5

I need to implement the Cutting Stock Problem with a php script. As my math skills are not that great I am just trying to brute force it.

Starting with these parameters

  • $inventory is an array of lengths that are available to be cut.
  • $requestedPieces is an array of lengths that were requested by the customer.
  • $solution is an empty array

I have currently worked out this recursive function to come up with all possible solutions:

function branch($inventory, $requestedPieces, $solution){
    // Loop through the requested pieces and find all inventory that can fulfill them
    foreach($requestedPieces as $requestKey => $requestedPiece){
        foreach($inventory as $inventoryKey => $piece){
            if($requestedPiece <= $piece){
                $solution2 = $solution;
                array_push($solution2, array($requestKey, $inventoryKey));
                $requestedPieces2 = $requestedPieces;
                unset($requestedPieces2[$requestKey]);
                $inventory2 = $inventory;
                $inventory2[$inventoryKey] = $piece - $requestedPiece;
                if(count($requestedPieces2) > 0){
                    branch($inventory2, $requestedPieces2, $solution2);
                }else{
                    global $solutions;
                    array_push($solutions, $solution2);
                }
            }
        }
    }
}

The biggest inefficiency I have discovered with this is that it will find the same solution multiple times but with the steps in a different order.

For example:

  • $inventory = array(1.83, 20.66);
  • $requestedPieces = array(0.5, 0.25);

The function will come up with 8 solutions where it should come up with 4 solutions. What is a good way to resolve this.

2
  • 1
    store the results in some sort of sorted order, e.g. smallest dimension/sized pieces first. that way even if you start "recreated" a previous solution, you'd be able to detect as this as your current result is treading in a previous results footsteps.
    – Marc B
    Jan 2, 2013 at 20:58
  • can you give the 8 solutions found by algorithm in your example? (you could use a and b for the $requestedPieces' names to simplify things a bit).
    – didierc
    Jan 3, 2013 at 0:58

1 Answer 1

3

This does not answer your question, but I thought it could be worth being mentioned:

You have several other ways to solve your problem, rather than brute forcing it. The wikipedia page on the topic is pretty thorough, but I'll just describe two others simpler ideas. I will use the wikipedia terminology for certain words, namely master for inventory piece, and cut for a requested piece. I will use set to denote a set of cuts pertaining to a given master.

The first one is based on the greedy algorithm, and consist in filling a set with the largest available cut, until no more cut may fit, and repeat that same process for each master, yielding a set for each one of them.

The second one is more dynamic: it uses recursion (like yours), and look for the best fit for the remaining length of master and cuts at each step of the recursion, the goal being to minimize the wasted length when no more cuts can fit.

function branch($master, $cuts, $set){
     $goods = array_filter($cuts, function($v) use ($master) { return $v <= $master;});
     $res = array($master,$set,$cuts);
     if (empty($goods))
         return $res;
     $remaining = array_diff($cuts, $goods);
     foreach($goods as $k => $g){
         $t = $set;
         array_push($t, $g);
         $r = $remaining;
         $c = $goods;
         for ($i = 0; $i < $k; $i++)
             array_push($r,array_shift($c));
         array_shift($c);
         $t = branch($master - $g, $c, $t);
         array_walk($r, function($k,$v) use ($t) {array_push($t[2], $v);});
         if ($t[0] == 0) return $t;
         if ($t[0] < $res[0])
             $res = $t;
     }
     return $res;
}

The function above should give you the optimal set for a given master. It returns an array of 3 values:

  • the wasted length on master
  • the set
  • the remaining cuts

The parameters are

  • the master length,
  • the cuts to be performed (must be sorted in descending order),
  • the set of cuts already scheduled (a preexisting set, which would be empty for the first call for each master)

Caveats: It depends on the masters' order, you could certainly write a function which tries all the relevant possibilities to find the best order of masters.

6
  • I think something must be mixed up with this function. When I call branch(8, array(1), array()); I get a wasted length of 1, a set of seven 1 foot cuts and 1 cut remaining.
    – Mike
    Jan 3, 2013 at 14:38
  • indeed, I relaxed the test in the array_filter call. That should help.
    – didierc
    Jan 3, 2013 at 16:20
  • Perhaps I am not understanding the purpose of this function. Now I get 0 wasted length, a set of 8 1 foot cuts and 0 cuts remaining. If there is an 8' master and I want a a single 1' cut shouldn't I get 7' waste, a single 1' cut and 0 remaining cuts.
    – Mike
    Jan 3, 2013 at 16:33
  • got another one while you were testing. maybe it's ok now.
    – didierc
    Jan 3, 2013 at 16:34
  • Still when I use the call I commented above I get 8 different 1' cuts. I only want a single 1' cut with 7' waste. Also it indicates one remaining cut.
    – Mike
    Jan 3, 2013 at 16:41

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