Potential energy landscape-based extended van der Waals equation
Abstract
The inherent structures ( IS) are the local minima of the potential energy surface or landscape, U( r), of an N atom system. Stillinger has given an exact IS formulation of thermodynamics. Here the implications for the equation of state are investigated. It is shown that the van der Waals ( vdW) equation, with density-dependent a and b coefficients, holds on the high-temperature plateau of the averaged IS energy. However, an additional ``landscape'' contribution to the pressure is found at lower T. The resulting extended vdW equation, unlike the original, is capable of yielding a water-like density anomaly, flat isotherms in the coexistence region vs vdW loops, and several other desirable features. The plateau energy, the width of the distribution of IS, and the ``top of the landscape'' temperature are simulated over a broad reduced density range, 2.0 0.20, in the Lennard-Jones fluid. Fits to the data yield an explicit equation of state, which is argued to be useful at high density; it nevertheless reproduces the known values of a and b at the critical point.
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