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Indecomposable Positive Maps in Matrix Algebras

  • Tanahashi K
  • Tomiyama J
Canadian Mathematical Bulletin (1988) 31(3) 308-317
DOI: 10.4153/cmb-1988-044-4
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Abstract

We prove that Choi's map in M 3 cannot be written as the sum of a 2-positive map and a 2-copositive map. We also provide other examples of positive maps in M n which cannot be written as the sum of an n -positive map and a 2-copositive map.

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APA

Tanahashi, K., & Tomiyama, J. (1988). Indecomposable Positive Maps in Matrix Algebras. Canadian Mathematical Bulletin, 31(3), 308–317. https://doi.org/10.4153/cmb-1988-044-4

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