Self-avoiding random walks on lattice strips
AUTOR(ES)
Wall, Frederick T.
RESUMO
A self-avoiding walk on an infinitely long lattice strip of finite width will asymptotically exhibit an end-to-end separation proportional to the number of steps. A proof of this proposition is presented together with comments concerning an earlier attempt to deal with the matter. In addition, some unproved, yet “obvious,” conjectures concerning self-avoiding walks are cited as basic propositions requiring study.
ACESSO AO ARTIGO
http://www.pubmedcentral.nih.gov/articlerender.fcgi?artid=383421Documentos Relacionados
- Statistics of self-avoiding walks confined to strips and capillaries
- Self-avoiding random walks at finite concentrations: The bulk phase limit
- Self-similar self-avoiding structures: Models for polymers
- Transição entre os comportamentos estendido e localizado em caminhadas estocásticas parcialmente auto-repulsivas em sistemas desordenados unidimensionais
- Deterministic partially self-avoiding walks: analytical results for the effect of tourists memory in the exploration of disordered media
