Add to ORKGAbstract. For many of the unsolved problems concerning cycles and matchings in graphs it is known that it is sufficient to prove them for snarks, the class of nontrivial 3-regular graphs which cannot be 3-edge coloured. In the first part of this paper we present a new algorithm for gener-ating all non-isomorphic snarks of a given order. Our implementation of the new algorithm is 14 times faster than previous programs for gen-erating snarks, and 29 times faster for generating weak snarks. Using this program we have generated all non-isomorphic snarks on n ≤ 36 vertices. Previously lists up to n = 28 vertices have been published. In the second part of the paper we analyze the sets of generated snarks with respect to a number of properties and...
Bicritical snarks are the irreducible ones with respect to the reductions considered by Nedela and ...
AbstractThe total-chromatic number χT(G) is the least number of colours needed to colour the vertice...
This work deals with the construction of snarks, that is, cubic graphs that cannot be 3-edge-colored...
For a number of unsolved problems in graph theory such as the cycle double cover conjecture, Fulkers...
We report the most relevant results on the classification, up to isomorphism, of nontrivial simple u...
In this paper we survey recent results and problems of both theoretical and algorithmic character on...
Abstract. In this note we construct two infinite snark families which have high oddness and low circ...
AbstractSnarks are nontrivial cubic graphs whose edges cannot be colored with three colors. Jaeger a...
AbstractIn this paper vertex-reductions of snarks are considered. Each reduction naturally divides t...
A snark is a bridgeless cubic graph which is not 3-edge-colourable. The oddness of a bridgeless cubi...
AbstractA snark is a cubic graph with no proper 3-edge-colouring. In 1996, Nedela and Škoviera prove...
AbstractA snark is a “nontrivial” cubic graph whose edges cannot be properly coloured by three colou...
AbstractSnarks are cyclically 4-edge-connected cubic graphs with girth at least 5 and with no 3-edge...
A snark is a cubic cyclically 4-edge connected graph with edge chromatic number four and girth at ...
We study snarks whose edges cannot be covered by fewer than ve perfect matchings. Esperet and Mazzuo...
Bicritical snarks are the irreducible ones with respect to the reductions considered by Nedela and ...
AbstractThe total-chromatic number χT(G) is the least number of colours needed to colour the vertice...
This work deals with the construction of snarks, that is, cubic graphs that cannot be 3-edge-colored...
For a number of unsolved problems in graph theory such as the cycle double cover conjecture, Fulkers...
We report the most relevant results on the classification, up to isomorphism, of nontrivial simple u...
In this paper we survey recent results and problems of both theoretical and algorithmic character on...
Abstract. In this note we construct two infinite snark families which have high oddness and low circ...
AbstractSnarks are nontrivial cubic graphs whose edges cannot be colored with three colors. Jaeger a...
AbstractIn this paper vertex-reductions of snarks are considered. Each reduction naturally divides t...
A snark is a bridgeless cubic graph which is not 3-edge-colourable. The oddness of a bridgeless cubi...
AbstractA snark is a cubic graph with no proper 3-edge-colouring. In 1996, Nedela and Škoviera prove...
AbstractA snark is a “nontrivial” cubic graph whose edges cannot be properly coloured by three colou...
AbstractSnarks are cyclically 4-edge-connected cubic graphs with girth at least 5 and with no 3-edge...
A snark is a cubic cyclically 4-edge connected graph with edge chromatic number four and girth at ...
We study snarks whose edges cannot be covered by fewer than ve perfect matchings. Esperet and Mazzuo...
Bicritical snarks are the irreducible ones with respect to the reductions considered by Nedela and ...
AbstractThe total-chromatic number χT(G) is the least number of colours needed to colour the vertice...
This work deals with the construction of snarks, that is, cubic graphs that cannot be 3-edge-colored...