Combinatorics, Hall's marriage theorem for bipartite graphs, where 2 vertices cannot be connected to

veirarer

veirarer

Answered question

2022-06-24

Combinatorics, Hall's marriage theorem for bipartite graphs, where 2 vertices cannot be connected to more than one common vertex from the other side
I have a problem I'm trying to solve. the problem is: given Bipartite graph G = ( A B , E ), where | A | = | B | = n > 100. and all edges are from A to B (all edges are symmetric), additionaly, lets assume that a 1 a 2 in A, | { b B : { a 1 , b } , { a 2 , b } E } | 1..
(in the original problem I had to prove it, which I actually did, So its a given now, you can also assume that the same applies with 2 vertices of B and one vertex from A if you need, just like the topic mentions ). Furthermore, the degree of every vertex in A is at least n 4 , prove that there is a perfect matching in the graph. any hints or solutions would be great, thanks in advance!. edit: Hey, I might've done a mistake by not telling an important information, the original question included the following assumption: assume that for each a 1 a 2 in A and for each b 1 b 2 in B at least one of the pairs { a 1 , b 1 } , { a 1 , b 2 } , { a 2 , b 1 } , { a 2 , b 2 } isn't an edge in the graph.

Answer & Explanation

pheniankang

pheniankang

Beginner2022-06-25Added 22 answers

Step 1
Your theorem is vacuously true, since there do not exist any bipartite graphs satisfying your conditions.
Assume that a graph exists satisfying all of your conditions. On the one hand, your graph has at least n/4 edges for each of the n vertices in A, so at least n × ( n / 4 ) edges in total. On the other hand, your graph has no cycles of length 3 or 4, which implies that it has at most ( 2 n ) 3 / 2 / 2 edges. For a proof of the general fact that a graph with |V| vertices and no 3-cycles or 4-cycles has at most 1 2 | V | 3 / 2 edges, see the citation at the end.
Step 2
Since n × ( n / 4 ) | E | ( 2 n ) 3 / 2 / 2, we conclude n 32, contradicting n 100.

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