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I was hoping to go through graph G composed of n nodes. And for each nth node open the dict of its neighbors. Find out which neighbor has the largest numeric attribute. There can be at least 100 neighbors. and return a list of each node and its largest neighbor i.e.


The attributes data for a node look like this:


{'type': 'a', 'pos': [0.76, 0.11]}

and the attribute I am interested in is



Does anyone know if this exists? Or if not does the starting logic look like a good starting point? or does a smarter person have a much better idea?

def thebiggestneighbor(G,attribute,nodes=None):

    if nodes is None:
        node_set = G
        node_set = G.subgraph(nodes)
    for u,nbrsdict in G.adjacency_iter():
        if u not in node_set:
            for v,eattr in nbrsdict.items():
          #  then something like this but for many nodes. probably better subtraction 
          #  of all nodes from each other and which one yeilds the biggest numner
          #  if x.[vattra] > x.[vattrb]  then
          #      a
          #  elif x.[vattra] < x.[vattrb] then
          #      b 

            yield (u,b)
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2 Answers 2

I like solving problems like this with the right datastructure:

#nodes = [ (att_n, [(att_n, n_idx).. ] ), ... ]  where each node is known by its index
#in the outer list. Each node is represented with a tuple: att_n the numeric attribute, 
#and a list of neighbors. Neighbors have their numeric attribute repeated
#eg. node 1 has neighbors 2, and 3. node 2 has neighbor 1 and 4, etc..: 
nodes = [ (192, [ (102, 2), (555, 3)] ), 
          (102, [ (192, 1), (333, 4) ] ), 
          (555, [ (192, 1),] ), ... 
#then to augment nodes so the big neighbor is visible:
nodesandbigneighbor=[ (att_n, neighbors, max(neighbors)) for att_n, neighbors in nodes]  

Also if you maintain the sort order of the neighbor lists from low numeric attribute to high, then then you can do:

nodesandbigneighbor=[ (att_n, neighbors, neighbors[-1]) for att_n, neighbors in nodes]  

which will be faster (at the expense of node insert time), but then you are effectively solving the problem at insert time.

share|improve this answer

I don't really see the problem, you would do a O(n*m) [n=nodes, m=avg(neighbors)] operation by iterating over all the nodes and foreach node iterating over its neighbors. Worst case it's a O(n^2). Also you have an indentation problem as most of your code is after a "continue" statement, so it wont be executed.

Code example

for u,nbrsdict in G.adjacency_iter():
    if u not in node_set:
    for v,eattr in nbrsdict.items():
        if vattr>max['value']:
return output
share|improve this answer
if you maintain the neighbors in lists sorted by numeric attribute, the problem becomes O(n). Though the time to add a node would be O(nlogn). –  Riaz Rizvi Apr 10 '12 at 0:07
thank you luke, im new to python so im trying out ypur code. for now its giving me an output not as i expected, i.e. for 20 nodes in G its giving me much more than a list 20 elemnts long.I will need to work on this... –  user1320502 Apr 10 '12 at 0:19

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