# Is a node in a tree considered its own ancestor?

I'm wondering what the consensus is on the definition of "ancestor" in a computer science context.

I only ask because in Introduction to Algorithms, Second Edition, p. 259 there is a description of the algorithm `Tree-Successor(x)` that seems odd. In finding the successor of node x,

[...] if the right subtree of node x is empty and x has a successor y, then y is the lowest ancestor of x whose left child is also an ancestor of x.

In a binary search tree with a root having key `2` and children `1` and `3`, the successor of `1` is its parent `2`. In this case, x is the left child of x's successor, y. According to the book's definition, then, x must be its own ancestor, unless I'm missing something.

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So the song goes, youtube.com/watch?v=W7x1ETPkZsk –  harpo Jun 20 '10 at 4:49

It's merely a matter of definition, but in this case, yes. CLRS define an ancestor of x as any node on the unique path from the root to x, which by definition includes x.

The sentence fragment you quoted begins by mentioning exercise 12.2-6 on the next page, which specifies this:

(Recall that every node is its own ancestor.)

:-)

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its exercise 12.2-6 not 12.66 –  Ravi Gupta Jun 20 '10 at 4:35
This must be the most precise answer on the Web :D –  AraK Jun 20 '10 at 4:36

Is a node in a tree considered its own ancestor?

Not normally, AFAIK. For example, in the Wikipedia page on binary trees, ancestor is defined thus:

If a path exists from node p to node q, where node p is closer to the root node than q, then p is an ancestor of q and q is a descendant of p.

But apparently that text book's definition of ancestor is such that a node is its own ancestor. This definition is not exactly intuitive, but a textbook is free to introduce its own definitions for the terminology that it uses. Maybe this definition simplifies some of the related descriptions / theorems / etc.

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No, a node is not ancestor of itself. According to me it should be: if the right subtree of node x is empty and x has a successor y, then y is the lowest ancestor of x whose left child is `either x or an ancestor of x.` but the code given in the book supposedly handling such type of cases.

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