Beyond Flory theory: Distribution functions for interacting lattice trees

TL;DR

This paper advances the understanding of interacting lattice trees by analyzing their distribution functions beyond Flory theory using scaling arguments and simulations, revealing universal behaviors and proposing a coherent theoretical framework.

Contribution

It introduces a comprehensive analysis of distribution functions for various types of interacting lattice trees, extending Flory theory with new universal scaling forms and relations.

Findings

Distribution functions follow Redner-des Cloizeaux form

Universal scaling observed across different tree sizes

Generalized Fisher-Pincus relations established

Abstract

While Flory theories provide an extremely useful framework for understanding the behavior of interacting, randomly branching polymers, the approach is inherently limited. Here we use a combination of scaling arguments and computer simulations to go beyond a Gaussian description. We analyse distributions functions for a wide variety of quantities characterising the tree connectivities and conformations for the four different statistical ensembles, which we have studied numerically in [Rosa and Everaers, J. Phys. A (2016, published) and J. Chem. Phys. (2016, to appear)]: (a) ideal randomly branching polymers, (b) $2d$ and $3d$ melts of interacting randomly branching polymers, (c) $3d$ self-avoiding trees with annealed connectivity and (d) $3d$ self-avoiding trees with quenched ideal connectivity. In particular, we investigate the distributions (i) $p_N(n)$ of the weight, $n$, of branches cut from trees of mass $N$ by severing randomly chosen bonds; (ii) $p_N(l)$ of the contour distances, $l$, between monomers; (iii) $p_N(\vec r)$ of spatial distances, $\vec r$, between monomers, and (iv) $p_N(\vec r|l)$ of the end-to-end distance of paths of length $l$. Data for different tree sizes superimpose, when expressed as functions of suitably rescaled observables $\vec x = \vec r/\langle r^2(N) \rangle$ or $x =l/\langle l(N) \rangle$. In particular, we observe a generalised Kramers relation for the branch weight distributions (i) and find that all the other distributions (ii-iv) are of Redner-des Cloizeaux type, $q(\vec x) = C \, |x|^\theta\ \exp \left( -(K |x|)^t \right)$. We propose a coherent framework, including generalised Fisher-Pincus relations, relating most of the RdC exponents to each other and to the contact and Flory exponents for interacting trees.