A known result due to Matthews and Sunner is that every \(2\)-connected claw-free graph on \(n\) vertices contains a cycle of length at least \(\min\{2\delta+4,n\}\), and is Hamiltonian if \(n \leq 3\delta+2\). In this paper, we show that every \(2\)-connected claw-free graph on \(n\) vertices which does not belong to one of three classes of exceptional graphs contains a cycle of length at least \(\min\{4\delta-2,n\}\), hereby generalizing several known results. Moreover, the bound \(4\delta-2\) is almost best possible.
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