Homogeneous Spaces in Hartree–Fock–Bogoliubov Theory

Claudia D. Alvarado, Eduardo Chiumiento
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Abstract

We study the action of Bogoliubov transformations on admissible generalized one-particle density matrices arising in Hartree–Fock–Bogoliubov theory. We show that the orbits of this action are reductive homogeneous spaces, and we give several equivalences that characterize when they are embedded submanifolds of natural ambient spaces. We use Lie theoretic arguments to prove that these orbits admit an invariant symplectic form. If, in addition, the operators in the orbits have finite spectrum, then we obtain that the orbits are actually Kähler homogeneous spaces.

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哈特里-福克-波哥留布夫理论中的均质空间
我们研究了哈特里-福克-波哥留布夫理论中出现的波哥留布夫变换对可容许广义一粒子密度矩阵的作用。我们证明了这一作用的轨道是还原同质空间,并给出了几种等价关系,描述了当它们是自然环境空间的嵌入子漫游时的特征。我们利用李理论论证了这些轨道具有不变的交映形式。此外,如果轨道中的算子具有有限谱,那么我们就会得到轨道实际上是凯勒均质空间。
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