New conjecture on exact Dirac zero-modes of lattice fermions

Abstract

We propose a new conjecture on the relation between the species doubling of lattice fermions and the topology of manifold on which the fermion action is defined. Our conjecture claims that the maximal number of fermion species on a finite-volume and finite-spacing lattice defined by discretizing a D-dimensional manifold is equal to the summation of the Betti numbers of the manifold. We start with reconsidering species doubling of naive fermions on the lattices whose topologies are torus (TD), hyperball (BD) and their direct-product space (TD × Bd). We find that the maximal number of species is in exact agreement with the sum of Betti numbers ΣDr=0 βr for these manifolds. Indeed, the 4D lattice fermion on torus has up to 16 species while the sum of Betti numbers of T4 is 16. This coincidence holds also for the D-dimensional hyperball and their direct-product space TD × Bd. We study several examples of lattice fermions defined on discretized hypersphere (SD), and find that it has up to 2 species, which is the same number as the sum of Betti numbers of SD. From these facts, we conjecture the equivalence of the maximal number of fermion species and the summation of Betti numbers. We discuss a program for proof of the conjecture in terms of Hodge theory and spectral graph theory.