A Theorem on the origin of Phase Transitions
Abstract
For physical systems described by smooth, finite-range and confining microscopic interaction potentials V with continuously varying coordinates, we announce and outline the proof of a theorem that establishes that unless the equipotential hypersurfaces of configuration space v =(q1,...,qN)∈ RN | V(q1,...,qN) = v, v ∈ R, change topology at some vc in a given interval [v0, v1] of values v of V, the Helmoltz free energy must be at least twice differentiable in the corresponding interval of inverse temperature (β(v0), β(v1)) also in the N -> ∞ limit. Thus the occurrence of a phase transition at some βc =β(vc) is necessarily the consequence of the loss of diffeomorphicity among the vv < vc and the vv > vc, which is the consequence of the existence of critical points of V on v=vc, that is points where ∇ V=0.
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