Approximate Private Quantum Channels
Abstract
This thesis includes a survey of the results known for private and approximate private quantum channels. We develop the best known upper bound for ε-randomizing maps, n+2(1/ε)+c bits required to ε-randomize an arbitrary n-qubit state by improving a scheme of Ambainis and Smith AS04 based on small bias spaces NN90, AGHP92. We show by a probabilistic argument that in fact the great majority of random schemes using slightly more than this many bits of key are also ε-randomizing. We provide the first known non-trivial lower bound for ε-randomizing maps, and develop several conditions on them which we hope may be useful in proving stronger lower bounds in the future.
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