# Balancing a ternary search tree

How does one go about 'balancing' a ternary search tree? Most tst implementations don't address balancing, but suggest inserting in an optimal order (which I can't control.)

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How large a search tree? – Will A Dec 1 '10 at 3:57
A couple thousand words ranging from 4 to 20 characters. Not sure if that is big or small, but its big for me. – uroc Dec 1 '10 at 4:03
Sounds like throwing away the tree when it gets to a certain point and replacing it with a tree built with 'the optimal order' is your best bet - should take milliseconds, if you can spare the time. – Will A Dec 1 '10 at 4:30
I'm wondering if rebalancing is a simple as changing a node to be the middle element of its lo child and all its lo children, itself, and the hi child and all its hi children. – uroc Dec 1 '10 at 4:38

## 3 Answers

The article in Dr. Dobbs about Ternary Search Trees says: D.D. Sleator and R.E. Tarjan describe theoretical balancing algorithms for ternary search trees in "Self-Adjusting Binary Search Trees" (Journal of the ACM, July 1985). You can find online versions of this paper with your favorite search engine.

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A generalization of the binary search tree is the B-Tree, which works for fanouts anywhere from 2 and up. That's not the only way to do it, but it's a common one.

Roughly the way it works is if an insert or delete would put the tree out of balance, it steals an element or a space from a neighboring node. If even that isn't enough to keep the tree in balance, its height by will be changed to make room.

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The OP talks about ternary search trees. – hmuelner Dec 1 '10 at 12:10
I'm not at all clear about how a 1-2 B-Tree differs from a Ternary tree. Can you explain it to me? – SingleNegationElimination Dec 1 '10 at 17:20
A B-Tree (usually) contains the full keys in the nodes. In a ternary search tree the key is defined by the path to the node. – hmuelner Dec 2 '10 at 7:57

read this article:

"Self-Adjusting of Ternary Search Tries Using Conditional Rotations and Randomized Heuristics" by "Ghada Hany Badr∗ and B. John Oommen †"

it will help you to understanding self-adjusting and balancing TSTs.

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