Line Hjortshoj Pedersen, Klaus Molmer, Niels Martin Moller
Published 2007-01-19, updated 2007-02-05Version 2
We present a derivation and numerous applications of a compact explicit formula for the average fidelity of a quantum operation on a finite dimensional quantum system. The formula can be applied to averages over particularly relevant subspaces; it is easily generalized to multi-component systems, and as a special result, we show that when the same completely positive trace-preserving map is applied to a large number of qubits with one-bit fidelity F close to unity, the average fidelity of the operation on the full K-bit register scales as $F^{3K/2}$.
Comments: 5 pages, no figures. The text has been modified to acknowledge that our Eq.(1) has appeared already in quant-ph/0503243 and quant-ph/0512217
Journal: Phys. Lett. A 367 (2007), no. 1-2, 47--51.
On coherence of quantum operations by using Choi-JamioĊkowski isomorphism
Average Fidelity in n-Qubit systems
A protocol to estimate the average fidelity of the bipartite system
