130 likes | 223 Views
Self-expanding and self-flattening membranes. S. Y. Yoon and Yup Kim Department of Physics, Kyung Hee University Asia Pacific Center for Theoretical Physics, Seoul, Korea. Abstract We study the dynamical scaling properties of self-expanding surfaces
E N D
Self-expanding and self-flattening membranes S. Y. Yoon and Yup Kim Department of Physics, Kyung Hee University Asia Pacific Center for Theoretical Physics, Seoul, Korea
Abstract We study the dynamical scaling properties of self-expanding surfaces with the comparison to those of self-flattening surfaces [1,2]. Evolution of self-expanding surface is described by monomer deposition-evaporation model in which the deposition or evaporation process that reduces the globally maximal height or increases the globally minimal height is suppressed. We find that equilibrium surface fluctuation of the expanding surface shows anomalous behavior with roughness exponent = 1 in one-dimension (1D) and = 0 (log), zW 5/2 , where the 2D result is nearly the same as that of self-flattening surface. In case of nonequilibrium growing (eroding) surfaces, self-expanding surface dynamics shows the scaling behavior depending on the suppression probability u. [1] Yup Kim, S. Y. Yoon, and Hyunggyu Park, Phys. Rev. E 66, 040602(R) (2002). [2] Yup Kim, T. S. Kim, and Hyunggyu Park, Phys. Rev. E 66, 046123 (2002)
h= 2 3 2 3 Random walk 2 1 Surface roughening 4 4 1 1 0 5 5 t -1 Backgrounds In equilibrium state, 1. Comparison of static walk and surface roughening x In 1D, we can map a configuration of static random walk to a surface morphology of the restricted solid-on-solid (body-centered solid-on-solid) model. But in 2D, the random walk cannot be mapped to the surface morphology. a. Self-attracting walk Self-flattening surface b. Self-repelling (avoiding) walk Self-expanding surface
2. General partition function of surface growth with global constraint Where, nh= the number of columns with height h , Two models are decided by sign of K in this partition function. a. Self-flattening membrane ( K <0 ) 1d : anomalous behavior with exponents 1/3, 2/9, zW=/1.5 2d : The surface width grows logarithmically with time and its saturated value also increases logarithmically with size. b. Self-expanding membrane ( K >0 ) 1d : ? 2d : ?
with 1- p with p , Simulation algorithm of self-expanding membrane u Step 1. Select randomly a site . u Step 2. Find the globally maximal (minimal) height hmax(hmin) among the height distribution on a d–dimensional substrate. Step 3. a. Deposition (evaporation) is attempted with the probability p (1- p) with the exception of b-case. b. Deposition (evaporation) is attempted with the new probability u , if deposition (evaporation) process occurs at column with the minimal (maximal) height , if the minimal (maximal) height exists only one on the given configuration. * All the process should be satisfy the restricted solid-on-solid (RSOS) constraint, ( is one of nearest-neighbor bond vectors of a site in d-dimensional hypercubic lattice.)
Simulation Results 1. 1D results of self-expanding(SE) and self-flattening(SF) membranes in equilibrium state a. Raw data ( u = 0.6 , p = 1/2 ) SE SF
b. Effective exponent SF SE * We expect normal RSOS behavior(Random walk) at u=0 in both of SE and SF membranes.
TABLE 1 (Effective exponent, eff , t » LzW) ( * simple extrapolation data ) c. Scaling law of SF and SE membranes in 1D ( SE does not follow normal scaling relation. (X) ) SE : -> Self-repelling (avoiding) walks From above simulation results, we get ( SF follows normal scaling relation.) SF : Surface width, W, satisfies the dynamic scaling relation
2. 2D results of self-expanding(SE) and self-flattening(SF) membranes in equilibrium state a. Raw data ( u = 0.5 , p = 1/2 ) SE SF
b. In saturated regime (t » LzW) Slope of Normal RSOS ( KG : the effective Gaussian coupling constant (KG 0.9 )) * M. Den Nijs, J. Phys. A 18, L549 (1985) TABLE 2 (Slope a, t » LzW)
c. Scaling law of SE and SF membrane in 2D Surface width, W, satisfies the dynamic scaling relation From W 2 (t«LzW), we can estimate zW as zW 2.5. * D.-S. Lee, and M. den Nijs, Phys. Rev. E 65, 026104 (2002) Compared to the conventional logarithmic divergence (the above scaling law), the lattice size L is replaced by a logarithmically modified effective length, L/(ln L)1/4.
3. 1D& 2D results of self-expanding(SE) and self-flattening(SF) membrane in growing phase SE (1D) SF * In growing phase, SF follows normal RSOS behavior in 1, 2D. But SE membrane is more rough in 1D and 2D, membrane becomes more rough depending on substrate size L in 2D. SE (2D)
Conclusion 1. Self-expanding(SE) and self-flattening(SF) membranes in equilibrium state a. 1D : SE -> ( SE does not follow normal scaling relation.) ( SF follows normal scaling relation.) SF -> b. 2D : The surface width grows logarithmically with time and its saturated value also increases logarithmically with size. From this scaling law, two models have the slope of RSOS 1/(2KG) 0.174 in saturated regime(t » LzW)and we can estimate zW as zW 2.5. 2. Self-expanding(SE) and self-flattening(SF) membranes in growing phase a. SF follows normal RSOS behavior in 1, 2D. b. SE membrane is more rough than its SF in 1D, 2D, and it becomes more rough depending on substrate size L in 2D.