Local Quantum Codes from Subdivided Manifolds
Abstract
For n 3, we demonstrate the existence of quantum codes which are local in dimension n with V qubits, distance Vn-1n, and dimension Vn-2n, up to a polylog(V) factor. The distance is optimal up to the polylog factor. The dimension is also optimal for this distance up to the polylog factor. The proof combines the existence of asymptotically good quantum codes, a procedure to build a manifold from a code by Freedman-Hastings, and a quantitative embedding theorem by Gromov-Guth.
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