Copositivity for a class of fourth order symmetric tensors given by scalar dark matter

In this paper, we mainly discuss the analytic expression of exact copositivity of 4th order symmetric tensor defined by the special physical model. We first show that for the general 4th order 2-dimensional symmetric tensor, it can be transformed into solving the quadratic polynomials, and then we give a necessary and sufficient condition to test the copositivity of 4th order 2-dimensional symmetric tensor. Based on this, we consider a special 4th order 3-dimensional symmetric tensor defined by the vacuum stability for Z3 scalar dark matter, and obtain the necessary and sufficient condition for its copositivity.

[1]  M. Raidal,et al.  Impact of semi-annihilations on dark matter phenomenology - an example of Z_N symmetric scalar dark matter , 2012, 1202.2962.

[2]  Zheng-Hai Huang,et al.  Test of copositive tensors , 2019, Journal of Industrial & Management Optimization.

[3]  Yisheng Song,et al.  Properties of Solution Set of Tensor Complementarity Problem , 2015, J. Optim. Theory Appl..

[4]  Zheng-Hai Huang,et al.  Formulating an n-person noncooperative game as a tensor complementarity problem , 2016, Comput. Optim. Appl..

[5]  Layne T. Watson,et al.  Positivity Conditions for Quartic Polynomials , 1994, SIAM J. Sci. Comput..

[6]  Liqun Qi,et al.  Tensor Complementarity Problem and Semi-positive Tensors , 2015, J. Optim. Theory Appl..

[7]  L. Qi,et al.  A necessary and sufficient condition of positive definiteness for 4th order symmetric tensors defined in particle physics. , 2020, 2011.11262.

[8]  L. Qi,et al.  Tensor Analysis: Spectral Theory and Special Tensors , 2017 .

[9]  Liqun Qi,et al.  Properties of Some Classes of Structured Tensors , 2014, J. Optim. Theory Appl..

[10]  K. Kannike Vacuum stability conditions from copositivity criteria , 2012, 1205.3781.

[11]  Liqun Qi,et al.  P-tensors, P0-tensors, and their applications , 2018, Linear Algebra and its Applications.

[12]  Liqun Qi,et al.  Column sufficient tensors and tensor complementarity problems , 2018 .

[13]  Liqun Qi,et al.  Eigenvalues of a real supersymmetric tensor , 2005, J. Symb. Comput..

[14]  M. Seetharama Gowda,et al.  Polynomial complementarity problems , 2016, 1609.05267.

[15]  Igor P. Ivanov,et al.  Classification of finite reparametrization symmetry groups in the three-Higgs-doublet model , 2012, 1210.6553.

[16]  Xueyong Wang,et al.  Solution structures of tensor complementarity problem , 2018, Frontiers of Mathematics in China.

[17]  Zheng-Hai Huang,et al.  Copositive tensor detection and its applications in physics and hypergraphs , 2018, Comput. Optim. Appl..

[18]  R. Balaji,et al.  Positive definite and Gram tensor complementarity problems , 2018, Optim. Lett..

[19]  V. Keus,et al.  Geometric minimization of highly symmetric potentials , 2012, 1211.4989.

[20]  Thomas W. Sederberg,et al.  Nonnegative quadratic Bézier triangular patches , 1994, Comput. Aided Geom. Des..

[21]  T. Elfving,et al.  Criteria for copositive matrices using simplices and barycentric coordinates , 1995 .

[22]  Tatsuo C. Kobayashi,et al.  Non-Abelian Discrete Symmetries in Particle Physics , 2010, 1003.3552.

[23]  L. Qi,et al.  Analytical expressions of copositivity for fourth-order symmetric tensors , 2019, Analysis and Applications.

[24]  Liqun Qi,et al.  Strictly semi-positive tensors and the boundedness of tensor complementarity problems , 2015, Optim. Lett..

[25]  Liqun Qi,et al.  Necessary and sufficient conditions for copositive tensors , 2013, 1302.6084.

[26]  Yiju Wang,et al.  High-order copositive tensors and its applications , 2018 .

[27]  Yisheng Song,et al.  Copositivity for 3rd-Order Symmetric Tensors and Applications , 2019, Bulletin of the Malaysian Mathematical Sciences Society.

[28]  Igor P. Ivanov,et al.  Discrete symmetries in the three-Higgs-doublet model , 2012, 1206.7108.

[29]  Yong Wang,et al.  Global Uniqueness and Solvability for Tensor Complementarity Problems , 2015, J. Optim. Theory Appl..

[30]  K. Kannike Erratum to: Vacuum stability of a general scalar potential of a few fields , 2018 .

[31]  E. Ma,et al.  Softly broken A(4) symmetry for nearly degenerate neutrino masses , 2001, hep-ph/0106291.

[32]  Jie Wang,et al.  Solution Sets of Quadratic Complementarity Problems , 2018, J. Optim. Theory Appl..

[33]  L. Qi Symmetric nonnegative tensors and copositive tensors , 2012, 1211.5642.

[34]  Liqun Qi,et al.  Tensor Eigenvalues and Their Applications , 2018 .

[35]  Yong Wang,et al.  Exceptionally regular tensors and tensor complementarity problems , 2015, Optim. Methods Softw..

[36]  Liqun Qi,et al.  Eigenvalue analysis of constrained minimization problem for homogeneous polynomial , 2016, J. Glob. Optim..

[37]  Yimin Wei,et al.  Positive-Definite Tensors to Nonlinear Complementarity Problems , 2015, J. Optim. Theory Appl..

[38]  Yisheng Song Positive definiteness for 4th order symmetric tensors and applications , 2020, Analysis and Mathematical Physics.

[39]  Zheng-Hai Huang,et al.  Copositivity Detection of Tensors: Theory and Algorithm , 2016, J. Optim. Theory Appl..

[40]  Yisheng Song,et al.  Structural Properties of Tensors and Complementarity Problems , 2018, J. Optim. Theory Appl..

[41]  K. Kannike Vacuum stability of a general scalar potential of a few fields , 2016, 1603.02680.

[42]  Yang Guo A necessary and sufficient condition for the positive definite problem of a binary quartic form , 2020 .

[43]  K. P. Hadeler,et al.  On copositive matrices , 1983 .

[44]  Xinzhen Zhang,et al.  A Complete Semidefinite Algorithm for Detecting Copositive Matrices and Tensors , 2017, SIAM J. Optim..

[45]  Naihua Xiu,et al.  The sparsest solutions to Z-tensor complementarity problems , 2015, Optim. Lett..

[46]  Edmond Nadler,et al.  Nonnegativity of bivariate quadratic functions on a triangle , 1992, Comput. Aided Geom. Des..

[47]  Liqun Qi,et al.  Properties of Tensor Complementarity Problem and Some Classes of Structured Tensors , 2014, 1412.0113.

[48]  Yimin Wei,et al.  Stochastic $$R_0$$R0 tensors to stochastic tensor complementarity problems , 2018, Optim. Lett..