Catalytic z-rotations in constant T-depth
Abstract
We show that the T-depth of any single-qubit z-rotation can be reduced to 3 if a certain catalyst state is available. To achieve an ε-approximation, it suffices to have a catalyst state of size polynomial in (1/ε). This implies that QNC0f/qpoly admits a finite universal gate set consisting of Clifford+T. In particular, there are catalytic constant T-depth circuits that approximate multi-qubit Toffoli, adder, and quantum Fourier transform arbitrarily well. We also show that the catalyst state can be prepared in time polynomial in (1/ε).
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