Cohomological Ramsey Theory

We show that the vanishing of certain cohomology groups of polyhedral complexes imply upper bounds on Ramsey numbers. Lovasz bounded the chromatic numbers of graphs using Hom complexes. Babson and Kozlov proved Lovasz conjecture and developed a Hom complex theory. We generalize the Hom complexes to Ramsey complexes. The main theorem states that if certain cohomology groups of the Ramsey complex Ram(dDelta_{p^k}, Sigma) are trivial, then the vertices of the simplicial complex Sigma cannot be n-colored such that every color correspond to a face of Sigma. In a corollary, we give an explicit description of the Ramsey complexes used for upper bounds on Ramsey numbers.