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Graph weights arising from Mayer and Ree-Hoover theories of virial expansions
2008
Discrete Mathematics & Theoretical Computer Science
International audience We study graph weights (i.e., graph invariants) which arise naturally in Mayer's theory and Ree-Hoover's theory of virial expansions in the context of a non-ideal gas. We give special attention to the Second Mayer weight $w_M(c)$ and the Ree-Hoover weight $w_{RH}(c)$ of a $2$-connected graph $c$ which arise from the hard-core continuum gas in one dimension. These weights are computed using signed volumes of convex polytopes naturally associated with the graph $c$. Among
doi:10.46298/dmtcs.3646
fatcat:fwzlc462sne3db7yhjfb4teerq