# find the k-th element in a unimodal array

Given a unimodal array A of n distinct elements (meaning that its entries are in increasing order up until its maximum element, after which its elements are in decreasing order), an integer p (that is the length of the increasing first part) and k (the k-th minimum element) Give an algorithm to compute the value of the kth minimal element that runs in O(log n) time.

Example:

``````A= {1,23,50,30,20,2}
p= 2
k=3
``````

Edit

I tried this:

``````def ksmallest(arr1, arr2, k):
if len(arr1) == 0:
return arr2[len(arr2)-k-1]
elif len(arr2) == 0:
return arr1[k]
mida1 = (int)(len(arr1)/2)
mida2 = (int)((len(arr2)-1)/2)
if mida1+mida2<k:
if arr1[mida1]>arr2[mida2]:
return ksmallest(arr1, arr2[:mida2], k-(len(arr2)-mida2))
else:
return ksmallest(arr1[mida1+1:], arr2, k-mida1-1)
else:
if arr1[mida1]>arr2[mida2]:
return ksmallest(arr1[:mida1], arr2, k)
else:
return ksmallest(arr1, arr2[mida2+1:], k)
``````
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what did you try? –  noMAD Mar 25 '13 at 21:42
Shouldn't p be 3? –  biziclop Mar 25 '13 at 21:42
With the first part increasing and the rest decreasing, you basically have two sorted arrays. Check out this or this or a lot of other questions here. –  Daniel Fischer Mar 25 '13 at 22:00

For starters have another look at your indexes. You begin with:

``````if len(arr1) == 0:
return arr2[len(arr2)-k-1]
elif len(arr2) == 0:
return arr1[len(arr1)-k-1]
``````

But surely if arr1 is in ascending order, and arr2 is in descending order the kth minimal element will not be found in the same location.

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Good point, this part of the code "arr1[len(arr1)-k-1]" must be arr1[k] –  KienMe Mar 27 '13 at 18:50
If your indexes begin at 1, then you need to look at the index in this line as well: return arr2[len(arr2)-k-1] –  shardacb Mar 28 '13 at 13:17