SDP bounds on quantum codes: rational certificates

Abstract

A fundamental problem in quantum coding theory is to determine the maximum size of quantum codes of given block length and distance. A recent work introduced bounds based on semidefinite programming, strengthening the well-known quantum linear programming bounds. However, floating-point inaccuracies prevent the extraction of rigorous non-existence proofs from the numerical methods. Here, we address this by providing rational infeasibility certificates for a range of quantum codes. Using a clustered low-rank solver with heuristic rounding to algebraic expressions, we can improve upon 18 upper bounds on the maximum size of n-qubit codes with 6 ≤ n ≤ 19. Our work highlights the practicality and scalability of semidefinite programming for quantum coding bounds.

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