An infinite family of adsorption models and restricted Lukasiewicz paths

Abstract

We define (k,)-restricted Lukasiewicz paths, k∈N0, and use these paths as models of polymer adsorption. We write down a polynomial expression satisfied by the generating function for arbitrary values of (k,). The resulting polynomial is of degree +1 and hence cannot be solved explicitly for sufficiently large . We provide two different approaches to obtain the phase diagram. In addition to a more conventional analysis, we also develop a new mathematical characterization of the phase diagram in terms of the discriminant of the polynomial and a zero of its highest degree coefficient. We then give a bijection between (k,)-restricted Lukasiewicz paths and "rise"-restricted Dyck paths, identifying another family of path models which share the same critical behaviour. For (k,)=(1,∞) we provide a new bijection to Motzkin paths. We also consider the area-weighted generating function and show that it is a q-deformed algebraic function. We determine the generating function explicitly in particular cases of (k,)-restricted Lukasiewicz paths, and for (k,)=(0,∞) we provide a bijection to Dyck paths.