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Linear and Multilinear Algebra Volume 63, 2015 - Issue 2
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Articles

New results on the cp-rank and related properties of co(mpletely )positive matrices

Naomi Shaked-MondererDepartment of Economics, The Max Stern Yezreel Valley College, Yezreel Valley, Israel.Correspondence[email protected]
,
Abraham BermanDepartment of Mathematics, Technion, Haifa, Israel.
,
Immanuel M. BomzeISOR, University of Vienna, Vienna, Austria.
,
Florian JarreMathematisches Institut, University of Düsseldorf, Düsseldorf, Germany.
&
Werner SchachingerISOR, University of Vienna, Vienna, Austria.
Pages 384-396 | Received 27 Apr 2013, Accepted 19 Nov 2013, Published online: 12 Feb 2014

References

  • Bomze IM. Copositive optimization – recent developments and applications. Eur. J. Oper. Res. 2012;216:509–520.
  • Bomze IM, Schachinger W, Uchida G. Think co(mpletely )positive ! Matrix properties, examples and a clustered bibliography on copositive optimization. J. Global Optim. 2012;52:423–445.
  • Burer S. Copositive programming. In: Anjos MF, Lasserre JB, editors. Handbook of semidefinite, cone and polynomial optimization: theory, algorithms, software and applications. International series in operations research and management science. New York (NY): Springer; 2012. p. 201–218.
  • Dür M. Copositive programming – a survey. In: Diehl M, Glineur F, Jarlebring E, Michiels W, editors. Recent advances in optimization and its applications in engineering. Berlin: Springer; 2010. p. 3–20.
  • Berman A, Shaked-Monderer N. Completely positive matrices. River Edge (NJ): World Scientific; 2003.
  • Shaked-Monderer N, Bomze IM, Jarre F, Schachinger W. On the cp-rank and minimal cp factorizations of a completely positive matrix. SIAM J. Matrix Anal. Appl. 2013;34:355–368.
  • Drew JH, Johnson CR, Loewy R. Completely positive matrices associated with M-matrices. Linear Multilinear Algebra. 1994;37:303–310.
  • Barioli F, Berman A. The maximal cp-rank of rank k completely positive matrices. Linear Algebra Appl. 2003;363:17–33.
  • Drew JH, Johnson CR. The no long odd cycle theorem for completely positive matrices. In: Aldous D, Pemantle R, editors. Random discrete structures. Vol. 76, IMA volumes in Mathematics and its Applications. New York (NY): Springer; 1996. p. 103–115.
  • Berman A, Shaked-Monderer N. Remarks on completely positive matrices. Linear Multilinear Algebra. 1998;44:149–163.
  • Loewy R, Tam B-S. CP rank of completely positive matrices of order 5. Linear Algebra Appl. 2003;363:161–176.
  • Hildebrand R. The extremal rays of the 5 × 5 copositive cone. Linear Algebra Appl. 2012;437:1538–1547.
  • Diananda PH. On non-negative forms in real variables some or all of which are non-negative. Proc. Cambridge Philos. Soc. 1962;58:17–25.
  • Hall M Jr, Newman M. Copositive and completely positive quadratic forms. Proc. Cambridge Philos. Soc. 1963;59:329–339.
  • Kaykobad M. On nonnegative factorization of matrices. Linear Algebra Appl. 1987;96:27–33.
  • Dickinson PJC. An improved characterisation of the interior of the completely positive cone. Electron. J. Linear Algebra. 2010;20:723–729.
  • Dür M, Still G. Interior points of the completely positive cone. Electron. J. Linear Algebra. 2008;17:48–53.
  • Shaked-Monderer N. A note on upper bounds on the cp-rank. Linear Algebra Appl. 2009;431:2407–2413.

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