Branched Polymers on the Given-Mandelbrot family of fractals

Abstract

We study the average number An per site of the number of different configurations of a branched polymer of n bonds on the Given-Mandelbrot family of fractals using exact real-space renormalization. Different members of the family are characterized by an integer parameter b, b > 1. The fractal dimension varies from log_2 3 to 2 as b is varied from 2 to infinity. We find that for all b > 2, An varies as λn exp(b n ), where λ and b are some constants, and 0 < <1. We determine the exponent , and the size exponent (average diameter of polymer varies as n), exactly for all b > 2. This generalizes the earlier results of Knezevic and Vannimenus for b = 3 [Phys. Rev B 35 (1987) 4988].

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