Graph toughness

In graph theory, toughness is a measure of the connectivity of a graph. A graph $G$ is said to be $t$-tough for a given real number $t$ if, for every integer $k > 1$, $G$ cannot be split into $k$ different connected components by the removal of fewer than $tk$ vertices. For instance, a graph is $1$-tough if the number of components formed by removing a set of vertices is always at most as large as the number of removed vertices. The toughness of a graph is the maximum $t$ for which it is $t$-tough; this is a finite number for all finite graphs except the complete graphs, which by convention have infinite toughness.

Graph toughness was first introduced by. Since then there has been extensive work by other mathematicians on toughness; the recent survey by lists 99 theorems and 162 papers on the subject.

Examples
Removing $k$ vertices from a path graph can split the remaining graph into as many as $k + 1$ connected components. The maximum ratio of components to removed vertices is achieved by removing one vertex (from the interior of the path) and splitting it into two components. Therefore, paths are $1⁄2$-tough. In contrast, removing $k$ vertices from a cycle graph leaves at most $k$ remaining connected components, and sometimes leaves exactly $k$ connected components, so a cycle is $1$-tough.

Connection to vertex connectivity
If a graph is $t$-tough, then one consequence (obtained by setting $k = 2$) is that any set of $2t &minus; 1$ nodes can be removed without splitting the graph in two. That is, every $t$-tough graph is also $2t$-vertex-connected.

Connection to Hamiltonicity
observed that every cycle, and therefore every Hamiltonian graph, is $1$-tough; that is, being $1$-tough is a necessary condition for a graph to be Hamiltonian. He conjectured that the connection between toughness and Hamiltonicity goes in both directions: that there exists a threshold $t$ such that every $t$-tough graph is Hamiltonian. Chvátal's original conjecture that $t = 2$ would have proven Fleischner's theorem but was disproved by. The existence of a larger toughness threshold for Hamiltonicity remains open, and is sometimes called Chvátal's toughness conjecture.

Computational complexity
Testing whether a graph is $1$-tough is co-NP-complete. That is, the decision problem whose answer is "yes" for a graph that is not 1-tough, and "no" for a graph that is 1-tough, is NP-complete. The same is true for any fixed positive rational number $q$: testing whether a graph is $q$-tough is co-NP-complete.