v-representability on a one-dimensional torus at elevated temperatures
Abstract: We extend a previous result [Sutter et al., J. Phys. A: Math. Theor. 57, 475202 (2024)] to give an explicit form of the set of $v$-representable densities on the one-dimensional torus with any fixed number of particles in contact with a heat bath at finite temperature. The particle interaction has to satisfy some mild assumptions but is kept entirely general otherwise. For densities, we consider the Sobolev space $H1$ and exploit the convexity of the functionals. This leads to a broader set of potentials than the usual $Lp$ spaces and encompasses distributions. By including temperature and thus considering all excited states in the Gibbs ensemble, G^ateaux differentiability of the thermal universal functional is guaranteed. This yields $v$-representability and it is demonstrated that the given set of $v$-representable densities is even maximal.
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