On a conjecture of Cox and Katz

A functoriality property of the virtual fundamental class on the moduli of stable maps is proven. The property is used to supply a proof of a conjecture of Cox, Katz and Lee.

This article is motivated by a conjecture of Thomassen and Toft on the number s 2 (G) of separating vertex sets of cardinality 2 and the number v 2 (G) of vertices of degree 2 in a graph G belonging to the class G of all 2-connected graphs without nonseparating induced cycles. Let G denote the numbe

## Abstract Wang and Williams defined a __threshold assignment__ for a graph __G__ as an assignment of a non‐negative weight to each vertex and edge of __G__, and a threshold __t__, such that a set __S__ of vertices is stable if and only if the total weight of the subgraph induced by __S__ does not

## Abstract It is shown that, for all sufficiently large __k__, the complete graph __K~n~__ can be decomposed into __k__ factors of diameter 2 if and only if __n__ ≥ 6__k__.