A self-avoiding walk on random strips
1982; Institute of Physics; Volume: 15; Issue: 3 Linguagem: Inglês
10.1088/0305-4470/15/3/008
ISSN1361-6447
Autores Tópico(s)Diffusion and Search Dynamics
ResumoTo describe a polymer in a random medium, the author considers a self-avoiding walk (SAW) on a lattice whose bonds are randomly favourable (with probability 1-p) or unfavourable (with probability p). The size of a SAW of N steps is calculated when the lattice is a strip by performing products of random matrices. When the weight of unfavourable bonds tends to 0, there exist critical concentrations pc where the size of the SAW undergoes first-order transitions. The origin of these transitions is explained as well as the fact that the limits p to 0 or p to 1 are discontinuous. Possible consequences for higher-dimensional systems are discussed.
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