A Converse for Fault-tolerant Quantum Computation

A Converse for Fault-tolerant Quantum Computation

Blog Article

As techniques for fault-tolerant quantum computation keep improving, it is natural to ask: what is the fundamental lower bound on space overhead? In this paper, we obtain a lower bound on the space overhead required for $epsilon$-accurate implementation of a large class of operations that includes unitary operators.For the practically relevant Silicone case of sub-exponential depth and sub-linear gate size, our bound on space overhead is tighter than the known lower bounds.We obtain this bound by connecting fault-tolerant computation with a set of finite blocklength quantum communication problems whose accuracy requirements satisfy a joint constraint.The lower bound on space overhead obtained here leads to a strictly smaller upper bound on the noise threshold for noise that are not degradable.

Our bound directly extends to the case where noise at the outputs of a gate are non-i.i.d.but noise Hen across gates are i.

i.d.