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I'm in a need to create a data-structure based on Linked list, Array, And constant memory usage.

As an input i get two numbers: N and M.

N represents maximum capacity of a disk-on-key, M represents maximum capacity of a computer hard-drive, So that M>N.

So i need to create a program that 'moves' information from the hard-drive to the disk-on-key, That program needs to implements the following methods:

  1. Insert(data) - Inserts the data into the disk-on-key, If its full it removes the data least important(*): worst case run-time O(1).
  2. delete(data) - deletes the given data from the disk-on-key - O(1)

(*) the user can change the file importance.

Maximum amount of memory usage is O(M)

What i did so far:

I've created an array [1...M] which will 'hold' the computer data, I've created a doubly linked list which will hold the disk-on-key data. [The idea is: each time a data is added to the disk-on-key it will be added to the linked list, and i can go directly to the data using the array as a index(/key) storage.]

My computer data fields:

node firstNode;
node currentNode; 
node[] dataCollection; // Will hold computer hard-drive data

So i wanted to create method replacing the least important data with data i want to add [so i'll be able to use in Insert], My code for replace:

public void replace(int leastImportantdata, int insertData){
    node leastImportant = dataCollection[leastImportantdata];
    if (leastImportant.prev!=null) leastImportant.prev.next=dataCollection[insertData-1];
    if (leastImportant.next!=null) leastImportant.next.prev=dataCollection[insertData-1];

So, my main problem is finding the least important data given those two 'combined' data structures and still keeping a run-time of O(1), Especially when the user decides to change the files importance.

  • Say that we start with {4,3,2,1} (numbers represents importance) the least important data would be 1.Suddenly, the user decided to change the last file importance to 5, we get {4,3,2,5} and least important data is 2.

Any idea?

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What is the range of "Importance"? That is, what is the highest and lowest Importance that can be assigned to a datum? –  RBarryYoung Apr 6 '13 at 18:16
Why do you feel you need O(1), when O(log N) is almost certainly adequate and doing better than that is virtually impossible? –  Hot Licks Apr 6 '13 at 18:16
These questions may not be necessary if he paid more attention to his design. Using a SkipList can help produce a very simple and clean solution for this problem. –  IGwe Apr 6 '13 at 18:35
If you could make insert O(1) then you would be able to sort in O(N): First insert N items. Nothing needs to be removed yet. Then insert N items whose value is "infinity". Each time you add an "infinity" item, one of the original items will be removed - append that item to the output. Tada, you have done the impossible: Comparison-based sort faster than O(N log N). –  Raymond Chen Apr 6 '13 at 18:43
@IGwe: but the requirement is not for a "simple and clean solution" it is for O(1) Inserts and O(1) Deletes, which SkipLists do not insure. –  RBarryYoung Apr 6 '13 at 18:46
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2 Answers

My suggestions for solving your problems are these:

  • Define the node class to implement the Comparable interface.

  • Implement the data collection as a Skip List - you can do this by using the ConcurrentSkipListMap possibly.

Using the SkipList implementation can ensure that entries are ordered by their importance.

According to the Java API doc - This class (ConcurrentSkipListMap) implements a concurrent variant of SkipLists providing expected average log(n) time cost for the containsKey, get, put and remove operations and their variants.

In general, the implementation allow item lookup with efficiency comparable to balanced binary search trees (that is, with number of probes proportional to log n instead of n).

Finally look [here] for more on SkipList, and how to write your own implementation.

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It looks like a great solution to O(log n) insert / delete. Using doubly linked list and an array [or any kind of structure to save the indexex] saving the indexes is much more helpful for a standard insert / delete with O(1) - Since i can just peek at the given array index and either insert or delete the data. –  StationaryTraveller Apr 7 '13 at 7:48
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to be able to figure out least important data you need an order to your list.

So first thought does the ordering of the linked list matter at all? you appear to be getting the data out based on the index and not by traversing the list. (If that order matters the rest of my answer might not be very helpful :D).

This means that you can potentially insert items into the list so that they are sorted in order of least priority which would allow you to obtain the item to delete with constant performance as long as you have a reference to the head of the list.

This unfortunately causes complexity of insert to go up. To fix that you can keep a map of priority to the last ( and potentially the first) file in the linked list with that priority.

Using this map you should be able to instantly figure out where the new file needs to be inserted thereby getting constant performance.

so if you have 3 files P(A) = 1 , P(B) =3 , P(C) = 3, your map would look like 1->(A,A) 3->(B,C) saying that if you want to insert another file with priority 1, it should go after A and if you want to insert a File with priority 2 it should go before B.

Obviously I am assuming a finite number of possible priorities over here and that there are no gaps between used priorities. (that would require searching)

Hope this helps

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Using the SkipList implementation as I suggested, there would be no need for a finite range of priority. –  IGwe Apr 6 '13 at 18:25
@IGwe skip list does not have constant complexity –  Osama Javed Apr 7 '13 at 3:06
I need to design the structure, Basically i can design a 'smart' input organizer. But then again, Once the disk-on-key is full i need to find a way pointing at the index with the least importance. –  StationaryTraveller Apr 7 '13 at 7:51
@theAlchemist In the approach mentioned above the head of the list will always have the lowest priority and you can use the map to insert new items with their priorities. When u need to change the priority of a node then, you will need to remove it from the list and reinsert it at the correct position. All these operations should have constant complexity. The only issue might be when priorities are e.g 1 10 100 with large gaps between them. –  Osama Javed Apr 7 '13 at 8:49
@IGwe You are right, I need to use some-kind of dynamic data-structure. I just think the skip-list isn't the best choice, But you might just gave me an idea :-) –  StationaryTraveller Apr 8 '13 at 17:29
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