Trace distance quantum mechanics , and especially quantum information and the study of open quantum systems , the trace distance T is a metric on the space of density matrices and gives a measure of the distinguishability between two states . It is the quantum generalization of the Kolmogorov distance for classical probability distributions .Definition The trace distance is just half of the trace norm of the difference of the matrices:factor of two is to restrict the trace distance between two normalized density matrices to the range and to simplify formulas in which the trace distance appears.Hermitian , Physical interpretation By using the Hölder duality for Schatten norms , the trace distance can be written in variational form as Alice prepares a system in either the state or, each with probability and sends it to Bob who has to discriminate between the two states using a binary measurement. POVM element such as the outcome and a POVM element to identify the state or, respectively. His expected probability of correctly identifying the incoming state is then given bythe system ..Properties The trace distance has the following properties It is a metric on the space of density matrices, i.e. it is non-negative, symmetric, and satisfies the triangle inequality , and and if and only if and have orthogonal supports It is preserved under unitary transformations: It is contractive under trace-preserving CP maps , i.e. if is a CPT map, then It is convex in each of its inputs. E.g. qubits , the trace distance is equal to half the Euclidean distance in the Bloch representation .Relationship to other distance measures Fidelity The fidelity of two quantum states is related to the trace distance by the inequalitiesupper bound inequality becomes an equality when and are pure states . The trace distance is a generalization of the total variation distance , and for two commuting density matrices, has the same value as the total variation distance of the two corresponding probability distributions.
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