We introduce a new class of graphs which we call P-transitive graphs, lying between transitive and 3-transitive graphs. First we show that the analogue of de Jongh-Sambin Theorem is false for wellfounded P-transitive graphs; then we show that the µ-calculus fixpoint hierarchy is infinite for Ptransitive graphs. Both results contrast with the case of transitive graphs. We give also an undecidability result for an enriched µ-calculus on P-transitive graphs. Finally, we consider a polynomial time reduction from the model checking problem on arbitrary graphs to the model checking problem on P-transitive graphs. All these results carry over to 3-transitive graphs
AbstractBy definition, Cayley graphs are vertex-transitive, and graphs underlying regular or orienta...
The topic of the master's thesis comes from algebraic graph theory, where, among other things, we st...
AbstractThis paper completes the determination of all integers of the form pqr (where p, q, and r ar...
We introduce a new class of graphs which we call P-transitive graphs, lying between transitive and ...
We introduce a new class of graphs which we call P-transitive graphs, lying between transitive and 3...
A graph G is perfect matching transitive, shortly PM-transitive, if for any two perfect matchings M ...
Abstract: We consider the μ-calculus over graphs where the accessibility relation is an equivalence ...
AbstractThe conditions imposed by edge-transitivity and vertex-transitivity on the connectivity of s...
A CIS graph is a graph in which every maximal stable set and every maximal clique intersect. A graph...
The first part of this dissertation deals with highly symmetrical combinatorial structures - vertex ...
Abstract. We give a unified approach to analysing, for each positive integer s, a class of finite co...
It is well known that the Petersen graph, the Coxeter graph, as well as the graphs obtained from the...
In this thesis we explore ways to extend graphs to supergraphs that are vertex-transitive. We introd...
AbstractEvery 1-transitive finite or infinite graph is clearly both vertex-transitive and edge-trans...
A graph X is called vertex-transitive, edge-transitive, or arc-transitive, if the automorphism group...
AbstractBy definition, Cayley graphs are vertex-transitive, and graphs underlying regular or orienta...
The topic of the master's thesis comes from algebraic graph theory, where, among other things, we st...
AbstractThis paper completes the determination of all integers of the form pqr (where p, q, and r ar...
We introduce a new class of graphs which we call P-transitive graphs, lying between transitive and ...
We introduce a new class of graphs which we call P-transitive graphs, lying between transitive and 3...
A graph G is perfect matching transitive, shortly PM-transitive, if for any two perfect matchings M ...
Abstract: We consider the μ-calculus over graphs where the accessibility relation is an equivalence ...
AbstractThe conditions imposed by edge-transitivity and vertex-transitivity on the connectivity of s...
A CIS graph is a graph in which every maximal stable set and every maximal clique intersect. A graph...
The first part of this dissertation deals with highly symmetrical combinatorial structures - vertex ...
Abstract. We give a unified approach to analysing, for each positive integer s, a class of finite co...
It is well known that the Petersen graph, the Coxeter graph, as well as the graphs obtained from the...
In this thesis we explore ways to extend graphs to supergraphs that are vertex-transitive. We introd...
AbstractEvery 1-transitive finite or infinite graph is clearly both vertex-transitive and edge-trans...
A graph X is called vertex-transitive, edge-transitive, or arc-transitive, if the automorphism group...
AbstractBy definition, Cayley graphs are vertex-transitive, and graphs underlying regular or orienta...
The topic of the master's thesis comes from algebraic graph theory, where, among other things, we st...
AbstractThis paper completes the determination of all integers of the form pqr (where p, q, and r ar...