Quantitative description of strongly correlated materials by combining downfolding techniques and tensor networks (2502.19588v1)

Abstract: We present a high-accuracy procedure for electronic structure calculations of strongly correlated materials. The approach involves downfolding the full Hilbert space into a low-energy subspace that captures the most significant electron correlations, leading to an effective Hubbard model. This generalized model is then solved using tensor network methods. Our work focuses on one-dimensional and quasi-one-dimensional materials, for which we employ the machinery of matrix product states. We apply this framework to the conjugated polymers trans-polyacetylene and polythiophene, as well as the quasi-one-dimensional charge-transfer insulator Sr2CuO3. The predicted band gaps exhibit quantitative agreement with state-of-the-art computational techniques and experimental measurements. Beyond band gaps, tensor networks provide access to a wide range of physically relevant properties, including spin magnetization and various excitation energies. Their flexibility supports the implementation of complex Hamiltonians with longer-range interactions, while the bond dimension enables systematic control over accuracy. Furthermore, the computational cost scales efficiently with system size, demonstrating the framework's scalability.