9 citations to https://www.mathnet.ru/eng/qip1
  1. G. G. Amosov, “On capacity of quantum channels generated by irreducible projective unitary representations of finite groups”, Quantum Inf. Process., 21 (2022), 81–15  mathnet  crossref  isi  scopus
  2. G. G. Amosov, A. S. Mokeev, “On non-commutative operator graphs generated by reducible unitary representation of the Heisenberg–Weyl group”, Internat. J. Theoret. Phys., 60 (2021), 457–463  mathnet  crossref  isi  scopus
  3. A. S. Holevo, “Quantum channel capacities”, Quantum Electron., 50:5 (2020), 440–446  mathnet  mathnet  crossref  isi  scopus
  4. David Elkouss, David Pérez-García, “Memory effects can make the transmission capability of a communication channel uncomputable”, Nat Commun, 9:1 (2018)  crossref
  5. G. G. Amosov, “Algebraic methods of the study of quantum information transfer channels”, J. Math. Sci. (N. Y.), 241:2 (2019), 109–116  mathnet  mathnet  crossref  scopus
  6. G. G. Amosov, I. Yu. Zhdanovskii, “Structure of the Algebra Generated by a Noncommutative Operator Graph which Demonstrates the Superactivation Phenomenon for Zero-Error Capacity”, Math. Notes, 99:6 (2016), 924–927  mathnet  crossref  crossref  mathscinet  zmath  isi  elib  elib
  7. Debbie Leung, Nengkun Yu, “Maximum privacy without coherence, zero-error”, Journal of Mathematical Physics, 57:9 (2016)  crossref
  8. M. E. Shirokov, “On quantum zero-error capacity”, Russian Math. Surveys, 70:1 (2015), 176–178  mathnet  mathnet  crossref  crossref  isi  scopus
  9. G. G. Amosov, I. Yu. Zhdanovskiy, “On the noncommutative deformation of the operator graph corresponding to the Klein group”, J. Math. Sci. (N. Y.), 215:6 (2016), 659–676  mathnet  mathnet  crossref  scopus