A 2-factorization of a simple graph $Gamma$ is called 2-pyramidal if it admits an automorphism group G fixing two vertices and acting sharply transitively on the others. Here we show that such a 2-factorization may exist only if $Gamma$ is a cocktail party graph, i.e., $Gamma = K_{2n} − I$ with I being a 1-factor. It will be said of the first or second type according to whether the involutions of G form a unique conjugacy class or not. As far as we are aware, 2-factorizations of the second type are completely new. We will prove, in particular, that $K_{2n} − I$ admits a 2-pyramidal 2-factorization of the second type if and only if n ≡ 1 (mod 8)
We introduce the concept of a 2-starter in a group G of odd order. We prove that any 2-factorization...
AbstractWe introduce the concept of a 2-starter in a group G of odd order. We prove that any 2-facto...
The existence problem for a Hamiltonian cycle decomposition of $K_{2n} − I$ (the so called cocktail ...
A 2-factorization of a simple graph $\Gamma$ is called 2-pyramidal if it admits an automorphism grou...
We consider 2-factorizations of complete graphs that possess an automorphism group fixing k≥0 vertic...
We consider 2-factorizations of the complete graph Kv whose automorphism group is ”rich” in some sen...
AbstractLet F be a 2-factorization of the complete graph Kv admitting an automorphism group G acting...
Let F be a 2-factorization of the complete graph Kv admitting an automorphism group G acting primiti...
A Hamiltonian cycle system of the complete graph minus a 1 factor K-2v - I (briefly, an HCS(2v)) is ...
Let F be a 2-factorization of the complete graph Kv admitting an automorphism group G acting doubly ...
AbstractLet F be a 2-factorization of the complete graph Kv admitting an automorphism group G acting...
Let be a 2-factorization of the complete graph Kv admitting an automorphism group G acting doubly t...
We introduce the concept of a 2-starter in a group G of odd order. We prove that any 2-factorizatio...
We introduce the concept of a 2-starter in a group G of odd order. We prove that any 2-factorization...
AbstractWe introduce the concept of a 2-starter in a group G of odd order. We prove that any 2-facto...
The existence problem for a Hamiltonian cycle decomposition of $K_{2n} − I$ (the so called cocktail ...
A 2-factorization of a simple graph $\Gamma$ is called 2-pyramidal if it admits an automorphism grou...
We consider 2-factorizations of complete graphs that possess an automorphism group fixing k≥0 vertic...
We consider 2-factorizations of the complete graph Kv whose automorphism group is ”rich” in some sen...
AbstractLet F be a 2-factorization of the complete graph Kv admitting an automorphism group G acting...
Let F be a 2-factorization of the complete graph Kv admitting an automorphism group G acting primiti...
A Hamiltonian cycle system of the complete graph minus a 1 factor K-2v - I (briefly, an HCS(2v)) is ...
Let F be a 2-factorization of the complete graph Kv admitting an automorphism group G acting doubly ...
AbstractLet F be a 2-factorization of the complete graph Kv admitting an automorphism group G acting...
Let be a 2-factorization of the complete graph Kv admitting an automorphism group G acting doubly t...
We introduce the concept of a 2-starter in a group G of odd order. We prove that any 2-factorizatio...
We introduce the concept of a 2-starter in a group G of odd order. We prove that any 2-factorization...
AbstractWe introduce the concept of a 2-starter in a group G of odd order. We prove that any 2-facto...
The existence problem for a Hamiltonian cycle decomposition of $K_{2n} − I$ (the so called cocktail ...