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Statistical Topography of Glassy Interfaces | | Chen Zeng
; J. Kondev
; D. McNamara
; A. A. Middleton
; | | Date: |
8 Sep 1997 | | Subject: | Disordered Systems and Neural Networks | cond-mat.dis-nn | | Affiliation: | Rutgers), J. Kondev (Brown), D. McNamara and A. A. Middleton (Syracuse | | Abstract: | Statistical topography of two-dimensional interfaces in the presence of quenched disorder is studied utilizing combinatorial optimization algorithms. Finite-size scaling is used to measure geometrical exponents associated with contour loops and fully packed loops. We find that contour-loop exponents depend on the type of disorder (periodic ``vs’’ non-periodic) and they satisfy scaling relations characteristic of self-affine rough surfaces. Fully packed loops on the other hand are unaffected by disorder with geometrical exponents that take on their pure values. | | Source: | arXiv, cond-mat/9709092 | | Services: | Forum | Review | PDF | Favorites | |
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