Nonstabilizerness of Permutationally Invariant Systems
Abstract
Typical measures of nonstabilizerness of a system of N qubits require computing 4N expectation values, one for each Pauli string in the Pauli group, over a state of dimension 2N. For permutationally invariant systems, this exponential overhead can be reduced to just O(N3) expectation values on a state with a dimension O(N). We exploit this simplification to study the nonstabilizerness phase transitions of systems with hundreds of qubits.
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