The structure of graphs with no K_(3,3) immersion

The Kuratowski-Wagner Theorem asserts that a graph is planar if and only if it does not have either $K_{3,3}$ or $K_5$ as a minor. Using this Wagner obtained a precise description of all graphs with no $K_{3,3}$ minor and all graphs with no $K_5$ minor. Similar results have been achieved for the class of graphs with no $H$-minor for a number of small graphs $H$. In this paper we give a precise structure theorem for graphs which do not contain $K_{3,3}$ as an immersion. This strengthens an earlier theorem of Giannopoulou, Kami\'{n}ski, and Thilikos that gives a rough description of the class of graphs with no $K_{3,3}$ or $K_5$ immersion.