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Center for Nonlinear Studies |
We discuss the "bond algebraic" approach to dualities with a particular emphasis on Majorana systems. We show how to analyze readily solvable models (such as Kitaev's honeycomb model), within this framework. Our focus is, however, on interacting Majorana fermion systems. We illustrate how universal spin duals can be constructed for these on general graphs in an arbitary number of dimensions. We introduce an "XXZ honeycomb compass" model which constitutes a two-component spin analog of Kitaev's honeycomb model. With the aid of these general duals, we further illustrate how to construct fermionic systems with Hubbard type interactions that exhibit non-trivial critical behavior. Time permitting, we will introduce general holographic bounds, examine "frustration free" systems derived from the usual Hubbard model on the pyrochlore lattice and illustrate how fractionalization and deconfined quantum critical behavior can occur in these pyrochlore lattice systems.
Host: Rolando Somma