A semidefinite program (SDP) is a particular kind of convex optimization problem with applications in operations research, combinatorial optimization, quantum information science, and beyond. In this work, we propose variational quantum algorithms for approximately solving SDPs. For one class of SDPs, we provide a rigorous analysis of their convergence to approximate locally optimal solutions, under the assumption that they are weakly constrained (i.e., $N\gg M$, where $N$ is the dimension of the input matrices and $M$ is the number of constraints). We also provide algorithms for a more general class of SDPs that requires fewer assumptions. Finally, we numerically simulate our quantum algorithms for applications such as MaxCut, and the results of these simulations provide evidence that convergence still occurs in noisy settings.
翻译:半无限制程序(SDP)是操作研究、组合优化、量子信息科学等应用中的一种特殊的组合优化问题。 在这项工作中,我们提出了大约解决 SDP 的变异量算法。 对于一类SDP,我们严格分析其趋同性,以近似当地最佳解决方案,假设它们受弱小的限制(即$N\gg M$,输入矩阵的维度为美元,限制数量为$M),我们还为更普通的SDP类提供算法,需要较少的假设。最后,我们用数字模拟了像 MaxCut 这样的应用的量算法,这些模拟的结果提供了证据,证明在吵闹的环境中仍然会出现趋同。