A degeneracy bound for homogeneous topological order

Abstract

We introduce a notion of homogeneous topological order, which is obeyed by most, if not all, known examples of topological order including fracton phases on quantum spins (qudits). The notion is a condition on the ground state subspace, rather than on the Hamiltonian, and demands that given a collection of ball-like regions, any linear transformation on the ground space be realized by an operator that avoids the ball-like regions. We derive a bound on the ground state degeneracy D for systems with homogeneous topological order on an arbitrary closed Riemannian manifold of dimension d, which reads \[ D c μ (L/a)d-2.\] Here, L is the diameter of the system, a is the lattice spacing, and c is a constant that only depends on the isometry class of the manifold, and μ is a constant that only depends on the density of degrees of freedom. If d=2, the constant c is the (demi)genus of the space manifold. This bound is saturated up to constants by known examples.