Quantum error-correcting codes and 4-dimensional arithmetic hyperbolic manifolds
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 nε. Their rate is evaluated via Euler characteristic arguments and their distance using Z2-systolic geometry. This construction answers a queston of Z\'emor, who asked whether homological codes with such parameters could exist at all.
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