Integer Factoring with Unoperations
Abstract
This work introduces the notion of unoperation Un(O) of some operation O. Given a valid output of O, the corresponding unoperation produces a set of all valid inputs to O that produce the given output. Further, the working principle of unoperations is illustrated using the example of addition. A device providing that functionality is constructed utilising a quantum circuit performing the unoperation of addition - referred to as unaddition. To highlight the potential of the approach the unaddition quantum circuit is employed to construct a device for factoring integer numbers N, which is then called unmultiplier. This approach requires only a number of qubits ∈ O((N)2), rivalling the best known factoring algorithms to date.
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