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Introduction to Quantum Information Processing CS 667 / PH 767 / CO 681 / AM 871

Introduction to Quantum Information Processing CS 667 / PH 767 / CO 681 / AM 871. Lecture 15 (2009). Richard Cleve DC 2117 cleve@cs.uwaterloo.ca. Simulations among operations.  0  +  1 .  0 . Simulations among operations (1).

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Introduction to Quantum Information Processing CS 667 / PH 767 / CO 681 / AM 871

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  1. Introduction to Quantum Information ProcessingCS 667 / PH 767 / CO 681 / AM 871 Lecture 15 (2009) Richard Cleve DC 2117 cleve@cs.uwaterloo.ca

  2. Simulations among operations

  3. 0 +1 0 Simulations among operations (1) Fact 1: any general quantum operation can be simulated by applying a unitary operation on a larger quantum system: U   output input 0 discard 0 0 Example: decoherence

  4. Simulations among operations (2) Fact 2: any POVM measurement can also be simulated by applying a unitary operation on a larger quantum system and then measuring: U   quantum output input 0 j classical output 0 0

  5. Separable states

  6. Separable states A bipartite (i.e. two register) state  is a: • product state if = • separablestate if (p1 ,…,pm 0) (i.e. a probabilistic mixture of product states) Question: which of the following states are separable?

  7. Distance measures for quantum states

  8. Distance measures Some simple (and often useful) measures: • Euclidean distance:  ψ − φ 2 • Fidelity: φψ  Small Euclidean distance implies “closeness” but large Euclidean distance need not (for example, ψvs −ψ) Not so clear how to extend these for mixed states … … though fidelity does generalize, to Tr√1/21/2

  9. Trace norm – preliminaries (1) For a normal matrix M and a function f : CC, we define the matrix f(M)as follows: M = U†DU, where D is diagonal (i.e. unitarily diagonalizable) Now, define f(M) = U†f(D) U, where

  10. Trace norm – preliminaries (2) For a normal matrix M = U†DU, define |M| in terms of replacing D with This is the same as defining |M|=√M†M and the latter definition extends to all matrices (since M†M is positive definite)

  11. Trace norm/distance – definition ||M||tr= Tr|M|=Tr√M†M The trace norm of M is Intuitively, it’s the 1-norm of the eigenvalues (or, in the non-normal case, the singular values) of M The trace distance between  and  is|| − ||tr Why is this a meaningful distance measure between quantum states? Theorem: for any two quantum states  and , the optimal measurement procedure for distinguishing between them succeeds with probability ½ + ¼|| − ||tr

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