Abstract
We establish geometric properties of Stiefel and Grassmann manifolds which arise in relation to Slatertype variational spaces in many-particle Hartree-Fock theory and beyond. In particular, we prove thatthey are analytic homogeneous spaces and submanifolds of the space of bounded operators on the single-particle Hilbert space. As a by-product we obtain that they are complete Finsler manifolds. These geometric properties underpin state-of-the-art results on existence of solutions to Hartree-Fock type equations.
Original language | English |
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Journal | Journal of Geometry and Physics |
DOIs | |
Publication status | Published - 15 Apr 2012 |
Externally published | Yes |
Keywords
- Stiefel manifolds
- Grassmann manifolds
- Slater-type variational spaces
- many-particle Hartree-Fock theory
- analytic homogeneous spaces
- bounded operators
- single-particle Hilbert space
- complete Finsler manifolds
- Hartree-Fock type equations