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Analyzing the barren plateau phenomenon in training quantum neural networks with the ZX-calculus

Chen Zhao, Xiao-Shan Gao

2021Quantum74 citationsDOIOpen Access PDF

Abstract

In this paper, we propose a general scheme to analyze the gradient vanishing phenomenon, also known as the barren plateau phenomenon, in training quantum neural networks with the ZX-calculus. More precisely, we extend the barren plateaus theorem from unitary 2-design circuits to any parameterized quantum circuits under certain reasonable assumptions. The main technical contribution of this paper is representing certain integrations as ZX-diagrams and computing them with the ZX-calculus. The method is used to analyze four concrete quantum neural networks with different structures. It is shown that, for the hardware efficient ansatz and the MPS-inspired ansatz, there exist barren plateaus, while for the QCNN ansatz and the tree tensor network ansatz, there exists no barren plateau.

Topics & Concepts

AnsatzArtificial neural networkUnitary stateParameterized complexityQuantumMathematicsPlateau (mathematics)Scheme (mathematics)Tree (set theory)Quantum computerTensor (intrinsic definition)Computer scienceQuantum algorithmQuantum phase estimation algorithmStatistical physicsAlgorithmTraining (meteorology)Topology (electrical circuits)Discrete mathematicsTheoretical computer scienceQuantum stateArtificial intelligenceGeneralizationQuantum Computing Algorithms and ArchitectureQuantum many-body systemsQuantum-Dot Cellular Automata