Scaling behavior of linear polymers in disordered media
Abstract
Folklore has, that the universal scaling properties of linear polymers in disordered media are well described by the statistics of self-avoiding walks Folklore has, that the universal scaling properties of linear polymers in disordered media are well described by the statistics of self-avoiding walks (SAWs) on percolation clusters and their critical exponent SAW, with SAW implicitly referring to average SAW. Hitherto, static averaging has been commonly used, e.g. in numerical simulations, to determine what the average SAW is. We assert that only kinetic, rather than static, averaging can lead to asymptotic scaling behavior and corroborate our assertion by heuristic arguments and a renormalizable field theory. Moreover, we calculate to two-loop order SAW, the exponent max for the longest SAW, and a new family of multifractal exponents (α).
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