An algebraic characterization of stability groups

## Abstract A cycle in a graph is a set of edges that covers each vertex an even number of times. A cocycle is a collection of edges that intersects each cycle in an even number of edges. A bicycle is a collection of edges that is both a cycle and a cocycle. The cycles, cocycles, and bicycles each

## Abstract We give a detailed algebraic characterization of when a graph __G__ can be imbedded in the projective plane. The characterization is in terms of the existence of a dual graph __G__\* on the same edge set as __G__, which satisfies algebraic conditions inspired by homology groups and inte

He thanks both the CNR for its generous support and Roma II for its hospitality. The author also thanks Richard Mosak for reading an earlier version of the paper as well as the referee for a number of remarks which have smoothed out the exposition. 20