# Generating new phone numbers, if we know all existing phone numbers [closed]

This is interview question - What is the best strategy to store all the existing phone numbers, so that we can quickly create new phone numbers? We can't assume that existing phone numbers are in the sequence.

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We can't assume that existing phone numbers are in the sequence Do you mean `We can't assume that existing phone numbers are in sequence`? In other words, the numbers are not sorted and there might be gaps if they were. –  Sotirios Delimanolis Nov 29 '13 at 0:47
@SLaks - Hash tables are for fast look on existing numbers, which is easy to do, but we can't keep on looking for random phone numbers as the performance would be O(N). –  user2763443 Nov 29 '13 at 0:50
@SotiriosDelimanolis - Yes, we can't assume existing phone numbers are in sequence, that's why it makes it difficult question :) –  user2763443 Nov 29 '13 at 0:51
@user2763443: Hash table of non-existing numbers? (Or simply a flag array if they are dense.) –  Oli Charlesworth Nov 29 '13 at 0:54

## closed as off-topic by John3136, Andrew Thompson, Bohemian♦, LaurentG, MakotoNov 29 '13 at 5:34

This question appears to be off-topic. The users who voted to close gave this specific reason:

• "Questions asking for code must demonstrate a minimal understanding of the problem being solved. Include attempted solutions, why they didn't work, and the expected results. See also: Stack Overflow question checklist" – John3136, Andrew Thompson, Bohemian, LaurentG
If this question can be reworded to fit the rules in the help center, please edit the question.

I think this problem can solve by suffix tree/trie. The simplest way is each node of the tree contains an array of 0 to 9 which indicates the next element value. Level of the node represents the order of this node's value in the telephone number, level 0 means the first digit, level 1 means second digit ... in a k digit telephone number.

``````class Node {
int value;//From 0 to 9
Node [] next = new Node[10] ;
int totalEntries;//less than or equals to 10^(k - level)
int level//From 0 to k - 1 (k is total digit)
}
``````

We can even store the number of entries in a specific node -> which help you to determine whether the current node is full or not(Assume that telephone number has fix amount of digits). For example , in the case of 5 digits telephone number, so at node level 0, there can be total 10^5 possibilities,less than that means that node is not full and so on.

The cost of creating a new entry will be O(1) which require to travel at most k node, with k is number of digit

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OP has mentioned `so that we can quickly create new phone numbers` is this means that we have to generate a random phone number which is not exist till now or just inserting new phone number should take minimal time? Thanks. –  Trying Nov 29 '13 at 5:10
@Trying I think for this specific condition (telephone number) we should support both. The generating a random number actually is just an additional step (minor time cost), as when we store a number, we already need to make sure that this number is unique :) –  Pham Trung Nov 29 '13 at 6:04

If you assume all 10 digit numbers are possible (US phone numbers including "non-existent" exchanges), then you could store a complete binary table (1 bit per number) in 1E10/8 ~ 1.2GB . After that, you can quickly check whether a phone number exists by looking it up. When half the numbers are used, you have a 50% chance that a randomly generated phone number will work.

As the array becomes denser (more numbers have been picked) it becomes harder to find an unused number; in that case you will need a different strategy.

In reality you will want to allocate "used blocks" and "unused blocks", and create phone numbers from the "unused blocks". Then, just like with memory management, you will want to do "garbage collection" from time to time to make sure that "newly unused" numbers in a block get re-assigned.

Looking at memory management is probably a good way to get more insights into this problem.

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your answer is very convencing. Wondering - if Trie Tree can be used here? –  user2763443 Nov 29 '13 at 1:10

i would probably start with a balanced tree of intervals, where intervals are merged rather overlapping, on addition. that lets you add numbers in O(n log n) (amortized) (i assume - i haven't actually worked out the merging) and you can find the next available number in log(n) (it's one more than the lowest interval).

if you wanted to make it very fast you could pre-allocate intervals in the gaps, distributing them to servers that hand them out.

a prefix tree (with intervals in the leaves) might save space (in fact, that's probably a very good idea - it will soak up area codes).

or maybe just stick them in a heap and keep track of what the lower bound is (and discard numbers from zero to the lower bound). but that's harder to make parallel. (heh. no it isn't - bjorn's answer simply splits them up. neat).

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If we assume that numbers could be in between 1-99999999. Split your heap into intervals where the numbers in the heap represent the lowest number in that particular interval. Then keep track of the end of the interval as well. Start off with a heap with one element (an interval from 1-99999999:

``````   1
``````

Then if a user want to reserve the number 45372288, put 45372289 in the heap and update the above interval. The heap will now look like this:

``````            1:45372287
/
45372289:99999999
``````

If you then do this with all the numbers that is being used, add them and level them as lowest value on top, you could easily pick the top number and update the interval to be:

``````            2:45372287
/
45372289:99999999
``````

When you reach the end point of that interval, remove the interval and replace it with the lowest value interval, by following the normal procedure of a heap removal. With this technique you have to store the used numbers in another list for example if you want to look up which person has which number etc. To remove an interval from the heap takes O(log n) time. So does addition. But when the top element is an interval greater than a length of 1, it takes O(1) to get an unused number.

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Why can't we use a `BitSet` of of size `9999999999 - 1000000000 + 1`. Just set the bit if the phone is present else it is unset. If a new phone number comes than just set the corresponding bit.

e.g.

``````static class BitSet {
int[] numbers;
BitSet(int k){
numbers = new int[(k >> 5) + 1];
}
boolean isSet(int k){
int remender = k & 0x1F;
int devide = k >> 5;
return ((numbers[devide] & (1 << remender)) == 1);
}
void set(int k){
int remender = k & 0x1F;
int devide = k >> 5;
numbers[devide] = numbers[devide] | (1 << remender);
}
}
``````
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Here is pseudo code for algorithm to do it efficiently:-

``````arr = existing numbers
sort(arr);

struct number {

int value;
boolean flag;

};

LEFT = true;
RIGHT = false;

x = generateLeft(arr[0]);

ValidNum = [];

if(valid(x) && !suffixTree.contains(x)) {

n  = new number(x,LEFT);
}

for(i=0;i<arr.length;i++) {

x = generateRight(arr[i]);

if(valid(x) && !suffixTree.contains(x)) {

n  = new number(x,RIGHT);
}

}

// Generate numbers

int genNum() {

if(ValidNum.isempty) {
error("no number left");
exit();
}

else {

x = getrandom(ValidNum);

if(x.flag==LEFT) {
k = generateLeft();
if(valid(k) && !suffixTree.contains(k)) {

n  = new number(k,LEFT);
}

}
else {

k = generateRight();
if(valid(k) && !suffixTree.contains(k)) {

n  = new number(k,RIGHT);
}

}

}

return x;
}
``````

Time complexity :

O(mlogm) to insert m used numbers to datastructure & sort

O(1) for getting new number

Space complexity :

O(m) where m is used numbers at start.

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