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I've a vector of vectors say vector<vector<int> > items of different sizes like as follows

1,2,3
4,5
6,7,8

I want to create combinations in terms of Cartesian product of these vectors like

1,4,6
1,4,7
1,4,8
and so on till
3,5,8

How can I do that ? I've looked up several links and I've also listed them at the end of this post but I'm not able to interpret that as I'm not that familiar with the language. Could some body help me with this.

#include <iostream>
#include <iomanip>
#include <vector>

using namespace std;

int main()
{
    vector<vector<int> > items;
    int k = 0;

    for ( int i = 0; i < 5; i++ ) {
        items.push_back ( vector<int>() );

        for ( int j = 0; j < 5; j++ )
            items[i].push_back ( k++ );
    }

    cartesian ( items ); // I want some function here to do this.
}

This program has equal length vectors and I put this so that it will be easier to understand my data structure. It will be very helpful even if somebody uses others answers from other links and integrate with this to get the result. Thank you very much

Couple of links I looked at one Two Program from : program

share|improve this question
    
possible duplicate of Cartesian product of several vectors –  BlueRaja - Danny Pflughoeft Mar 11 '11 at 22:55
    
@up, this one is younger but has better answers. –  Kos Dec 23 '11 at 20:43

5 Answers 5

up vote 13 down vote accepted

First, I'll show you a recursive version.

// Cartesion product of vector of vectors

#include <vector>
#include <iostream>
#include <iterator>

// Types to hold vector-of-ints (Vi) and vector-of-vector-of-ints (Vvi)
typedef std::vector<int> Vi;
typedef std::vector<Vi> Vvi;

// Just for the sample -- populate the intput data set
Vvi build_input() {
   Vvi vvi;

   for(int i = 0; i < 3; i++) {
      Vi vi;
      for(int j = 0; j < 3; j++) {
         vi.push_back(i*10+j);
      }
      vvi.push_back(vi);
   }
   return vvi;
}

// just for the sample -- print the data sets
std::ostream&
operator<<(std::ostream& os, const Vi& vi)
{
  os << "(";
  std::copy(vi.begin(), vi.end(), std::ostream_iterator<int>(os, ", "));
  os << ")";
  return os;
}
std::ostream&
operator<<(std::ostream& os, const Vvi& vvi)
{
  os << "(\n";
  for(Vvi::const_iterator it = vvi.begin();
      it != vvi.end();
      it++) {
      os << "  " << *it << "\n";
  }
  os << ")";
  return os;
}

// recursive algorithm to to produce cart. prod.
// At any given moment, "me" points to some Vi in the middle of the
// input data set. 
//   for int i in *me:
//      add i to current result
//      recurse on next "me"
// 
void cart_product(
    Vvi& rvvi,  // final result
    Vi&  rvi,   // current result 
    Vvi::const_iterator me, // current input
    Vvi::const_iterator end) // final input
{
    if(me == end) {
        // terminal condition of the recursion. We no longer have
        // any input vectors to manipulate. Add the current result (rvi)
        // to the total set of results (rvvvi).
        rvvi.push_back(rvi);
        return;
    }

    // need an easy name for my vector-of-ints
    const Vi& mevi = *me;
    for(Vi::const_iterator it = mevi.begin();
        it != mevi.end();
        it++) {
        // final rvi will look like "a, b, c, ME, d, e, f"
        // At the moment, rvi already has "a, b, c"
        rvi.push_back(*it);  // add ME
        cart_product(rvvi, rvi, me+1, end); add "d, e, f"
        rvi.pop_back(); // clean ME off for next round
    }
}

// sample only, to drive the cart_product routine.
int main() {
  Vvi input(build_input());
  std::cout << input << "\n";

  Vvi output;
  Vi outputTemp;
  cart_product(output, outputTemp, input.begin(), input.end());
  std::cout << output << "\n";
}

Now, I'll show you the recursive iterative version that I shamelessly stole from @John :

The rest of the program is pretty much the same, only showing the cart_product function.

// Seems like you'd want a vector of iterators
// which iterate over your individual vector<int>s.
struct Digits {
    Vi::const_iterator begin;
    Vi::const_iterator end;
    Vi::const_iterator me;
};
typedef std::vector<Digits> Vd;
void cart_product(
    Vvi& out,  // final result
    Vvi& in)  // final result

{
    Vd vd;

    // Start all of the iterators at the beginning.
    for(Vvi::const_iterator it = in.begin();
        it != in.end();
        ++it) {
        Digits d = {(*it).begin(), (*it).end(), (*it).begin()};
        vd.push_back(d);
    }


    while(1) {

        // Construct your first product vector by pulling 
        // out the element of each vector via the iterator.
        Vi result;
        for(Vd::const_iterator it = vd.begin();
            it != vd.end();
            it++) {
            result.push_back(*(it->me));
        }
        out.push_back(result);

        // Increment the rightmost one, and repeat.

        // When you reach the end, reset that one to the beginning and
        // increment the next-to-last one. You can get the "next-to-last"
        // iterator by pulling it out of the neighboring element in your
        // vector of iterators.
        for(Vd::iterator it = vd.begin(); ; ) {
            // okay, I started at the left instead. sue me
            ++(it->me);
            if(it->me == it->end) {
                if(it+1 == vd.end()) {
                    // I'm the last digit, and I'm about to roll
                    return;
                } else {
                    // cascade
                    it->me = it->begin;
                    ++it;
                }
            } else {
                // normal
                break;
            }
        }
    }
}
share|improve this answer
    
This is awesome and working perfectly and it is exactly what I want. To be honest I kind of even find it hard to follow it. Thanks a lot. –  Sunil Mar 11 '11 at 23:55
    
This is kind of embarrassing to ask but what if I don't want to print out but store EACH of the combination in a separate data structure like set ? –  Sunil Mar 12 '11 at 0:26
1  
Take a close look at main. All of the results are in the output variable. It happens to be a std::vector<std::vector<int> >, but you could easily modify it to be a std::set<std::vector<int> >. You'd need to change rvvi.push_back() to rvvi.insert(). –  Robᵩ Mar 12 '11 at 0:33
    
Perfect. Thanks. I also learned a lot from your style of programming. I've encountered a lot of programs but this was completely different. Thanks. –  Sunil Mar 12 '11 at 1:25
1  
++ Thanks for expressing my algorithm in code. And no worries, I won't sue you. ;) –  John Mar 12 '11 at 4:34

Seems like you'd want a vector of iterators which iterate over your individual vector<int>s.

Start all of the iterators at the beginning. Construct your first product vector by pulling out the element of each vector via the iterator.

Increment the rightmost one, and repeat.

When you reach the end, reset that one to the beginning and increment the next-to-last one. You can get the "next-to-last" iterator by pulling it out of the neighboring element in your vector of iterators.

Continue cycling through until both the last and next-to-last iterators are at the end. Then, reset them both, increment the third-from-last iterator. In general, this can be cascaded.

It's like an odometer, but with each different digit being in a different base.

share|improve this answer
    
Could you provide an example for the loop ? –  Sunil Mar 11 '11 at 22:56
    
I can explain the principles but it would take me a bit to code it up, as I'm not an STL ninja yet. :) –  John Mar 11 '11 at 22:59
    
I'm not even a noob yet. Anyways thanks :) –  Sunil Mar 11 '11 at 23:08

Here's my solution. Also iterative, but a little shorter than the above...

void xp(const vector<vector<int>*>& vecs, vector<vector<int>*> *result) {
  vector<vector<int>*>* rslts;
  for (int ii = 0; ii < vecs.size(); ++ii) {
    const vector<int>& vec = *vecs[ii];
    if (ii == 0) {
      // vecs=[[1,2],...] ==> rslts=[[1],[2]]
      rslts = new vector<vector<int>*>;
      for (int jj = 0; jj < vec.size(); ++jj) {
        vector<int>* v = new vector<int>;
        v->push_back(vec[jj]);
        rslts->push_back(v);
      }
    } else {
      // vecs=[[1,2],[3,4],...] ==> rslts=[[1,3],[1,4],[2,3],[2,4]]
      vector<vector<int>*>* tmp = new vector<vector<int>*>;
      for (int jj = 0; jj < vec.size(); ++jj) {  // vec[jj]=3 (first iter jj=0)
        for (vector<vector<int>*>::const_iterator it = rslts->begin();
             it != rslts->end(); ++it) {
          vector<int>* v = new vector<int>(**it);       // v=[1]
          v->push_back(vec[jj]);                        // v=[1,3]
          tmp->push_back(v);                            // tmp=[[1,3]]
        }
      }
      for (int kk = 0; kk < rslts->size(); ++kk) {
        delete (*rslts)[kk];
      }
      delete rslts;
      rslts = tmp;
    }
  }
  result->insert(result->end(), rslts->begin(), rslts->end());
  delete rslts;
}

I derived it with some pain from a haskell version I wrote:

xp :: [[a]] -> [[a]]
xp [] = []
xp [l] = map (:[]) l
xp (h:t) = foldr (\x acc -> foldr (\l acc -> (x:l):acc) acc (xp t)) [] h
share|improve this answer
    
Thanks for taking the effort. I appreciate you help ! :-) –  Sunil Sep 12 '11 at 22:04
    
In haskell, I would have wrote xp = sequence –  Matt W-D Aug 21 '13 at 14:18

Shorter code:

vector<vector<int>> cart_product (const vector<vector<int>>& v) {
    vector<vector<int>> s = {{}};
    for (auto& u : v) {
        vector<vector<int>> r;
        for (auto& x : s) {
            for (auto y : u) {
                r.push_back(x);
                r.back().push_back(y);
            }
        }
        s.swap(r);
    }
    return s;
}
share|improve this answer
    
OPPs my bad, sorry :( –  P0W Mar 11 at 13:28

Since I needed the same functionality, I implemented an iterator which computes the Cartesian product on the fly, as needed, and iterates over it.

It can be used as follows.

#include <forward_list>
#include <iostream>
#include <vector>
#include "cartesian.hpp"

int main()
{
    // Works with a vector of vectors
    std::vector<std::vector<int>> test{{1,2,3}, {4,5,6}, {8,9}};
    CartesianProduct<decltype(test)> cp(test);
    for(auto const& val: cp) {
        std::cout << val.at(0) << ", " << val.at(1) << ", " << val.at(2) << "\n";
    }

    // Also works with something much less, like a forward_list of forward_lists
    std::forward_list<std::forward_list<std::string>> foo{{"boo", "far", "zab"}, {"zoo", "moo"}, {"yohoo", "bohoo", "whoot", "noo"}};
    CartesianProduct<decltype(foo)> bar(foo);
    for(auto const& val: bar) {
        std::cout << val.at(0) << ", " << val.at(1) << ", " << val.at(2) << "\n";
    }
}

The file cartesian.hpp looks like this.

#include <cassert>

#include <limits>
#include <stdexcept>
#include <vector>

#include <boost/iterator/iterator_facade.hpp>

//! Class iterating over the Cartesian product of a forward iterable container of forward iterable containers
template<typename T>
class CartesianProductIterator : public boost::iterator_facade<CartesianProductIterator<T>, std::vector<typename T::value_type::value_type> const, boost::forward_traversal_tag>
{
    public:
        //! Delete default constructor
        CartesianProductIterator() = delete;

        //! Constructor setting the underlying iterator and position
        /*!
         * \param[in] structure The underlying structure
         * \param[in] pos The position the iterator should be initialized to.  std::numeric_limits<std::size_t>::max()stands for the end, the position after the last element.
         */
        explicit CartesianProductIterator(T const& structure, std::size_t pos);

    private:
        //! Give types more descriptive names
        // \{
        typedef T OuterContainer;
        typedef typename T::value_type Container;
        typedef typename T::value_type::value_type Content;
        // \}

        //! Grant access to boost::iterator_facade
        friend class boost::iterator_core_access;

        //! Increment iterator
        void increment();

        //! Check for equality
        bool equal(CartesianProductIterator<T> const& other) const;

        //! Dereference iterator
        std::vector<Content> const& dereference() const;

        //! The part we are iterating over
        OuterContainer const& structure_;

        //! The position in the Cartesian product
        /*!
         * For each element of structure_, give the position in it.
         * The empty vector represents the end position.
         * Note that this vector has a size equal to structure->size(), or is empty.
         */
        std::vector<typename Container::const_iterator> position_;

        //! The position just indexed by an integer
        std::size_t absolutePosition_ = 0;

        //! The begin iterators, saved for convenience and performance
        std::vector<typename Container::const_iterator> cbegins_;

        //! The end iterators, saved for convenience and performance
        std::vector<typename Container::const_iterator> cends_;

        //! Used for returning references
        /*!
         * We initialize with one empty element, so that we only need to add more elements in increment().
         */
        mutable std::vector<std::vector<Content>> result_{std::vector<Content>()};

        //! The size of the instance of OuterContainer
        std::size_t size_ = 0;
};

template<typename T>
CartesianProductIterator<T>::CartesianProductIterator(OuterContainer const& structure, std::size_t pos) : structure_(structure)
{
    for(auto & entry: structure_) {
        cbegins_.push_back(entry.cbegin());
        cends_.push_back(entry.cend());
        ++size_;
    }

    if(pos == std::numeric_limits<std::size_t>::max() || size_ == 0) {
        absolutePosition_ = std::numeric_limits<std::size_t>::max();
        return;
    }

    // Initialize with all cbegin() position
    position_.reserve(size_);
    for(std::size_t i = 0; i != size_; ++i) {
        position_.push_back(cbegins_[i]);
        if(cbegins_[i] == cends_[i]) {
            // Empty member, so Cartesian product is empty
            absolutePosition_ = std::numeric_limits<std::size_t>::max();
            return;
        }
    }

    // Increment to wanted position
    for(std::size_t i = 0; i < pos; ++i) {
        increment();
    }
}

template<typename T>
void CartesianProductIterator<T>::increment()
{
    if(absolutePosition_ == std::numeric_limits<std::size_t>::max()) {
        return;
    }

    std::size_t pos = size_ - 1;

    // Descend as far as necessary
    while(++(position_[pos]) == cends_[pos] && pos != 0) {
        --pos;
    }
    if(position_[pos] == cends_[pos]) {
        assert(pos == 0);
        absolutePosition_ = std::numeric_limits<std::size_t>::max();
        return;
    }
    // Set all to begin behind pos
    for(++pos; pos != size_; ++pos) {
        position_[pos] = cbegins_[pos];
    }
    ++absolutePosition_;
    result_.emplace_back();
}

template<typename T>
std::vector<typename T::value_type::value_type> const& CartesianProductIterator<T>::dereference() const
{
    if(absolutePosition_ == std::numeric_limits<std::size_t>::max()) {
        throw new std::out_of_range("Out of bound dereference in CartesianProductIterator\n");
    }
    auto & result = result_[absolutePosition_];
    if(result.empty()) {
        result.reserve(size_);
        for(auto & iterator: position_) {
            result.push_back(*iterator);
        }
    }

    return result;
}

template<typename T>
bool CartesianProductIterator<T>::equal(CartesianProductIterator<T> const& other) const
{
    return absolutePosition_ == other.absolutePosition_ && structure_ == other.structure_;
}

//! Class that turns a forward iterable container of forward iterable containers into a forward iterable container which iterates over the Cartesian product of the forward iterable containers
template<typename T>
class CartesianProduct
{
    public:
        //! Constructor from type T
        explicit CartesianProduct(T const& t) : t_(t) {}

        //! Iterator to beginning of Cartesian product
        CartesianProductIterator<T> begin() const { return CartesianProductIterator<T>(t_, 0); }

        //! Iterator behind the last element of the Cartesian product
        CartesianProductIterator<T> end() const { return CartesianProductIterator<T>(t_, std::numeric_limits<std::size_t>::max()); }

    private:
        T const& t_;
};

If someone has comments how to make it faster or better, I'd highly appreciate them.

share|improve this answer
    
I don't know why your answer was overlooked, but, at least to my eyes, it looks much more interesting, as it avoids the cost of storing the Cartesian product. Not tried your code yet, but that's what I need. –  akim Mar 25 at 16:05
    
@akim: Unfortunately, it must store it when it's being computed. This is because it needs to return a reference. It wouldn't be hard to change this, but then one could no longer use a standard iterator as far as I see, since they require a reference to be returned. So if you have huge cartesian products, you probably want to go this way and not have nice-to-have things like range based loops. –  Xoph Apr 9 at 13:24
    
yes, I agree, some less cute solution is needed. Actually, because I need something with std::tuple of std::vector, I now use something similar to for_imp from this proposal: stackoverflow.com/questions/13813007/…, but using C++14-like index_sequences. –  akim Apr 9 at 14:21

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