Exterior powers of the adjoint representation and the Weyl ring of E8

Abstract

I derive explicitly all polynomial relations in the character ring of E8 of the form k e8 - pk (1, …, 8)=0, where k e8 is an arbitrary exterior power of the adjoint representation and i is the i th fundamental character. This has simultaneous implications for the theory of relativistic integrable systems, Seiberg-Witten theory, quantum topology, orbifold Gromov-Witten theory, and the arithmetic of elliptic curves. The solution is obtained by reducing the problem to a (large, but finite) dimensional linear problem, which is amenable to an efficient solution via distributed computation.