TY - JOUR
T1 - Positivity of linear maps under tensor powers
AU - Müller-Hermes, Alexander
AU - Reeb, David
AU - Wolf, Michael M.
N1 - Publisher Copyright:
© 2015 AIP Publishing LLC.
PY - 2016/1
Y1 - 2016/1
N2 - We investigate linear maps between matrix algebras that remain positive under tensor powers, i.e., under tensoring with n copies of themselves. Completely positive and completely co-positive maps are trivial examples of this kind. We show that for every n ∈ N, there exist non-trivial maps with this property and that for two-dimensional Hilbert spaces there is no non-trivial map for which this holds for all n. For higher dimensions, we reduce the existence question of such non-trivial "tensor-stable positive maps" to a one-parameter family of maps and show that an affirmative answer would imply the existence of non-positive partial transpose bound entanglement. As an application, we show that any tensor-stable positive map that is not completely positive yields an upper bound on the quantum channel capacity, which for the transposition map gives the well-known cb-norm bound. We, furthermore, show that the latter is an upper bound even for the local operations and classical communications-assisted quantum capacity, and that moreover it is a strong converse rate for this task.
AB - We investigate linear maps between matrix algebras that remain positive under tensor powers, i.e., under tensoring with n copies of themselves. Completely positive and completely co-positive maps are trivial examples of this kind. We show that for every n ∈ N, there exist non-trivial maps with this property and that for two-dimensional Hilbert spaces there is no non-trivial map for which this holds for all n. For higher dimensions, we reduce the existence question of such non-trivial "tensor-stable positive maps" to a one-parameter family of maps and show that an affirmative answer would imply the existence of non-positive partial transpose bound entanglement. As an application, we show that any tensor-stable positive map that is not completely positive yields an upper bound on the quantum channel capacity, which for the transposition map gives the well-known cb-norm bound. We, furthermore, show that the latter is an upper bound even for the local operations and classical communications-assisted quantum capacity, and that moreover it is a strong converse rate for this task.
UR - http://www.scopus.com/inward/record.url?scp=84937881430&partnerID=8YFLogxK
U2 - 10.1063/1.4927070
DO - 10.1063/1.4927070
M3 - Article
AN - SCOPUS:84937881430
SN - 0022-2488
VL - 57
JO - Journal of Mathematical Physics
JF - Journal of Mathematical Physics
IS - 1
M1 - 015202
ER -