Related references
Note: Only part of the references are listed.Entanglement classification and invariant-based entanglement measures
Xiangrong Li et al.
PHYSICAL REVIEW A (2015)
Quantifying entanglement of arbitrary-dimensional multipartite pure states in terms of the singular values of coefficient matrices
Hui Li et al.
PHYSICAL REVIEW A (2013)
Polynomial invariants of degree 4 for even-n qubits and their applications in entanglement classification
Xiangrong Li et al.
PHYSICAL REVIEW A (2013)
Classification of Multipartite Entanglement of All Finite Dimensionality
Gilad Gour et al.
PHYSICAL REVIEW LETTERS (2013)
Detecting genuine multipartite correlations in terms of the rank of coefficient matrix
Bo Li et al.
JOURNAL OF PHYSICS A-MATHEMATICAL AND THEORETICAL (2012)
An algebraic classification of entangled states
Roman V. Buniy et al.
JOURNAL OF PHYSICS A-MATHEMATICAL AND THEORETICAL (2012)
Method for classifying multiqubit states via the rank of the coefficient matrix and its application to four-qubit states
Xiangrong Li et al.
PHYSICAL REVIEW A (2012)
Classification of multipartite entanglement via negativity fonts
S. Shelly Sharma et al.
PHYSICAL REVIEW A (2012)
Multipartite-entanglement monotones and polynomial invariants
Christopher Eltschka et al.
PHYSICAL REVIEW A (2012)
Classification of General n-Qubit States under Stochastic Local Operations and Classical Communication in Terms of the Rank of Coefficient Matrix
Xiangrong Li et al.
PHYSICAL REVIEW LETTERS (2012)
Polynomial invariants for discrimination and classification of four-qubit entanglement
Oliver Viehmann et al.
PHYSICAL REVIEW A (2011)
Four-Qubit Entanglement Classification from String Theory
L. Borsten et al.
PHYSICAL REVIEW LETTERS (2010)
On polynomial invariants of several qubits
D. Z. Dokovic et al.
JOURNAL OF MATHEMATICAL PHYSICS (2009)
Classification of four-qubit states by means of a stochastic local operation and the classical communication invariant and semi-invariants
Dafa Li et al.
PHYSICAL REVIEW A (2007)
Discussion of the entanglement classification of a 4-qubit pure state
Y. Cao et al.
EUROPEAN PHYSICAL JOURNAL D (2007)
Inductive entanglement classification of four qubits under stochastic local operations and classical communication
L. Lamata et al.
PHYSICAL REVIEW A (2007)
Stochastic local operations and classical communication invariant and the residual entanglement for n qubits
Dafa Li et al.
PHYSICAL REVIEW A (2007)
On the geometry of four-qubit invariants
Peter Levay
JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL (2006)
Entanglement monotones and maximally entangled states in multipartite qubit systems
Andreas Osterloh et al.
INTERNATIONAL JOURNAL OF QUANTUM INFORMATION (2006)
Measuring polynomial invariants of multiparty quantum states
MS Leifer et al.
PHYSICAL REVIEW A (2004)
Classification of multipartite entangled states by multidimensional determinants
A Miyake
PHYSICAL REVIEW A (2003)
Four qubits can be entangled in nine different ways
F Verstraete et al.
PHYSICAL REVIEW A (2002)
Three qubits can be entangled in two inequivalent ways -: art. no. 062314
W Dür et al.
PHYSICAL REVIEW A (2000)