Exact Synthesis of Multiqubit Clifford-Cyclotomic Circuits

Abstract

Let n≥ 8 be divisible by 4. The Clifford-cyclotomic gate set Gn is the universal gate set obtained by extending the Clifford gates with the z-rotation Tn = diag(1,ζn), where ζn is a primitive n-th root of unity. In this note, we show that, when n is a power of 2, a multiqubit unitary matrix U can be exactly represented by a circuit over Gn if and only if the entries of U belong to the ring Z[1/2,ζn]. We moreover show that (n)-2 ancillas are always sufficient to construct a circuit for U. Our results generalize prior work to an infinite family of gate sets and show that the limitations that apply to single-qubit unitaries, for which the correspondence between Clifford-cyclotomic operators and matrices over Z[1/2,ζn] fails for all but finitely many values of n, can be overcome through the use of ancillas.

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