The exact synthesis of 1- and 2-qubit Clifford+T circuits
Abstract
We describe a new method for the decomposition of an arbitrary n qubit operator with entries in Z[i,12], i.e., of the form (a+b2+i(c+d2))/2k, into Clifford+T operators where n 2. This method achieves a bound of O(k) gates using at most one ancilla using decomposition into 1- and 2-level matrices which was first proposed by Giles and Selinger.
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