Adsorption of self-avoiding walks at a defect

Abstract

We consider the model of self-avoiding walks on the d-dimensional hypercubic lattice interacting with a d*-dimensional defect, where 1≤ d*<d. Such an interaction can be attractive or repulsive, and is controlled by a Boltzmann weight a associated with visits to the defect. When d=3 and d*=1 or 2, this can be seen as a model of long linear polymers in a good solvent, interacting with a linear filament or the interface of two liquids of different density. For all combinations of dimensions, there is a critical value a c which separates the desorbed and adsorbed phases of the model. We prove that in all cases a c=1, confirming conjectures by a number of authors.