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This example demonstrates how to determine the index at which an element should be inserted into a sorted list. Although binarySearch() is used to locate existent elements, it can also be used to determine the insert index for non-existent elements.

// Create a list with an ordered list of items 
List sortedList = new LinkedList(); 
sortedList.addAll(Arrays.asList(new String[]{"ant", "bat", "cat", "dog"}));
// Search for the non-existent item int index = Collections.binarySearch(sortedList, "cow"); 
// -4 // Add the non-existent item to the list 
if (index < 0) { sortedList.add(-index-1, "cow"); } 

How I cant to insert elements for time O(k log k + n). k is the number of lists. n is the total number of elements in all of the lists (n = n1 + n2 + ... + nk).

Explain in Asymptotic Analysis of Algorithms???

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@MSN: Please stop adding the homework tag without any clarification from OP. – Aryabhatta Nov 19 '10 at 17:31
@Moron, ah, my bad. Given the text, I should have googled the first paragraph first: – MSN Nov 19 '10 at 17:43
Not being familiar with java LinkedList, does it really support binary search? – Axn Nov 19 '10 at 19:19

This sounds like it deserves a homework flag, so I won't spoil it totally for you, but review your very classical sort algorithms and don't think of it as inserting elements, think of it as creating a still ordered list that contains all elements from both lists.

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