Mathematics (Feb 2023)

Tighter Monogamy Relations for Concurrence and Negativity in Multiqubit Systems

  • Yuan-Hong Tao,
  • Kai Zheng,
  • Zhi-Xiang Jin,
  • Shao-Ming Fei

DOI
https://doi.org/10.3390/math11051159
Journal volume & issue
Vol. 11, no. 5
p. 1159

Abstract

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The entanglement in multipartite quantum system is hard to characterize and quantify, although it has been intensively studied in bipartite systems. The monogamy of entanglement, as a special property of multipartite systems, shows the distribution of entanglement in the system. In this paper, we investigate the monogamy relations for multi-qubit systems. By using two entangled measures, namely the concurrence C and the negativity Nc, we establish tighter monogamy inequalities for their α-th power than those in all the existing ones. We also illustrate the tightness of our results for some classes of quantum states.

Keywords