# what are the fast algorithms to find duplicate elements in a collection and group them?

Say you have a collection of elements, how can you pick out those with duplicates and put them into each group with least amount of comparison? preferably in C++, but algorithm is more important than the language. For Example given {E1,E2,E3,E4,E4,E2,E6,E4,E3}, I wish to extract out {E2,E2}, {E3,E3}, {E4,E4,E4}. what data structure and algorithm you will choose? Please also include the cost of setting up the data structure, say, if it's a pre-sorted one like std::multimap

To make things clearer as suggested. there's one constraint: the elements must be compared by themselves to be certain they are duplicates.

So hashes do not apply, because virtually they shift the comparison to from heavy elements(e.g. chunks of data) to light elements(integers), and reduce some comparison, but not do away with them, and in the end, we are back to our original problem, when are inside one collision bucket.

Pretend you have a bunch of potentials duplicate files of GBs each, they bear the same hash value by every hash-algorithm human beings know. Now you are going to spot the real duplicates.

No, it can't be a real-life problem(even MD5 is enough to generate unique hash for real-life files). But just pretend so that we can focus on finding the data structure + algorithm that involves least amount of comparison.

What I am doing is to

1. represent into a STL std::list data structure(in that 1) its element-deletion is cheaper than, say, a vector 2) its insertion is cheaper, not requiring sort.)

2. pop out one element and compare it with the rest, if a duplicate is found, it's pulled out of the list. once the end of the list is reached, one group of duplication is found, if any.

3. repeat the above 2 steps until the list is empty.

It needs N-1 in the best case, but (N-1)! in the worse case.

what are the better alternatives?

My code using method explained above:

``````// algorithm to consume the std::list container,
// supports: list<path_type>,list< pair<std::string, paths_type::const_iterater>>
template<class T>
struct consume_list
{
groups_type operator()(list<T>& l)
{
// remove spurious identicals and group the rest
// algorithm:
// 1. compare the first element with the remaining elements,
//    pick out all duplicated files including the first element itself.
// 2. start over again with the shrinked list
//     until the list contains one or zero elements.

groups_type sub_groups;
group_type one_group;
one_group.reserve(1024);

while(l.size() > 1)
{
T front(l.front());
l.pop_front();

item_predicate<T> ep(front);
list<T>::iterator it     = l.begin();
list<T>::iterator it_end = l.end();
while(it != it_end)
{
if(ep.equals(*it))
{
one_group.push_back(ep.extract_path(*(it))); // single it out
it = l.erase(it);
}
else
{
it++;
}
}

// save results
if(!one_group.empty())
{
// save
one_group.push_back(ep.extract_path(front));
sub_groups.push_back(one_group);

// clear, memory allocation not freed
one_group.clear();
}
}
return sub_groups;
}
};

// type for item-item comparison within a stl container, e.g.  std::list
template <class T>
struct item_predicate{};

// specialization for type path_type
template <>
struct item_predicate<path_type>
{
public:
item_predicate(const path_type& base)/*init list*/
{}
public:
bool equals(const path_type& comparee)
{
bool  result;
/* time-consuming operations here*/
return result;
}

const path_type& extract_path(const path_type& p)
{
return p;
}
private:
// class members
};

};
``````

Thanks for the answer below, however they seem to be misled by my example that it's about integers. In fact the elements are type agnostic(not necessarily integers, strings or any other PODs), and the equal predicates are self-defined, that is the comparison can be very heavy.

So maybe my question should be: using which data structure + algorithm involves fewer comparisons.

Using a pre-sorted container like multiset, multimap is not better according to my test, since

1. the sorting while inserting already does the comparisons,
2. the following adjacent finding does comparison again,
3. these data structure prefer less-than operations to equal operations, they perform 2 less-than(a

I do not see how it can save comparisons.

one more thing that's ignored by some answers below, I need to differentiate the duplicate groups from one another, not just keep them in the container.

## Conclusion

After all the discussion, there seem to be 3 ways

1. my original naive method as explained above
2. Start with a linear container like `std::vector` , sort it and then locate the equal ranges
3. start with an associated container like `std::map<Type, vector<duplicates>>`, pick out the duplicates during the setup of associated container as suggested by Charles Bailey.

I've coded a sample to test all the methods as posted below.

the number of duplicates and when they are distributed may influence the best choice.

• Method 1 is best when they fall heavily at the front, and is worst when at the end. Sort will not change the distribution, but the endian.
• Method 3 has the most average performance
• Method 2 is never the best choice

## Thanks for all who participating in the discussion.

one output with 20 sample items from the code below.

Test with [ 20 10 6 5 4 3 2 2 2 2 1 1 1 1 1 1 1 1 1 1 ]

and [ 1 1 1 1 1 1 1 1 1 1 2 2 2 2 3 4 5 6 10 20 ] respectively

using std::vector -> sort() -> adjacent_find():

comparisons: [ '<' = 139, '==' = 23 ]

comparisons: [ '<' = 38, '==' = 23 ]

using std::list -> sort() -> shrink list:

comparisons: [ '<' = 50, '==' = 43 ]

comparisons: [ '<' = 52, '==' = 43 ]

using std::list -> shrink list:

comparisons: [ '<' = 0, '==' = 121 ]

comparisons: [ '<' = 0, '==' = 43 ]

using std::vector -> std::map>:

comparisons: [ '<' = 79, '==' = 0 ]

comparisons: [ '<' = 53, '==' = 0 ]

using std::vector -> std::multiset -> adjacent_find():

comparisons: [ '<' = 79, '==' = 7 ]

comparisons: [ '<' = 53, '==' = 7 ]

## Code

``````// compile with VC++10: cl.exe /EHsc

#include <vector>
#include <deque>
#include <list>
#include <map>
#include <set>
#include <algorithm>
#include <iostream>
#include <sstream>

#include <boost/foreach.hpp>
#include <boost/tuple/tuple.hpp>
#include <boost/format.hpp>

using namespace std;

struct Type
{
Type(int i) : m_i(i){}

bool operator<(const Type& t) const
{
++number_less_than_comparison;
return m_i < t.m_i;
}

bool operator==(const Type& t) const
{
++number_equal_comparison;
return m_i == t.m_i;
}
public:
static void log(const string& operation)
{
cout
<< "comparison during " <<operation << ": [ "
<< "'<'  = " << number_less_than_comparison
<< ", "
<< "'==' = " << number_equal_comparison
<< " ]\n";

reset();
}

int to_int() const
{
return m_i;
}
private:
static void reset()
{
number_less_than_comparison = 0;
number_equal_comparison = 0;
}

public:
static size_t number_less_than_comparison;
static size_t number_equal_comparison;
private:
int m_i;
};

size_t Type::number_less_than_comparison = 0;
size_t Type::number_equal_comparison = 0;

ostream& operator<<(ostream& os, const Type& t)
{
os << t.to_int();
return os;
}

template< class Container >
struct Test
{
void recursive_run(size_t n)
{
bool reserve_order = false;

for(size_t i = 48; i < n; ++i)
{
run(i);
}
}

void run(size_t i)
{
cout <<
boost::format("\n\nTest %1% sample elements\nusing method%2%:\n")
% i
% Description();

generate_sample(i);
sort();
locate();

generate_reverse_sample(i);
sort();
locate();
}

private:
void print_me(const string& when)
{
std::stringstream ss;
ss << when <<" = [ ";
BOOST_FOREACH(const Container::value_type& v, m_container)
{
ss << v << " ";
}
ss << "]\n";
cout << ss.str();
}

void generate_sample(size_t n)
{
m_container.clear();
for(size_t i = 1; i <= n; ++i)
{
m_container.push_back(Type(n/i));
}
print_me("init value");
Type::log("setup");
}

void generate_reverse_sample(size_t n)
{
m_container.clear();
for(size_t i = 0; i < n; ++i)
{
m_container.push_back(Type(n/(n-i)));
}
print_me("init value(reverse order)");
Type::log("setup");
}

void sort()
{
sort_it();

Type::log("sort");
print_me("after sort");

}

void locate()
{
locate_duplicates();

Type::log("locate duplicate");
}
protected:
virtual string Description() = 0;
virtual void sort_it() = 0;
virtual void locate_duplicates() = 0;
protected:
Container m_container;
};

struct Vector : Test<vector<Type> >
{
string Description()
{
return "std::vector<Type> -> sort() -> adjacent_find()";
}

private:
void sort_it()
{
std::sort(m_container.begin(), m_container.end());
}

void locate_duplicates()
{
typedef vector<Type>::iterator ITR;
typedef vector<Type>::value_type  VALUE;

typedef boost::tuple<VALUE, ITR, ITR> TUPLE;
typedef vector<TUPLE> V_TUPLE;

V_TUPLE results;

ITR itr_begin(m_container.begin());
ITR itr_end(m_container.end());
ITR itr(m_container.begin());
ITR itr_range_begin(m_container.begin());

while(itr_begin != itr_end)
{
// find  the start of one equal reange
itr_begin,
itr_end,
[]  (VALUE& v1, VALUE& v2)
{
return v1 == v2;
}
);
if(itr_end == itr) break; // end of container

// find  the end of one equal reange
VALUE start = *itr;
while(itr != itr_end)
{
if(!(*itr == start)) break;
itr++;
}

results.push_back(TUPLE(start, itr_range_begin, itr));

// prepare for next iteration
itr_begin = itr;
}
}
};

struct List : Test<list<Type> >
{
List(bool sorted) : m_sorted(sorted){}

string Description()
{
return m_sorted ? "std::list -> sort() -> shrink list" : "std::list -> shrink list";
}
private:
void sort_it()
{
if(m_sorted) m_container.sort();////std::sort(m_container.begin(), m_container.end());
}

void locate_duplicates()
{
typedef list<Type>::value_type VALUE;
typedef list<Type>::iterator ITR;

typedef vector<VALUE>  GROUP;
typedef vector<GROUP>  GROUPS;

GROUPS sub_groups;
GROUP one_group;

while(m_container.size() > 1)
{
VALUE front(m_container.front());
m_container.pop_front();

ITR it     = m_container.begin();
ITR it_end = m_container.end();
while(it != it_end)
{
if(front == (*it))
{
one_group.push_back(*it); // single it out
it = m_container.erase(it); // shrink list by one
}
else
{
it++;
}
}

// save results
if(!one_group.empty())
{
// save
one_group.push_back(front);
sub_groups.push_back(one_group);

// clear, memory allocation not freed
one_group.clear();
}
}
}

private:
bool m_sorted;
};

struct Map : Test<vector<Type>>
{
string Description()
{
return "std::vector -> std::map<Type, vector<Type>>" ;
}
private:
void sort_it() {}

void locate_duplicates()
{
typedef map<Type, vector<Type> > MAP;
typedef MAP::iterator ITR;

MAP local_map;

BOOST_FOREACH(const vector<Type>::value_type& v, m_container)
{
pair<ITR, bool> mit;
mit = local_map.insert(make_pair(v, vector<Type>(1, v)));
if(!mit.second) (mit.first->second).push_back(v);
}

ITR itr(local_map.begin());
while(itr != local_map.end())
{
if(itr->second.empty()) local_map.erase(itr);

itr++;
}
}
};

struct Multiset :  Test<vector<Type>>
{
string Description()
{
return "std::vector -> std::multiset<Type> -> adjacent_find()" ;
}
private:
void sort_it() {}

void locate_duplicates()
{

typedef set<Type> SET;
typedef SET::iterator ITR;
typedef SET::value_type  VALUE;

typedef boost::tuple<VALUE, ITR, ITR> TUPLE;
typedef vector<TUPLE> V_TUPLE;

V_TUPLE results;

SET local_set;
BOOST_FOREACH(const vector<Type>::value_type& v, m_container)
{
local_set.insert(v);
}

ITR itr_begin(local_set.begin());
ITR itr_end(local_set.end());
ITR itr(local_set.begin());
ITR itr_range_begin(local_set.begin());

while(itr_begin != itr_end)
{
// find  the start of one equal reange
itr_begin,
itr_end,
[]  (VALUE& v1, VALUE& v2)
{
return v1 == v2;
}
);
if(itr_end == itr) break; // end of container

// find  the end of one equal reange
VALUE start = *itr;
while(itr != itr_end)
{
if(!(*itr == start)) break;
itr++;
}

results.push_back(TUPLE(start, itr_range_begin, itr));

// prepare for next iteration
itr_begin = itr;
}
}
};

int main()
{
size_t N = 20;

Vector().run(20);
List(true).run(20);
List(false).run(20);
Map().run(20);
Multiset().run(20);
}
``````
-
I think you need to describe the purpose of your algorithm a bit better. Given that the objective is to end with an empty list, wouldn't throwing all in the input away be the fastest and simplest solution? –  Charles Bailey Aug 26 '09 at 6:29
the input is a collection that contains possible duplicate elements, and the outputs are zero or more collections that each contain duplicates of the same kind. (I prefer not to user the term "list", because it may imply some implementation, e.g. std::list ) –  t.g. Aug 26 '09 at 6:38
In that case, why isn't a pre-sorted container (e.g. multiset) a solution. i.e. post-edit, why do you imply that you need to do "adjacent finding". Surely, once the container is populated, you just output it in order, no comparisons required? –  Charles Bailey Aug 26 '09 at 6:45
adjacent finding is needed because there may be multiple duplicate groups. for example, in a pre-sorted container like this {E1, E2, E2, E4, E4, E5}, I need to single out {E2, E2} and {E4, E4}. without adjacent finding, I don't know where E2 and E4 starts and ends, –  t.g. Aug 26 '09 at 7:04
equivalent. and to check that they are equivalent are expensive operations that may take a dozen of seconds. the output interface doesn't matter as long as the information is extracted out. In my std::multimap version of implementation, I just saved the std::multimap::iterators representing the range. Because with std::multimap involves comparisons at insertion and adjacent finding. I switched to a non-sorted container std::list in hope to save comparisons. But no significant improvement, nor decrease. A container bounded with an algorithm with least comparison is what I need. –  t.g. Aug 26 '09 at 7:29

You could use a map from a representative element to a list/vector/deque of other elements. This requires relatively fewer comparisons in insertion into the container and means that you can iterate through the resulting groups without having to perform any comparisons.

This example always inserts the first representative element into the mapped deque storage as it makes the subsequent iteration through the group logically simple, but if this duplication proves a problem then it would be easy to only perform the `push_back` only `if (!ins_pair.second)`.

``````typedef std::map<Type, std::deque<Type> > Storage;

void Insert(Storage& s, const Type& t)
{
std::pair<Storage::iterator, bool> ins_pair( s.insert(std::make_pair(t, std::deque<Type>())) );
ins_pair.first->second.push_back(t);
}
``````

Iterating through the groups is then (relatively) simple and cheap:

``````void Iterate(const Storage& s)
{
for (Storage::const_iterator i = s.begin(); i != s.end(); ++i)
{
for (std::deque<Type>::const_iterator j = i->second.begin(); j != i->second.end(); ++j)
{
// do something with *j
}
}
}
``````

I performed some experiments for comparison and object counts. In a test with 100000 objects in random order forming 50000 groups (i.e. and average of 2 objects per group) the above method cost the following number of comparisons and copies:

``````1630674 comparisons, 443290 copies
``````

(I tried bringing the number of copies down, but only really managed to at the expense of comparisons which seem to be the higher cost operation in your scenario.)

Using a multimap, and retaining the previous element in the final iteration to detect the group transitions cost this:

``````1756208 comparisons, 100000 copies
``````

Using a single list and popping the front element and performing a linear search for other group members cost:

``````1885879088 comparisons, 100000 copies
``````

Yes, that's ~1.9b comparisons compared to ~1.6m for my best method. To get the list method to perform anywhere near an optimal number of comparisons it would have to be sorted and this is going to cost a similar number of comparisons as building an inherently ordered container would in the first place.

Edit

I took your posted code and ran the implied algorithm (I had to make some assumptions about the code as there as some assumed definitions) over the same test data set as I used before and I counted:

``````1885879088 comparisons, 420939 copies
``````

i.e. exactly the same number of comparisons as my dumb list algorithm, but with more copies. I think that that means we using essentially similar algorithms for this case. I can't see any evidence of an alternative sort order, but it looks like you want a list of the groups which contain more than one equivalent elements. This can be simply achieved in my `Iterate` function by adding in `if (i->size > 1)` clause.

I still can't see any evidence that building a sorted container such as this map of deques isn't a good (even if not optimal) strategy.

-
this is almost my solution before I met my problem except that I used list instead of deque. Here comes the question: Now that you have a deque of elements pre-processed by your way, hence they cannot be represented by any other attributes but themselves(think of files that already have identical hases), i.e. they might be equal or diffenret but have to be compared by themselves(which is expensive), how can you group equal ones using minimum amount of comparisons –  t.g. Aug 26 '09 at 8:54
Each `deque` only contains equivalent elements, are you saying that you are using a different concept for `==` and `<` ? –  Charles Bailey Aug 26 '09 at 9:12
I missed that as I used list. If I were to use deque, i need to do those expensive comparisons before the insertion. No good. Because the comparisons are so expansive, I've tried my best to postpone it(including the way similar you recommended). Now comes the judement day and I have to face it - so I am looking for ways to save the number of comparisons. –  t.g. Aug 26 '09 at 9:32
Either the problem is more involved than you've suggested on the question or you've misunderstood my answer. In my answer each `deque` contains a group of equivalent elements. According to the original problem statement there is no need to order them. They already contain only equivalent elements. You now seem to be implying that there is a second sub-order that differentiates the elements in each group that you want the groups ordered by. If so, can you update the question to make this clearer? –  Charles Bailey Aug 26 '09 at 15:41
@Charles Bailey, thanks for the intensive discussion and helping me clarify my question. I've just updated the question. Regarding your specific implementation: the cost of comparison happens at s.insert(std::make_pair(t, std::deque<Type>())). You actually rely on the std::map pre-sorting implementation which is a B-tree as ttvd suggested in this page, which does not necessarily involve least comparison. I did use your way to filter those apparent different elements, Now I am in the deque to find real ones. Your std::list test is not like that of mine, as you don't shrink it while comparing. –  t.g. Aug 27 '09 at 3:17

Yes, you can do much better.

1. Sort them (O(n) for simple integers, O(n*log n) in general), then duplicates are guaranteed to be adjacent, making finding them quick O(n)

2. Use a hash table, also O(n). For each item, (a) check if it's already in the hash table; if so, its a duplicate; if not, put it in the hash table.

# edit

The method you're using seems to do O(N^2) comparisons:

``````for i = 0; i < length; ++i           // will do length times
for j = i+1; j < length; ++j     // will do length-i times
compare
``````

So for length 5 you do 4+3+2+1=10 compares; for 6 you do 15, etc. (N^2)/2 - N/2 to be exact. N*log(N) is smaller, for any reasonably high value of N.

How big is N in your case?

As far as reducing hash collisions, the best way is to get a better hash function :-D. Assuming that is not possible, if you can make a variant (e.g., different modulous), you may be able to do a nested hash.

-
my problem is there hash are already equal.Suppose we are already in a collision bucket, and we are going to grouping these elements. what's the best way to do it if the element equal-predicate is so expensive that I want to save every single one? –  t.g. Aug 26 '09 at 6:15
Thanks for the elaboration. In the worst case(when no two elements are equal), . (N^2)/2 - N/2 is expected. but in the best case(when all are equal), only N-1 is needed, 'cause it's pulled out after the comparison. The nature of keeping the iterators valid after erasing elements during a loop is another factor I considered when choosing std::list over std::vector –  t.g. Aug 27 '09 at 2:08

1. Sort the array O(n log n) at worst - mergesort/heapsort/binary tree sort etc

2. Compare neighbors and pull the matches out O(n)

-
that's what I did at first. using STL std::multimap and std::adjacent_find, not significantly better though. –  t.g. Aug 26 '09 at 6:07
The multimap will not give you the performance you want. It is faster to push all the elements into a vector and sort them when done than to keep a sorted multimap, which has to do tree balancing to keep things sorted. –  fbrereto Aug 26 '09 at 17:02
@fbrereton, thanks for this info, I'll test that. Probably I was intrigued by easy-to-get the multimap::euqal_range() interface too much before further thinking at first. –  t.g. Aug 27 '09 at 2:11
There is an equal_range algorithm that works on all STL containers: cplusplus.com/reference/algorithm/equal_range –  fbrereto Aug 27 '09 at 2:59

Keep a hash-table based structure from value to count; if your C++ implementation doesn't offer `std::hash_map` (not really part of the C++ standard so far!-) use Boost or grab a version off the web. One pass over the collection (i.e., O(N)) lets you do a value->count mapping; one more pass over the hash table (<= O(N), clearly) to identify values with a count > 1 and emit them appropriately. Overall O(N), which is not the case for your suggestion.

-
The second pass isn't needed. If it's already in the hash, its a duplicate. –  derobert Aug 26 '09 at 5:40
@derobert, yep, but you don't know how many times it's going to be duplicated, and the specs in the question require that. So a second pass (which doesn't change the O(N) nature of the solution) is the simplest approach! –  Alex Martelli Aug 26 '09 at 5:49

Have you tried sorting? For example using an algorithm like quick sort? If the performance is good enough for you then that would be an easy approach.

-

If it is known to be a list of integers, and if it is known that they are all between A and B (e.g. A=0, B=9), make an array of B-A elements, and create B-A containers.

In the very specific case (list of plain integers), I propose that you merely count them, since you cannot distinguish different integers, anyway:

``````for(int i = 0; i < countOfNumbers; i++)
counter[number[i]]++;
``````

If they are distinguishable, create an array of lists, and add them to the respective list.

If they are not numbers, use a std::map or std::hash_map, mapping keys to lists of values.

-

The simplest is probably to just sort the list, and then to iterate over it looking for dups.

If you know something about the data, more efficient algorithms are possible.

For example, if you knew the list was large, and only contained integers from 1..n where n is fairly small, you could use a pair of boolean arrays (or a bitmap), and do something like this:

``````bool[] once = new bool[MAXIMUM_VALUE];
bool[] many = new bool[MAXIMUM_VALUE];
for (int i = 0; i < list.Length; i++)
if (once[ value[i] ])
many[ value[i] ] = true;
else
once[ value[i] ] = true;
``````

Now, many[] contains an array of which values were seen more than once.

-

Most people mentioning hash/unordered map solutions are assuming O(1) insertion and query time, however it could be O(N) worst case. Additionally, you void the cost of object hashing.

Personally I would insert objects into a binary tree (O(logn) insertion for each), and keep counter at each node. This would yield O(nlogn) construction time and O(n) traversal to identify all duplicates.

-
You are right about the other answers that they ignore the cost of construction of the data structure and only measures the algorithm benefit attached to the specific data structure. Is your method just that of the implementation of std::map? it seems that you are with the others that choosing a data structure is more important that a transversing algorithm. –  t.g. Aug 26 '09 at 6:27
Indeed. I am sorry I cannot leave comments in your original question. Is it feasible to create an empty collection (list) for each type of object in your list (one for all E2's, one for all E3's, etc.)? If so, you could linearly traverse your object set and depending on the object find its corresponding "storage list" and insert it there. This would avoid comparisons and depending on your implementation this could be implemented in O(N). –  ttvd Aug 26 '09 at 8:24
I guess you are suggesting something similar to Charles Bailey. I indeed did that as a pre-step to group almost-equal elements. and then my problem arises, I cannot delegate the comparison to any other types, but themselves, and of course they are expensive. So I am looking for some way to save the number of comparisons, since it's no way to do away with them –  t.g. Aug 26 '09 at 9:07

If I've understood the question correctly, then this is the simplest solution I can think of:

``````std::vector<T> input;
typedef std::vector<T>::iterator iter;

std::vector<std::pair<iter, iter> > output;

sort(input.begin(), input.end()); // O(n lg n) comparisons

for (iter cur = input.begin(); cur != input.end();){
std::pair<iter, iter> range = equal_range(cur, input.end(), *cur); // find all elements equal to the current one O(lg n) comparisons
cur = range.second;
output.push_back(range);
}
``````

Total running time: `O(n log n)`. You have one sorting pass `O(n lg n)` and then a second pass where `O(lg n)` comparisons are performed for each group (so this is done at most `n` times, also yielding `O(n lg n)`.

Note that this depends on the input being a vector. Only random access iterators have logarithmic complexity in the second pass. Bidirectional iterators would be linear.

This doesn't rely on hashing (as requested), and it preserves all the original elements (rather than just returning one element for each group, along with a count of how often it occurred).

Of course, a number of smaller constant optimizations are possible. `output.reserve(input.size())` on the output vector would be a good idea, to avoid reallocation. `input.end()` is taken much more often than necessary too, and could be easily cached.

Depending on how big the groups are assumed to be, `equal_range` may not be the most efficient choice. I assume it does a binary search to get logarithmic complexity, but if each group is only a couple of elements, a simple linear scan would have been faster. In any case, the initial sorting dominates the cost though.

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After reading the STL document, I am thinking that no pre-sort container is good for situation, because they all seem to rely on 2 less-than comparison operations to determine equality, while one (==) operation is OK in my case and comparison is the only thing I want to save. –  t.g. Aug 27 '09 at 10:37
What pre-sort container? I'm using a vector, and sorting it manually. –  jalf Aug 27 '09 at 10:47
it seems sort() is in that category that relies on less_than operations, hence my comments. sorry for not having been clear. –  t.g. Aug 27 '09 at 11:01
It relies on less than, yes, but it doesn't use that operation to emulate equality tests. It relies on less than because it needs to perform less than operations. You need a less than operation to sort elements. Once again, it is not used twice to emulate equality. In fact, I'd like you to show me a sorting algorithm, any sorting algorithm which relies on ==. ;) –  jalf Aug 27 '09 at 11:38
it's quite resonable to rely on less-than. And that's the very reason sort is overkill in my case :-) –  t.g. Aug 27 '09 at 11:51

Just to register that I had the same problem during a normalization of a triple store that I am working with. I implemented the method 3, summarized by Charles Bailey, in Common Lisp using the hash-table feature from Allegro Common Lisp.

The function "agent-equal?" is used to test when two agents in the TS are the same. The function "merge-nodes" merges the nodes on each cluster. In the code below, the "..." was used to remove the not so important parts.

``````(defun agent-equal? (a b)
(let ((aprops (car (get-triples-list :s a :p !foaf:name)))
(bprops (car (get-triples-list :s b :p !foaf:name))))
(upi= (object aprops) (object bprops))))

(defun process-rdf (out-path filename)
(let* (...
(table (make-hash-table :test 'agent-equal?)))
(progn
...
(let ((agents (mapcar #'subject
(get-triples-list :o !foaf:Agent :limit nil))))
(progn
(dolist (a agents)
(if (gethash a table)
(push a (gethash a table))
(setf (gethash a table) (list a))))
(maphash #'merge-nodes table)
...
)))))
``````
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