Composability of global phase invariant distance and its application to approximation error management

TL;DR

This paper investigates the composability of global phase invariant distance in quantum circuit synthesis, deriving bounds on errors, optimizing error distribution for T-gates, and demonstrating resource savings in quantum Fourier Transform approximations.

Contribution

It introduces the composability of global phase invariant distance, providing improved error bounds and resource-efficient error distribution strategies in quantum circuit synthesis.

Findings

Derived bounds on overall unitary error from component errors.

Proved equal error distribution among $R_z(\theta)$ gates is optimal.

Showed resource savings in approximate Quantum Fourier Transform.

Abstract

Many quantum algorithms can be written as a composition of unitaries, some of which can be exactly synthesized by a universal fault-tolerant gate set, while others can be approximately synthesized. A quantum compiler synthesizes each approximately synthesizable unitary up to some approximation error, such that the error of the overall unitary remains bounded by a certain amount. In this paper we consider the case when the errors are measured in the global phase invariant distance. Apart from deriving a relation between this distance and the Frobenius norm, we show that this distance composes. If a unitary is written as a composition (product and tensor product) of other unitaries, we derive bounds on the error of the overall unitary as a function of the errors of the composed unitaries. Our bound is better than the sum-of-error bound (Bernstein,Vazirani,1997), derived for the operator norm. This indicates that synthesizing a circuit using global phase invariant distance maybe done with less number of resources. Next we consider the following problem. Suppose we are given a decomposition of a unitary. The task is to distribute the errors in each component such that the T-count is optimized. Specifically, we consider those decompositions where $R_z(\theta)$ gates are the only approximately synthesizable component. We prove analytically that for both the operator norm and global phase invariant distance, the error should be distributed equally among these components (given some approximations). The optimal number of T-gates obtained by using the global phase invariant distance is less. Furthermore, we show that in case of approximate Quantum Fourier Transform, the error obtained by pruning rotation gates is less when measured in this distance.