Peter Kronheimer

Harvard University

October 13, 2015

Given a trivalent graph embedded in 3-space, we associate to it an instanton homology group, which is a finite-dimensional $\mathbf{Z}/2$ vector space. The main result about the instanton homology is a non-vanishing theorem, proved using techniques from 3-dimensional topology: if the graph is bridgeless, its instanton homology is non-zero. It is not unreasonable to conjecture that, if the graph lies in the plane, the dimension of its instanton homology is equal to the number of Tait colorings of the graph (essentially the same as four-colorings of the planar regions that the graph defines). If the conjecture were to hold, then the non-vanishing theorem for instanton homology would imply the four-color theorem and would provide a human-readable proof. The first talk will provide some background and an outline of the proof of the non-vanishing theorem. The second talk will describe the properties of instanton homology as a functor on a category of "webs and foams", and will provide motivation for the conjecture relating the homology to Tait colorings.