Related papers: Variational Quantum Algorithm Landscape Reconstruction by Low-Rank Tensor Completion

Variational Quantum Algorithm Landscape Reconstruction by Low-Rank Tensor Completion

URL: http://arxiv.org/abs/2405.10941v2
Date: Fri, 2 Aug 2024 20:19:03 GMT
Title: Variational Quantum Algorithm Landscape Reconstruction by Low-Rank Tensor Completion
Authors: Tianyi Hao, Zichang He, Ruslan Shaydulin, Marco Pistoia, Swamit Tannu,
Abstract summary: Variational quantum algorithms (VQAs) are a broad class of algorithms with many applications in science and industry. A particular challenge associated with VQAs is understanding the properties of associated cost functions. We propose a low-rank tensor-completion-based approach for local landscape reconstruction.
Score: 2.2707451850269456
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Variational quantum algorithms (VQAs) are a broad class of algorithms with many applications in science and industry. Applying a VQA to a problem involves optimizing a parameterized quantum circuit by maximizing or minimizing a cost function. A particular challenge associated with VQAs is understanding the properties of associated cost functions. Having the landscapes of VQA cost functions can greatly assist in developing and testing new variational quantum algorithms, but they are extremely expensive to compute. Reconstructing the landscape of a VQA using existing techniques requires a large number of cost function evaluations, especially when the dimension or the resolution of the landscape is high. To address this challenge, we propose a low-rank tensor-completion-based approach for local landscape reconstruction. By leveraging compact low-rank representations of tensors, our technique can overcome the curse of dimensionality and handle high-resolution landscapes. We demonstrate the power of landscapes in VQA development by showcasing practical applications of analyzing penalty terms for constrained optimization problems and examining the probability landscapes of certain basis states.

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