相关参考文献
注意:仅列出部分参考文献,下载原文获取全部文献信息。A modified Newton iteration for finding nonnegative Z-eigenpairs of a nonnegative tensor
Chun-Hua Guo et al.
NUMERICAL ALGORITHMS (2019)
A homotopy method for computing the largest eigenvalue of an irreducible nonnegative tensor
Liping Chen et al.
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS (2019)
Geometric measures of entanglement in multipartite pure states via complex-valued neural networks
Maolin Che et al.
NEUROCOMPUTING (2018)
How entangled can a multi-party system possibly be?
Liqun Qi et al.
PHYSICS LETTERS A (2018)
MOST BOSON QUANTUM STATES ARE ALMOST MAXIMALLY ENTANGLED
Shmuel Friedland et al.
PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY (2018)
Accurate calculation of the geometric measure of entanglement for multipartite quantum states
Peiyuan Teng
QUANTUM INFORMATION PROCESSING (2017)
COMPUTING TENSOR EIGENVALUES VIA HOMOTOPY METHODS
Liping Chen et al.
SIAM JOURNAL ON MATRIX ANALYSIS AND APPLICATIONS (2016)
Computing the geometric measure of entanglement of multipartite pure states by means of non-negative tensors
Shenglong Hu et al.
PHYSICAL REVIEW A (2016)
Z-eigenpair bounds for an irreducible nonnegative tensor
Wen Li et al.
LINEAR ALGEBRA AND ITS APPLICATIONS (2015)
Geometric measure of quantum discord for entanglement of Dirac fields in noninertial frames
Wen-Chao Qiang et al.
PHYSICS LETTERS B (2015)
Upper bound for the largest Z-eigenvalue of positive tensors
Jun He et al.
APPLIED MATHEMATICS LETTERS (2014)
AN ADAPTIVE SHIFTED POWER METHOD FOR COMPUTING GENERALIZED TENSOR EIGENPAIRS
Tamara G. Kolda et al.
SIAM JOURNAL ON MATRIX ANALYSIS AND APPLICATIONS (2014)
ALL REAL EIGENVALUES OF SYMMETRIC TENSORS
Chun-Feng Cui et al.
SIAM JOURNAL ON MATRIX ANALYSIS AND APPLICATIONS (2014)
Block tensors and symmetric embeddings
Stefan Ragnarsson et al.
LINEAR ALGEBRA AND ITS APPLICATIONS (2013)
Some variational principles for Z-eigenvalues of nonnegative tensors
K. C. Chang et al.
LINEAR ALGEBRA AND ITS APPLICATIONS (2013)
Finding the extreme Z-eigenvalues of tensors via a sequential semidefinite programming method
Shenglong Hu et al.
NUMERICAL LINEAR ALGEBRA WITH APPLICATIONS (2013)
A survey on the spectral theory of nonnegative tensors
Kungching Chang et al.
NUMERICAL LINEAR ALGEBRA WITH APPLICATIONS (2013)
SHIFTED POWER METHOD FOR COMPUTING TENSOR EIGENPAIRS
Tamara G. Kolda et al.
SIAM JOURNAL ON MATRIX ANALYSIS AND APPLICATIONS (2011)
Matrix permanent and quantum entanglement of permutation invariant states
Tzu-Chieh Wei et al.
JOURNAL OF MATHEMATICAL PHYSICS (2010)
The geometric measure of multipartite entanglement and the singular values of a hypermatrix
Joseph J. Hilling et al.
JOURNAL OF MATHEMATICAL PHYSICS (2010)
All maximally entangled four-qubit states
Gilad Gour et al.
JOURNAL OF MATHEMATICAL PHYSICS (2010)
The geometric measure of entanglement for a symmetric pure state with non-negative amplitudes
Masahito Hayashi et al.
JOURNAL OF MATHEMATICAL PHYSICS (2009)
Most Quantum States Are Too Entangled To Be Useful As Computational Resources
D. Gross et al.
PHYSICAL REVIEW LETTERS (2009)
Geometric measure of entanglement for symmetric states
Robert Huebener et al.
PHYSICAL REVIEW A (2009)
Z-eigenvalue methods for a global polynomial optimization problem
Liqun Qi et al.
MATHEMATICAL PROGRAMMING (2009)
Equivalence of critical scaling laws for many-body entanglement in the Lipkin-Meshkov-Glick model
Roman Orus et al.
PHYSICAL REVIEW LETTERS (2008)
Eigenvalues and invariants of tensors
Liqun Qi
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS (2007)
Eigenvalues of a real supersymmetric tensor
LQ Qi
JOURNAL OF SYMBOLIC COMPUTATION (2005)
Geometric measure of entanglement and applications to bipartite and multipartite quantum states
TC Wei et al.
PHYSICAL REVIEW A (2003)
A one-way quantum computer
R Raussendorf et al.
PHYSICAL REVIEW LETTERS (2001)
分享论文
