Stiffness dependence of critical exponents of semiflexible polymer chains situated on two-dimensional compact fractals

Abstract

We present an exact and Monte Carlo renormalization group (MCRG) study of semiflexible polymer chains on an infinite family of the plane-filling (PF) fractals. The fractals are compact, that is, their fractal dimension df is equal to 2 for all members of the fractal family enumerated by the odd integer b (3 b< ∞). For various values of stiffness parameter s of the chain, on the PF fractals (for 3 b 9) we calculate exactly the critical exponents (associated with the mean squared end-to-end distances of polymer chain) and γ (associated with the total number of different polymer chains). In addition, we calculate and γ through the MCRG approach for b up to 201. Our results show that, for each particular b, critical exponents are stiffness dependent functions, in such a way that the stiffer polymer chains (with smaller values of s) display enlarged values of , and diminished values of γ. On the other hand, for any specific s, the critical exponent monotonically decreases, whereas the critical exponent γ monotonically increases, with the scaling parameter b. We reflect on a possible relevance of the criticality of semiflexible polymer chains on the PF family of fractals to the same problem on the regular Euclidean lattices.