# What does Θ(deg(u)) mean?

I have never heard this before, or maybe I have heard it in other terms?
The context is that for adjacency lists, the time to list all vertices adjacent to u is `Θ(deg(u))`.
Similarly, the time to determine whether (u,v)∈ E is `O(deg(u))`.
If the implementation of the adjacency list is an array, then I assume it would be constant time to find u in the array.
If all adjacent vertices are linked to u, then I believe it would take `O(n)` time to list or find all vertices, where n is the number of adjacent vertices.
Is that essentially what `Θ(deg(u))` means?

-
I this a programming question cus I can't really tell.Forgive me for my noobness. –  Bastardo Jul 25 '11 at 18:51
This is more mathematical than programming, but fits securely within basic theoretical CS and so SO is more appropriate than say Math or Theory in my opinion. –  shelhamer Jul 25 '11 at 18:52
I was debating where to post it because it is more math oriented, but I hope that this is the right place. –  A D Jul 25 '11 at 18:53
Thank you for explanations. –  Bastardo Jul 25 '11 at 18:58
possible duplicate of What is the difference between Θ(n) and O(n)? –  Gilles Feb 3 '12 at 15:27

`Θ(deg(u))` = Big-Theta of the degree of `u` = the time is tightly-bounded (bounded from above and below) by the degree of vertices. In the case of an adjacency-list representation of the graph, the degree of a vertex `u` is `|adj[u]|` the size of the list for `u`.

Thus, to iterate over the adjacent vertices of `u` by an adjacency list is tightly-bound to the number of vertices adjacent to `u` (algorithmic facts sound redundant sometimes, don't they?).

The difference between Big-O and Big-Theta is that Big-O is an upper bound, whereas Big-Theta states a tight bound from above and below. That is, the same expression serves as a bound, but with a different coefficient m and x0. See the family of Bachmann-Landau notations on wikipedia.

-
I'm pretty sure `deg(u)` means "the degree of `u`", i.e. the number of edges that contain `u`. In an adjacency list representation, that number will also be the size of the adjacency list for `u`, so iterating it requires `Θ(|list|)`, which is `Θ(deg(u))`.