An edge of $G$ is singular if it does not lie on any triangle of $G$; otherwise, it is non-singular. A vertex $u$ of a graph $G$ is called locally connected if the induced subgraph $G[N(u)]$ by its neighborhood is connected; otherwise, it is called locally disconnected. In this paper, we prove that if a connected claw-free graph $G$ of order at least three satisfies the following two conditions: (i) for each locally disconnected vertex $v$ of degree at least $3$ in $G,$ there is a nonnegative integer $s$ such that $v$ lies on an induced cycle of length at least $4$ with at most $s$ non-singular edges and with at least $s-5$ locally connected vertices; (ii) for each locally disconnected vertex $v$ of degree $2$ in $G,$ there is a nonnegative integer $s$ such that $v$ lies on an induced cycle $C$ with at most $s$ non-singular edges and with at least $s-3$ locally connected vertices and such that $G[V (C)\cap V_{2} (G)]$ is a path or a cycle, then $G$ has a 2-factor, and it is the best possible in some sense. This result generalizes two known results in Faudree, Faudree and Ryjáček (2008) and in Ryjáček, Xiong and Yoshimoto (2010).
The article presents the ‘Integrated Comparative Literature’ project, part of the broader ‘Integrated Comparative Studies in the Humanities’, linking together research on literature, history, sociology, anthropology, and even aesthetics. Comparative research on literature, which the author considers chiefly a part of territorial studies, considerably extends the methodological perspective, going beyond the traditionally ‘pure’ areas of the humanities. The traditional functions of literature, as well as genres and sub-genres, has been changing as a result of globalization, the predominance of the World Wide Web, and the formation of new centres, altering the relations both within a culture and amongst different cultures, including literature.