Geometry of backflow transformation ansatz for quantum many-body fermionic wavefunctions
Publication
, Journal Article
Huang, H; Landsberg, JM; Lu, J
November 19, 2021
Wave function ansatz based on the backflow transformation are widely used to parametrize anti-symmetric multivariable functions for many-body quantum problems. We study the geometric aspects of such ansatz, in particular we show that in general totally antisymmetric polynomials cannot be efficiently represented by backflow transformation ansatz at least in the category of polynomials. In fact, one needs a linear combination of at least $O(N^{3N-3})$ determinants to represent a generic totally antisymmetric polynomial. Our proof is based on bounding the dimension of the source of the ansatz from above and bounding the dimension of the target from below.
Duke Scholars
Publication Date
November 19, 2021
Citation
APA
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ICMJE
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Huang, H., Landsberg, J. M., & Lu, J. (2021). Geometry of backflow transformation ansatz for quantum many-body
fermionic wavefunctions.
Huang, Hang, J. M. Landsberg, and Jianfeng Lu. “Geometry of backflow transformation ansatz for quantum many-body
fermionic wavefunctions,” November 19, 2021.
Huang H, Landsberg JM, Lu J. Geometry of backflow transformation ansatz for quantum many-body
fermionic wavefunctions. 2021 Nov 19;
Huang, Hang, et al. Geometry of backflow transformation ansatz for quantum many-body
fermionic wavefunctions. Nov. 2021.
Huang H, Landsberg JM, Lu J. Geometry of backflow transformation ansatz for quantum many-body
fermionic wavefunctions. 2021 Nov 19;
Publication Date
November 19, 2021