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But then you don't count the subgraphs with isolated vertices. My answer is (4 choose 1) + (4 choose 2)*(2^1) + (4 choose 3)*(2^3) + (4 choose 4)*(2^6). Try it.<br> | But then you don't count the subgraphs with isolated vertices. My answer is (4 choose 1) + (4 choose 2)*(2^1) + (4 choose 3)*(2^3) + (4 choose 4)*(2^6). Try it.<br> | ||
--[[User:Asuleime|Asuleime]] 14:17, 6 November 2008 (UTC) | --[[User:Asuleime|Asuleime]] 14:17, 6 November 2008 (UTC) | ||
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| + | The easiest way I think is to split it into cases where 4 vertices remain, 3 vertices remain... 1 vertex remains. It may seem like you are doing 4 times as much work, but if you know how many vertices remain, the problem becomes easy in each case. (See explanation above) | ||
Revision as of 14:09, 8 November 2008
Has anyone found a method for counting the number of subgraphs of W3 without actually drawing out every graph and counting them?
--Aoser 16:51, 3 November 2008 (UTC)
Yep, I found. Build the adjacency matrix for W3.
1) Consider (# of ways to choose i vertices), where i=1,2,3,4.
2) Also consider # of places for edges in each configuration (with 1, 2, 3, 4 vertices) - build the edge or not (2 choices).
3) Combine these using product & sum rules of counting.
Hope it helps
--Asuleime 22:45, 5 November 2008 (UTC)
I also thought of another way of doing this. Draw the graph with all the edges. (It should be a triangle with another vertex in the center, all connected.) Counting the edges, there are 6. Consider every edge to be a binary function of either on or off, therefore there are 2^6 - 1 ways when you subtract the null value graph.
But then you don't count the subgraphs with isolated vertices. My answer is (4 choose 1) + (4 choose 2)*(2^1) + (4 choose 3)*(2^3) + (4 choose 4)*(2^6). Try it.
--Asuleime 14:17, 6 November 2008 (UTC)
The easiest way I think is to split it into cases where 4 vertices remain, 3 vertices remain... 1 vertex remains. It may seem like you are doing 4 times as much work, but if you know how many vertices remain, the problem becomes easy in each case. (See explanation above)
