Functional theory of the occupied spectral density

Abstract

We address the problem of interacting electrons in an external potential by introducing the occupied spectral density (r,ω) as fundamental variable. First, we formulate the problem using an embedding framework, and prove a one-to-one correspondence between a (r,ω) and the local dynamical external potential vext(r,ω) that embeds the interacting electrons into an open quantum system. Then, we use the Klein functional to (i) define a universal functional of (r,ω), (ii) introduce a variational principle for the total energy as a functional of (r,ω), and (iii) formulate a non-interacting mapping of spectral self-consistent equations suitable for numerical applications. At variance with time-dependent density-functional theory, this formulation aims at studying charged excitations and electronic spectra -- including electronic correlations -- with a functional theory; An explicit and formally correct description of all electronic levels could also lead to more accurate approximations for the total energy.