Logarithmic correlation functions for critical dense polymers on the cylinder
Alexi Morin-Duchesne, Jesper Lykke Jacobsen

TL;DR
This paper calculates lattice correlation functions for critical dense polymers on a cylinder, linking them to conformal field theory with central charge -2, and provides explicit formulas and asymptotics that match theoretical predictions.
Contribution
It provides explicit lattice correlation functions for dense polymers on a cylinder and connects these results to conformal field theory, including differential equations and structure constants.
Findings
Explicit formulas for lattice correlators on finite cylinders.
Asymptotic behaviors match conformal field theory predictions.
Fusion of boundary condition changing fields is non-abelian.
Abstract
We compute lattice correlation functions for the model of critical dense polymers on a semi-infinite cylinder of perimeter . In the lattice loop model, contractible loops have a vanishing fugacity whereas non-contractible loops have a fugacity . These correlators are defined as ratios of partition functions, where is a reference partition function wherein only simple arcs are attached to the boundary of the cylinder. For , the boundary is also decorated with simple arcs, but it also has two positions and where the boundary condition is different. We investigate two such kinds of boundary conditions: (i) there is a single node at each of these points where a long arc is attached, and (ii) there are pairs of adjacent nodes at these points where two long arcs are attached. We find explicit expressions for these correlators for finite…
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