Pseudoentanglement Ain't Cheap
Abstract
We show that any pseudoentangled state ensemble with a gap of t bits of entropy requires (t) non-Clifford gates to prepare. This bound is tight up to polylogarithmic factors if linear-time quantum-secure pseudorandom functions exist. Our result follows from a polynomial-time algorithm to estimate the entanglement entropy of a quantum state across any cut of qubits. When run on an n-qubit state that is stabilized by at least 2n-t Pauli operators, our algorithm produces an estimate that is within an additive factor of t2 bits of the true entanglement entropy.
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