A recursive approach for geometric quantifiers of quantum correlations in multiqubit Schr\"odinger cat states

Abstract

A recursive approach to determine the Hilbert-Schmidt measure of pairwise quantum discord in a special class of symmetric states of k qubits is presented. We especially focus on the reduced states of k qubits obtained from a balanced superposition of symmetric n-qubit states (multiqubit Schr\"odinger cat states) by tracing out n-k particles (k=2,3, ·s ,n-1). Two pairing schemes are considered. In the first one, the geometric discord measuring the correlation between one qubit and the party grouping (k-1) qubits is explicitly derived. This uses recursive relations between the Fano-Bloch correlation matrices associated with subsystems comprising k, k-1, ·s and 2 particles. A detailed analysis is given for two, three and four qubit systems. In the second scheme, the subsystem comprising the (k-1) qubits is mapped into a system of two logical qubits. We show that these two bipartition schemes are equivalents in evaluating the pairwise correlation in multi-qubits systems. The explicit expressions of classical states presenting zero discord are derived.