The penetrable-sphere fluid in the high-temperature, high-density limit
Abstract
We consider a fluid of d-dimensional spherical particles interacting via a pair potential φ(r) which takes a finite value ε if the two spheres are overlapped (r<σ) and 0 otherwise. This penetrable-sphere model has been proposed to describe the effective interaction of micelles in a solvent. We derive the structural and thermodynamic functions in the limit where the reduced temperature kBT/ε and density σd tend to infinity, their ratio being kept finite. The fluid exhibits a spinodal instability at a certain maximum scaled density where the correlation length diverges and a crystalline phase appears, even in the one-dimensional model. By using a simple free-volume theory for the solid phase of the model, the fluid-solid phase transition is located.
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