# Questions tagged [balanced-search-trees]

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### AVL trees are not weight-balanced?

In a previous question there was a definition of weight balanced trees and a question regarding red-black trees. This question is to ask the same question, but for AVL trees. The question is, ...
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### A median of an AVL. How to take advantage of the AVL?

Here is the source of my question. Given a self-balancing tree (AVL), code a method that returns the median. (Median: the numerical value separating the higher half of a data sample from ...
2k views

### Balance factor changes after local rotations in AVL tree

I try to understand balance factors change after local rotations in AVL trees. Given the rotate_left operation: ...
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### Compute height of AVL tree as efficiently as possible

Given an AVL tree, I want to compute its height as efficiently as possible. $\newcommand{\bf}{\text{bf}}\newcommand{\height}{\text{height}}$ Each node of an AVL tree stores its balance factor ($\bf$),...
781 views

### Binary tree To Red-Black tree

I have a question regarding the solution provided by Karolis Juodelė. Given in this question; Colour a binary tree to be a red-black tree Black = black nodes, white = red nodes So for this tree when ...
774 views

### Traversals from the root in AVL trees and Red Black Trees

We all know that for insertion() operation in AVL tree following can happen: We traverse down the tree from root to appropriate node and there insert the key and then for maintaining height balance ...
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### Why do we need double-rotations to rebalance AVL trees?

I was reading about AVL tree rebalancing from Behrouz Forouzan's book. The book first defines Left High and Right High tree: Left High (LH) tree is a tree tree with the height of the left ...
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### Prove that given a number we can find whether there're 2 elements in a red/black tree that their sum equals that number in $\Theta(n)$ time

Prove that given a number we can find whether there're 2 elements in a red/black tree that their sum equals that number in $\Theta(n)$ time and constant space. The original problem appears here, ...
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### Every AVL tree may be red black tree

I proved by induction that every AVL tree may be colored such that it will be red black tree. The problem is that I can't see an error in my proof. Look at my proof. Induction for height. Let's ...
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### Reb-black tree amortized cost of the rebalancing

I've read in different sources that the amortized cost of a red-black tree rebalancing is constant (at least during the tree creation using only insertions). How can it be proved?
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### Can a Red Black tree be constructed of only black nodes using RB insert only?

I am trying to construct a red black tree out of only black nodes. I know it is possible getting it after some deletions but I am trying to construct one only via insertion orders. Is it possible? I ...
353 views

### Left-Right-Rotation of AVL-Tree

For AVL-Tree there exists the following Rotations for Balancing: Left Rotation Right Rotation Left-Right Rotation Right-Left Rotation My Question is about the Naming for the Double-Rotations. ...
935 views

### Does the rebalancing propagate upwards only to update the height of the nodes in an AVL tree?

I was studying AVL trees and was wondering if the only reason one propagates upwards to the node in an insert is to change the height. It seems to me that rebalancing does not recursively propagate ...
### Why not use large $k$ in a $k$-ary tree?
Obviously binary trees are great because of $O(\log_2 n)$ search, inserts, and deletes in best case. To "maximize" occurrence of best case, we can use self-balancing trees like red-black trees, AVLs, ...
The worst case height of AVL tree is $1.44 \log n$. How do we prove that? I read somewhere about Fibonacci quicks but did not understand it.