Abstract
GHZ paradoxes are presented for all even numbers of qubits from four up. They are obtained from proofs of the Kochen–Specker (KS) theorem by showing how the assumption of noncontextuality can be justified on the basis of locality. The nature of the entangled states involved in our paradoxes is discussed. Some multiqubit proofs of the KS theorem are also presented in the form of diagrams from which they are visually obvious. The implications of our results are discussed. ► Presents a new infinite class of GHZ paradoxes. ► Points out a new class of entangled states connected with the paradoxes. ► Presents new proofs of the Kochen–Specker theorem.
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