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RESEARCH PRODUCT
Rounding of Phase Transitions in Cylindrical Pores
Alexander WinklerPeter VirnauKurt BinderDorothea Wilmssubject
PhysicsPhase transitionStatistical Mechanics (cond-mat.stat-mech)Condensed matter physicsCapillary condensationMonte Carlo methodFOS: Physical sciencesGeneral Physics and Astronomylaw.inventionCondensed Matter::Soft Condensed MatterlawLattice (order)Ising modelWettingCrystallizationAxial symmetryCondensed Matter - Statistical Mechanicsdescription
Phase transitions of systems confined in long cylindrical pores (capillary condensation, wetting, crystallization, etc.) are intrinsically not sharply defined but rounded. The finite size of the cross section causes destruction of long range order along the pore axis by spontaneous nucleation of domain walls. This rounding is analyzed for two models (Ising/lattice gas and Asakura-Oosawa model for colloid-polymer mixtures) by Monte Carlo simulations and interpreted by a phenomenological theory. We show that characteristic differences between the behavior of pores of finite length and infinitely long pores occur. In pores of finite length a rounded transition occurs first, from phase coexistence between two states towards a multi-domain configuration. A second transition to the axially homogeneous phase follows near pore criticality.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2010-07-01 |