Quantum error-correcting codes and 4-dimensional arithmetic hyperbolic manifolds

Published 21 Oct 2013 in math.DG | (1310.5555v1)

Abstract: Using 4-dimensional arithmetic hyperbolic manifolds, we construct some new homological quantum error correcting codes. They are LDPC codes with linear rate and distance $n^\epsilon$. Their rate is evaluated via Euler characteristic arguments and their distance using $\mathbb{Z}_2$-systolic geometry. This construction answers a queston of Z\'emor, who asked whether homological codes with such parameters could exist at all.