A Variant of the Bravyi-Terhal Bound for Arbitrary Boundary Conditions
Abstract
We present a modified version of the Bravyi-Terhal bound that applies to quantum codes defined by local parity-check constraints on a D-dimensional lattice quotient. Specifically, we consider a quotient ZD/ of ZD of cardinality n, where is some D-dimensional sublattice of ZD: we suppose that every vertex of this quotient indexes m qubits of a stabilizer code C, which therefore has length nm. We prove that if all stabilizer generators act on qubits whose indices lie within a ball of radius , then the minimum distance d of the code satisfies d ≤ mγD(D + 4)nD-1D whenever n1/D ≥ 8γD, where γD is the D-dimensional Hermite constant. We apply this bound to derive an upper bound on the minimum distance of Abelian Two-Block Group Algebra (2BGA) codes whose parity-check matrices have the form [A \, \, B] with each submatrix representing an element of a group algebra over a finite abelian group.
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