Hamiltonicity of graphs perturbed by a random regular graph

Abstract: We study Hamiltonicity and pancyclicity in the graph obtained as the union of a deterministic n$$ n $$‐vertex graph H$$ H $$ with δfalse(Hfalse)≥αn$$ \delta (H)\ge \alpha n $$ and a random d$$ d $$‐regular graph G$$ G $$, for d∈false{1,2false}$$ d\in \left\{1,2\right\} $$. When G$$ G $$ is a random 2‐regular graph, we prove that a.a.s. H∪G$$ H\cup G $$ is pancyclic for all α∈false(0,1false]$$ \alpha \in \left(0,1\right] $$, and also extend our result to a range of sublinear degrees. When G$$ G $$ is a random 1… Show more

“…To the best of our knowledge, all of these results consider (hyper/di)graphs perturbed by a binomial random structure, such as $${G}_{n,p}$$, or its $${G}_{n,m}$$ counterpart. Only very recently, Espuny Díaz and Girão [12] considered Hamiltonicity in graphs perturbed by a random regular graph.…”

Hamiltonicity of graphs perturbed by a random geometric graph

“…To the best of our knowledge, all of these results consider (hyper/di)graphs perturbed by a binomial random structure, such as $${G}_{n,p}$$, or its $${G}_{n,m}$$ counterpart. Only very recently, Espuny Díaz and Girão [12] considered Hamiltonicity in graphs perturbed by a random regular graph.…”

Hamiltonicity of graphs perturbed by a random geometric graph

Powers of Hamilton cycles in dense graphs perturbed by a random geometric graph