Generalized Bell-like inequality and maximum violation for multiparticle entangled Schr\"odinger-cat-states of spin-s
Abstract
This paper proposes a generalized Bell-like inequality (GBI) for multiparticle entangled Schr\"odinger-cat--states of arbitrary spin-s. Based on quantum probability statistics the GBI and violation are formulated in an unified manner with the help of state density operator, which can be separated to local and non-local parts. The local part gives rise to the inequality, while the non-local part is responsible for the violation. The GBI is not violated at all by quantum average except the spin-1/2 entangled states. If the measuring outcomes are restricted in the subspace of spin coherent state (SCS), namely, only the maximum spin values s, the GBI is still meaningful for the incomplete measurement. With the help of SCS quantum probability statistics, it is proved that the violation of GBI can occur only for half-integer spins but not integer spins. Moreover, the maximum violation bound depends on the number parity of entangled particles, that it is 1/2 for the odd particle-numbers while 1 for even numbers.
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