2 research outputs found
The critical fugacity for surface adsorption of self-avoiding walks on the honeycomb lattice is
In 2010, Duminil-Copin and Smirnov proved a long-standing conjecture of
Nienhuis, made in 1982, that the growth constant of self-avoiding walks on the
hexagonal (a.k.a. honeycomb) lattice is A key identity
used in that proof was later generalised by Smirnov so as to apply to a general
O(n) loop model with (the case corresponding to SAWs).
We modify this model by restricting to a half-plane and introducing a surface
fugacity associated with boundary sites (also called surface sites), and
obtain a generalisation of Smirnov's identity. The critical value of the
surface fugacity was conjectured by Batchelor and Yung in 1995 to be This value plays a crucial role in our generalized
identity, just as the value of growth constant did in Smirnov's identity.
For the case , corresponding to \saws\ interacting with a surface, we
prove the conjectured value of the critical surface fugacity. A crucial part of
the proof involves demonstrating that the generating function of self-avoiding
bridges of height , taken at its critical point , tends to 0 as
increases, as predicted from SLE theory.Comment: Major revision, references updated, 25 pages, 13 figure