Hilbert-Schmidt norm estimates for fermionic reduced density matrices
Abstract
We prove that the Hilbert-Schmidt norm of k-particle reduced density matrices of N-body fermionic states is bounded by CkNk/2 - matching the scaling behaviour of Slater determinant states. This generalises a recent result of Christiansen (2024) on 2-particle reduced density matrices to higher-order density matrices. Moreover, our estimate directly yields a lower bound on the von Neumann entropy and the 2-R\'enyi entropy of reduced density matrices, thereby providing further insight into conjectures of Carlen-Lieb-Reuvers (2016,2018).
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