Low independence number and Hamiltonicity implies pancyclicity
Abstract
A graph on n vertices is called pancyclic if it contains a cycle of every length 3 l n. Given a Hamiltonian graph G with independence number at most k we are looking for the minimum number of vertices f(k) that guarantees that G is pancyclic. The problem of finding f(k) was raised by Erdos in 1972 who showed that f(k) 4k4, and conjectured that f(k)=(k2). Improving on a result of Lee and Sudakov we show that f(k)=O(k11/5).
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