# finding successive mimimum and compare in a vector of queues

i just implement a logic where a integer before gets enqueued to a queue, the loop of queues in a vector is searched and integer is enqueued to a queue which has minimum size among the queues. the following code shows the operation.

``````#include <vector>
#include <queue>
std::vector<std::queue<int> > q
int min_index = 0;
std::size_t size = q.size();
for( i=0; i<size; i++){ //accessing loop of queues
if(q[min_index].size() > q[i].size())
min_index = i; // Now q[min_index] is the shortest queue
}
q[min_index].push(int)
``````

now additionally i would like to extend my paradigm with a condition that the integers should get continued to enqueue in the shortest queue while the condition is true that the shortest queue's size is less than or equal to any another queue's size in the loop of queues.

want to do something like the code shown below

``````#include <vector>
#include <queue>
std::vector<std::queue<int> > q
int min_index = 0;
std::size_t size = q.size();
for( i=0; i<size; i++){ //accessing loop of queues
if(q[min_index].size() > q[i].size())
min_index = i

while(q[min_index].size <= q[some_other_index].size() )
{
q[min_index].push(int);

}
``````

i think i should find successive minimas of the loop and compare it in the while loop? but i dont know how to proceed to mind find successive minimas.

continuation of this question as i didnt ask the question clearly comparing queue sizes in a vector

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are you able to mutate the `q` at all? –  111111 Feb 15 '13 at 15:56
It sounds like you need a class to wrap this vector of queue's so that it can maintain the property you want. –  andre Feb 15 '13 at 16:00
this statement while(q[min_index].size <= q[some_other_index].size() )wont work really? –  billa Feb 15 '13 at 16:04

If the other queues aren't changed while your loop is ongoing, you can use the initial minimum-search to find the two shortest queues. Something like:

``````std::size_t min_index = 0;
std::size_t second_shortest_index = 0;
std::size_t size = q.size();
for( i=0; i<size; i++){ //accessing loop of queues
if(q[min_index].size() > q[i].size()) {
second_shortest_index = min_index;
min_index = i; // Now q[min_index] is the shortest queue
} else if (q[second_shortest_index].size() > q[i].size()) {
second_shortest_index = min_index;
}
}
``````

You can then use `second_shortest_index` as your `some_other_index`. This will still require you to search a new second-shortest queue, when you hit that limit (as there may be multiple shortest or second-shortest elements)

If you can reorder your `vector<queue>` or using an index vector with an indirect comparator, you could use `std::make_heap` and related functions to keep track of smallest queue much more easily.

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@joergB'This will still require you to search a new second-shortest queue, when you hit that limit' so this means that everytime the while loop is false, will search again for the shortest and 2nd shortest queue.? –  billa Feb 15 '13 at 16:21
@billa: yes, if you want to continue inserting into the smallest queue after the while loop stops. BTW: once you have hit this, each while loop will just have one iteration. To do better, you could you keep something like a priority queue of queue indices. (That is what my `make_heap` suggestion amounts to.) –  JoergB Feb 15 '13 at 16:44
@joergBIn the code shown above, overall the integers will get enqueued to the shortest queue until its count its equal to the 2nd shortest queue, right? –  billa Feb 18 '13 at 8:49
If my code is followed by your while loop (with `some_other_index` replaced by `second_shortest_index`): almost. They will get enqueued to the shortest queue until its count is larger (by `1`) than the count of what used to be the second shortest. Note that right from the start, the "second-shortest" may have had the same length as the shortest; in that case the code will still insert one item to one of the shortest queues. –  JoergB Feb 18 '13 at 9:23
@joergByes i understood what you meant, shortest queue will have a enqueue until its count is larger (by 1) than the 2nd shortest queue. thanks for the interaction.:) –  billa Feb 18 '13 at 9:41