Berlin 2015 – scientific programme
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DY: Fachverband Dynamik und Statistische Physik
DY 15: Statistical Physics - general
DY 15.7: Talk
Tuesday, March 17, 2015, 11:15–11:30, BH-N 334
Multiply charged monopoles in cubic dimer model — •Sreejith Ganesh Jaya1 and Stephen Powell2 — 1MPI PKS, Dresden, Germany — 2University of Nottingham, UK
The classical cubic dimer model is a 3 dimensional statistical mechanical system whose degrees of freedom are dimers that occupy the edges between nearest neighbour vertices of a cubic lattice. Dimer occupancies are subject to the local constraint that every lattice point is associated with exactly one dimer. In the presence of an aligning interaction, it is known that the system exhibits an unconventional continuous thermal phase transition from a symmetry broken columnar phase to a Coulomb-phase. The transition is in the NCCP1 universality class, which also describes the Neel-VBS transition in the JQ model and the S=1/2 Heisenberg model with suppression of hedgehog defects. Using Monte-Carlo simulations of a pair of defects in a background of fluctuating dimers, we calculate the scaling exponents for fugacities of monopole defects of charge Q=2 and 3 in this critical point. Our estimates suggest that Q=3 monopoles are relevant and could therefore drive the JQ model away from the NCCP1 critical point on a hexagonal lattice.