# Graph updating algorithm

I have a (un-directed) graph represented using adjacency lists, e.g.

``````a: b, c, e
b: a, d
c: a, d
d: b, c
e: a
``````

where each node of the graph is linked to a list of other node(s)

I want to update such a graph given some new list(s) for certain node(s), e.g.

``````a: b, c, d
``````

where `a` is no longer connected to `e`, and is connected to a new node `d`

What would be an efficient (both time and space wise) algorithm for performing such updates to the graph?

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If you plan to add and remove edges a lot, then you'll probably want to use adjacency sets instead of lists. –  Christian Mann Jul 22 '12 at 3:25

Using an adjacency grid would make it O(n) to update, but would take n^2 space, regardless of how sparse the graph is. (Trivially done by updating each changed relationship by inverting the row and column.)

Using lists would put the time up to O(n^2) for updating, but for sparse graphs would not take a huge time penalty, and would save a lot of space.

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I'm not good with data structures, but shouldn't an adjacency list only take O(2n) space? Each edge only appears twice overall. –  Waleed Khan Jul 22 '12 at 3:25
Number of possible edges is n^2, where you have n nodes. –  bdares Jul 22 '12 at 3:26
I see now, thanks. –  Waleed Khan Jul 22 '12 at 3:27
alternatively use an actual sparse matrix class which have O(n+2*nnz) storage, where nnz=number of edges. Plenty of Python implementations available, including scipy's. –  Adam Jul 22 '12 at 3:38
@bdares, thanks for the suggestions. isn't the adjacency grid thing you're proposing the same as an adjacency matrix? –  MLister Jul 22 '12 at 4:49

A typical update is `del edge a,e; add edge a,d`, but your update looks like a new adjacency list for vertex `a`. So simply find the `a` adjacency list and replace it. That should be O(log n) time (assuming sorted array of adjacency lists, like in your description).

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I don't know if that will suffice: won't the OP have to update the adjacency lists for `d` and `e` as well? –  DSM Jul 22 '12 at 3:40
@DSM, exactly, even though the provided list(s) may only be for a subset of nodes available, but the changes may affect beyond this subset of nodes. –  MLister Jul 22 '12 at 4:47

Maybe I'm missing something, but wouldn't it be fastest to use a dictionary (or default dict) of node-labels (strings or numbers) to sets? In this case update could look something like this:

``````def update(graph, node, edges, undirected=True):
# graph: dict(str->set(str)), node: str, edges: set(str), undirected: bool
if undirected:
for e in graph[node]:
graph[e].remove(node)
for e in edges: