9 research outputs found
Critical Ising model and spanning trees partition functions
We prove that the squared partition function of the two-dimensional critical
Ising model defined on a finite, isoradial graph , is equal to
times the partition function of spanning trees of the graph
, where is the graph extended along the boundary; edges
of are assigned Kenyon's [Ken02] critical weights, and boundary edges of
have specific weights. The proof is an explicit construction,
providing a new relation on the level of configurations between two classical,
critical models of statistical mechanics.Comment: 38 pages, 26 figure
The critical Z-invariant Ising model via dimers: locality property
We study a large class of critical two-dimensional Ising models, namely
critical Z-invariant Ising models. Fisher [Fis66] introduced a correspondence
between the Ising model and the dimer model on a decorated graph, thus setting
dimer techniques as a powerful tool for understanding the Ising model. In this
paper, we give a full description of the dimer model corresponding to the
critical Z-invariant Ising model, consisting of explicit expressions which only
depend on the local geometry of the underlying isoradial graph. Our main result
is an explicit local formula for the inverse Kasteleyn matrix, in the spirit of
[Ken02], as a contour integral of the discrete exponential function of
[Mer01a,Ken02] multiplied by a local function. Using results of [BdT08] and
techniques of [dT07b,Ken02], this yields an explicit local formula for a
natural Gibbs measure, and a local formula for the free energy. As a corollary,
we recover Baxter's formula for the free energy of the critical Z-invariant
Ising model [Bax89], and thus a new proof of it. The latter is equal, up to a
constant, to the logarithm of the normalized determinant of the Laplacian
obtained in [Ken02].Comment: 55 pages, 29 figure
Quivers, YBE and 3-manifolds
We study 4d superconformal indices for a large class of N=1 superconformal
quiver gauge theories realized combinatorially as a bipartite graph or a set of
"zig-zag paths" on a two-dimensional torus T^2. An exchange of loops, which we
call a "double Yang-Baxter move", gives the Seiberg duality of the gauge
theory, and the invariance of the index under the duality is translated into
the Yang-Baxter-type equation of a spin system defined on a "Z-invariant"
lattice on T^2. When we compactify the gauge theory to 3d, Higgs the theory and
then compactify further to 2d, the superconformal index reduces to an integral
of quantum/classical dilogarithm functions. The saddle point of this integral
unexpectedly reproduces the hyperbolic volume of a hyperbolic 3-manifold. The
3-manifold is obtained by gluing hyperbolic ideal polyhedra in H^3, each of
which could be thought of as a 3d lift of the faces of the 2d bipartite
graph.The same quantity is also related with the thermodynamic limit of the BPS
partition function, or equivalently the genus 0 topological string partition
function, on a toric Calabi-Yau manifold dual to quiver gauge theories. We also
comment on brane realization of our theories. This paper is a companion to
another paper summarizing the results.Comment: 61 pages, 16 figures; v2: typos correcte
Quadri-tilings of the plane
33 pages, 11 figuresWe introduce {\em quadri-tilings} and show that they are in bijection with dimer models on a {\em family} of graphs arising from rhombus tilings. Using two height functions, we interpret a sub-family of all quadri-tilings, called {\em triangular quadri-tilings}, as an interface model in dimension 2+2. Assigning "critical" weights to edges of , we prove an explicit expression, only depending on the local geometry of the graph , for the minimal free energy per fundamental domain Gibbs measure; this solves a conjecture of \cite{Kenyon1}. We also show that when edges of are asymptotically far apart, the probability of their occurrence only depends on this set of edges. Finally, we give an expression for a Gibbs measure on the set of {\em all} triangular quadri-tilings whose marginals are the above Gibbs measures, and conjecture it to be that of minimal free energy per fundamental domain