Distinguishing bipartitite orthogonal states using LOCC: Best and worst cases M Nathanson Journal of Mathematical Physics 46 (6), 2005 | 184 | 2005 |
Properties of conjugate channels with applications to additivity and multiplicativity C King, K Matsumoto, M Nathanson, MB Ruskai arXiv preprint quant-ph/0509126, 2005 | 149 | 2005 |
Three maximally entangled states can require two-way local operations and classical communication for local discrimination M Nathanson Physical Review A—Atomic, Molecular, and Optical Physics 88 (6), 062316, 2013 | 77 | 2013 |
On the existence of a common quadratic Lyapunov function for a rank one difference C King, M Nathanson Linear Algebra and its Applications 419 (2-3), 400-416, 2006 | 57 | 2006 |
Pauli diagonal channels constant on axes M Nathanson, MB Ruskai Journal of Physics A: Mathematical and Theoretical 40 (28), 8171, 2007 | 56 | 2007 |
Entanglement as a resource for local state discrimination in multipartite systems S Bandyopadhyay, S Halder, M Nathanson Physical Review A 94 (2), 022311, 2016 | 53 | 2016 |
Multiplicativity properties of entrywise positive maps C King, M Nathanson, MB Ruskai Linear algebra and its applications 404, 367-379, 2005 | 36 | 2005 |
Qubit channels can require more than two inputs to achieve capacity C King, M Nathanson, MB Ruskai Physical review letters 88 (5), 057901, 2002 | 35 | 2002 |
Optimal resource states for local state discrimination S Bandyopadhyay, S Halder, M Nathanson Physical Review A 97 (2), 022314, 2018 | 29 | 2018 |
Tight bounds on the distinguishability of quantum states under separable measurements S Bandyopadhyay, M Nathanson Physical Review A—Atomic, Molecular, and Optical Physics 88 (5), 052313, 2013 | 23 | 2013 |
New trace norm inequalities for 2× 2 blocks of diagonal matrices C King, M Nathanson Linear algebra and its applications 389, 77-93, 2004 | 20 | 2004 |
Operator structures and quantum one-way LOCC conditions DW Kribs, C Mintah, M Nathanson, R Pereira Journal of Mathematical Physics 58 (9), 2017 | 11 | 2017 |
Quantum error correction and one-way LOCC state distinguishability DW Kribs, C Mintah, M Nathanson, R Pereira Journal of Mathematical Physics 60 (3), 2019 | 10 | 2019 |
Testing for a pure state with local operations and classical communication M Nathanson Journal of Mathematical Physics 51 (4), 2010 | 10 | 2010 |
Markov Process Relat C King, K Matsumoto, M Nathanson, MB Ruskai Fields 13, 391, 2007 | 10 | 2007 |
One-way LOCC indistinguishable lattice states via operator structures DW Kribs, C Mintah, M Nathanson, R Pereira Quantum Information Processing 19, 1-8, 2020 | 9 | 2020 |
Quantum guessing via deutsch-jozsa M Nathanson arXiv preprint quant-ph/0301025, 2003 | 6 | 2003 |
Vector representations of graphs and distinguishing quantum product states with one-way LOCC DW Kribs, C Mintah, M Nathanson, R Pereira Linear Algebra and its Applications 602, 223-239, 2020 | 5 | 2020 |
‘Gershgorin’s Circle Theorem for Estimating the Eigenvalues of a Matrix with Known Error Bounds’’ D Marquis, H De Moor, K Porter, M Nathanson May, 2016 | 5 | 2016 |
Minimum vector rank and complement critical graphs X Li, M Nathanson, R Phillips arXiv preprint arXiv:1304.3751, 2013 | 4 | 2013 |