167 research outputs found
Computational determination of (3,11) and (4,7) cages
A (k,g)-graph is a k-regular graph of girth g, and a (k,g)-cage is a
(k,g)-graph of minimum order. We show that a (3,11)-graph of order 112 found by
Balaban in 1973 is minimal and unique. We also show that the order of a
(4,7)-cage is 67 and find one example. Finally, we improve the lower bounds on
the orders of (3,13)-cages and (3,14)-cages to 202 and 260, respectively. The
methods used were a combination of heuristic hill-climbing and an innovative
backtrack search
Generation of cubic graphs
We describe a new algorithm for the efficient generation of all non-isomorphic connected cubic graphs. Our implementation of this algorithm is more than 4 times faster than previous generators. The generation can also be efficiently restricted to cubic graphs with girth at least 4 or 5
Generation of cubic graphs and snarks with large girth
We describe two new algorithms for the generation of all non-isomorphic cubic
graphs with girth at least which are very efficient for
and show how these algorithms can be efficiently restricted to generate snarks
with girth at least .
Our implementation of these algorithms is more than 30, respectively 40 times
faster than the previously fastest generator for cubic graphs with girth at
least 6 and 7, respectively.
Using these generators we have also generated all non-isomorphic snarks with
girth at least 6 up to 38 vertices and show that there are no snarks with girth
at least 7 up to 42 vertices. We present and analyse the new list of snarks
with girth 6.Comment: 27 pages (including appendix
Generation of Cubic Graphs
We describe a new algorithm for the efficient generation of all non-isomorphic connected cubic graphs. Our implementation of this algorithm is more than 4 times faster than previous generators. The generation can also be efficiently restricted to cubic graphs with girth at least 4 or 5
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