I came across this question in a reply to another question I had where someone said that ternary trees are often faster than hash tables. I found that hard to believe, so I decided to research a little into it.
This one website from Princeton appears to be the source of the belief. I took a look at algorithm which is described to be O(log n + k) where n is the number of words stored, and k is the length of the key.
It seems to me that the only way this could be faster is if you are often searching for elements that are not already stored. Another thing that bothers me, is that the non-continuous crawling of a trie would tend to cause you to hit pages that have been swapped out, but whether this is a major effect could only be seen through benchmarks.
Now I know that there are probably pros and cons to both of them, and if so, I want to know what they are. Benchmarks are also helpful.