Certifying entanglement dimensionality by random Pauli sampling
Abstract
We introduce a Pauli-measurement-based algorithm to certify the Schmidt number of n-qubit pure states. Our protocol achieves an average-case sample complexity of (poly(n)2), a substantial improvement over the (2n ) worst-case bound. By utilizing local pseudorandom unitaries, we ensure the worst case can be transformed into the average-case with high probability. This work establishes a scalable approach to high-dimensional entanglement certification and introduces a proof framework for random Pauli sampling.
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