Synthesis and Arithmetic of Single Qutrit Circuits
Abstract
In this paper we study single qutrit circuits consisting of words over the Clifford+D cyclotomic gate set, where D=diag(a,b,c), is a primitive 9-th root of unity and a,b,c are integers. We characterize classes of qutrit unit vectors z with entries in Z[, 1] based on the possibility of reducing their smallest denominator exponent (sde) with respect to := 1 - , by acting an appropriate gate in Clifford+D. We do this by studying the notion of `derivatives mod 3' of an arbitrary element of Z[] and using it to study the smallest denominator exponent of HDz where H is the qutrit Hadamard gate and D. In addition, we reduce the problem of finding all unit vectors of a given sde to that of finding integral solutions of a positive definite quadratic form along with some additional constraints. As a consequence we prove that the Clifford+D gates naturally arise as gates with sde 0 and 3 in the group U(3,Z[, 1]) of 3 × 3 unitaries with entries in Z[, 1]. We illustrate the general applicability of these methods to obtain an exact synthesis algorithm for Clifford+R and recover the previous exact synthesis algorithm in kmm. The framework developed to formulate qutrit gate synthesis for Clifford+D extends to qudits of arbitrary prime power.
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