论文信息 - Contractivity of positive and trace-preserving maps under Lp norms

Contractivity of positive and trace-preserving maps under Lp norms

We provide a complete picture of contractivity of trace preserving positive maps with respect to p-norms. We show that for p>1 contractivity holds in general if and only if the map is unital. When the domain is restricted to the traceless subspace of Hermitian matrices, then contractivity is shown to hold in the case of qubits for arbitrary p⩾1 and in the case of qutrits if and only if p=1, ∞. In all noncontractive cases best possible bounds on the p-norms are derived.

D. Petz | M. Wolf | M. Ruskai | D. Pérez-García

[1] Anna Jenčcová,et al. A Relation Between Completely Bounded Norms and Conjugate Channels , 2006 .

[2] M. Junge,et al. Multiplicativity of Completely Bounded p-Norms Implies a New Additivity Result , 2005, quant-ph/0506196.

[3] M. Ruskai,et al. Properties of Conjugate Channels with Applications to Additivity and Multiplicativity , 2005, quant-ph/0509126.

[4] A. Holevo. Complementary Channels and the Additivity Problem , 2005, quant-ph/0509101.

[5] V. Paulsen. Completely Bounded Maps and Operator Algebras: Contents , 2003 .

[6] M. Raginsky. Entropy production rates of bistochastic strictly contractive quantum channels on a matrix algebra , 2002, math-ph/0207041.

[7] M. Ozawa. Entanglement measures and the Hilbert-Schmidt distance , 2000, quant-ph/0002036.

[8] R. Olkiewicz. Environment-Induced Superselection Rules in Markovian Regime , 1999 .

[9] M. Plenio,et al. Quantifying Entanglement , 1997, quant-ph/9702027.