# average case complexity of ternary search

I need to solve for the average case complexity of ternary search. In the worst case you would do two comparisons so I assume worst case complexity looks like this:

``````C(n) = C(n/3) + 2
``````

which can then be shown to be O(logn), however what would the average case look like? I'm thinking possibly this:

``````C(n) = C(n/3) + 1.5
``````

since on average you might do 1 or 2 comparisons so (1+2)/3 = 1.5

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Doesn't ternary search always perform two lookups on each iteration? –  templatetypedef Oct 7 '13 at 5:10
@templatetypedef Why would you need to? `if (e < data[n/3]) look left else if (e < data[2n/3]) look mid else look right` (well, a little more complex to take into account equality, but the same number of comparisons). –  Dukeling Oct 7 '13 at 8:24
I think you are confusing a ternary search TREE with ternary search. Your question and clarification make sense for a tree, but not for regular ternary search. –  Chris Okasaki Oct 7 '13 at 9:30
@ChrisOkasaki I agree, that's why the question threw me off to begin with... the big O complexity will never change for ternary search just the constant factor. –  user2321926 Oct 8 '13 at 2:28