We say that a graph is t-tough if by deleting a set if vertices $S$, the resulting graph will have at most $|S|/t$ connected components. We say that a graph is minimally t-tough if the deletion of an edge results in a non-t-tough graph. It is conjectured by Kriessel that every minimally $1$-tough graph has a vertex of order two (see http://iti.zcu.cz/history/2003/Hajek/problems/hajek-problems.ps). In other words, in minimally $1$-tough graphs, there is a local reason for not being tougher. (Deleting the endpoints of a vertex of order two results in two components, demonstrating that the graph is at most $1$-tough.) In the spirit of Kriessel's conjecture I have the following (hopefully easier) question.
Question: Is it true that there exists $ \varepsilon >0 $ such that any minimally $\varepsilon$-tough graph has a vertex of degree $1$?
