Cycles and paths through specified vertices in graphs with a given clique number
Abstract
B. Bollob\'as and G. Brightwell and independently R. Shi proved the existence of a cycle through all vertices whose degrees at least n2 in any 2-connected graph of order n. Motivated by this result, we prove the existence of a cycle through all vertices whose degrees at least n-ω in any 2-connected graph G of order n with clique number ω unless G is a specific graph. Moreover, we show that for any pair of vertices whose degrees are at least n-ω+1 in a graph G of order n with clique number ω, there exists a path joining them which contains all vertices of degree at least n-ω+1 unless G belongs to certain graph classes. In doing so, we prove the existence of a (u,v)-path through all vertices whose degrees at least n+12 in any graph of order n, where u,v are two distinct vertices of degree at least n+12.
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