Abstract
In a series of two articles, we propose a comprehensive mathematical framework for Coupled-Cluster-type methods. In this second part, we analyze the nonlinear equations of the single-reference Coupled-Cluster method using topological degree theory. We establish existence results and qualitative information about the solutions of these equations that also sheds light of the numerically observed behavior. In particular, we compute the topological index of the zeros of the single-reference Coupled-Cluster mapping. For the truncated Coupled-Cluster method, we derive an energy error bound for approximate eigenstates of the Schrödinger equation.
Cited by
8 articles.
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1. Algebraic Varieties in Quantum Chemistry;Foundations of Computational Mathematics;2024-07-17
2. Recent mathematical advances in coupled cluster theory;International Journal of Quantum Chemistry;2024-07-05
3. Fighting Noise with Noise: A Stochastic Projective Quantum Eigensolver;Journal of Chemical Theory and Computation;2024-07-02
4. State-Specific Coupled-Cluster Methods for Excited States;Journal of Chemical Theory and Computation;2024-05-15
5. Coupled Cluster Theory: Toward an Algebraic Geometry Formulation;SIAM Journal on Applied Algebra and Geometry;2024-02-22