as you expect. However, it only removes the elements by overwriting; the remnants between the old and new ends would be unspecified elements after the function's completion and needs to be manually erased using erase, like so:

std::vector<int> vec { 1, 2, 3, 4 };
                         [](int i) { return i <= 2; }),

This is a C++ idiom that goes by the name erase-remove.

Instead of copy_if, if copy was what you wanted, then you've an alternative for overlapping ranges, namely copy_backward; from the documentation

If d_first is within [first, last), std::copy_backward must be used instead of std::copy.

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Your last paragraph is incorrect: There won't be a shift of all elements after each remove (which would result in O(n^2) performance). The performance will be linear, similar to that of copy_if. –  interjay Mar 25 '14 at 10:23
@BenjaminLindley Can you show a reference for that? Looking into [alg.remove], I see "Complexity: Exactly last - first applications of the corresponding predicate." No mention of the number of copy/move operations. –  Angew Mar 25 '14 at 10:32
@legends2k The possible implementations you linked are linear time, and do not act as you said. –  interjay Mar 25 '14 at 10:34
@Angew: You provided the reference yourself. The standard is tying the complexity to the number of applications of the predicate. So unless the cost of copying and moving is precisely zero, the implication is obviously that the number of copy/move operations is either directly proportional to that number, or less. It cannot be of a greater complexity than linear, otherwise that is how they would define the complexity. –  Benjamin Lindley Mar 25 '14 at 10:37
@BenjaminLindley Good point, I somehow failed to consider this reading of the text. –  Angew Mar 25 '14 at 10:55

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