Genuine Multipartite Entanglement Measure Based on α-concurrence

Abstract

Quantifying genuine entanglement is a crucial task in quantum information theory. Based on the geometric mean of bipartite α-concurrences among all bipartitions, we present a class of well-defined genuine multipartite entanglement (GME) measures GαC with one parameter α for arbitrary multipartite states. We show that the GαC is of continuity for any multipartite pure states. By utilizing the related symmetry, analytical results of GαC are derived for any n-qubit GHZ states and W states, which show that the GHZ states are more genuinely entangled than the W states. With explicit examples, we demonstrate that the GαC can distinguish different GME states that other GME measures fail to. These results justify the potential applications of GαC in characterizing genuine multipartite entanglements.