Quantum Simulations Based on Parameterized Circuit of an Antisymmetric Matrix

Abstract

Given an antisymmetric matrix A or the unitary matrix UA = eA-or an oracle whose answers can be used to infer information about A-in this paper we present a parameterized circuit framework that can be used to approximate a quantum circuit for eA. We design the circuit based on a uniform antisymmetric matrix with \ 1\ elements, which has an eigenbasis that is a phase-shifted version of the quantum Fourier transform, and its eigenspectrum can be constructed by using rotation Z gates. Therefore, we show that it can be used to directly estimate eA and its quantum circuit representation. Since the circuit is based on O(n2) quantum gates, which form the eigendecomposition of eA with separate building blocks, it can also be used to approximate the eigenvalues of A.