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?



Thus, to iterate over the adjacent vertices of The difference between BigO and BigTheta is that BigO is an upper bound, whereas BigTheta 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 BachmannLandau notations on wikipedia. 


I'm pretty sure 

