Adiabatic Error Cancellation in Berry Phase Estimation

Abstract

In this work, we show that Berry phase estimation admits a natural and universal adiabatic error-cancellation mechanism, making it a promising candidate for practical quantum computing before full fault tolerance. Combining finite-runtime evolutions under H along the loop cancels the leading O(T-1) phase error exactly, and Richardson extrapolation further reduces the residual error to an oscillatory term with endpoint-controlled coefficient O(\| H(0)\|2(0)-4T-2). Beyond this deterministic cancellation, we establish that, for suitable smooth runtime distributions, runtime randomization suppresses the remaining oscillatory contribution to O(T-M) for any fixed M, leading to a randomized Hadamard-test algorithm for Berry phase estimation over the full range [0,2π) with improved runtime scaling under standard sample complexity.