Litcius/Paper detail

Anyon braiding on a fractal lattice with a local Hamiltonian

Sourav Manna, Callum W. Duncan, Carrie A. Weidner, Jacob Sherson, Anne E. B. Nielsen

2022Physical review. A/Physical review, A19 citationsDOIOpen Access PDF

Abstract

There is a growing interest in searching for topology in fractal dimensions with the aim of finding different properties and advantages compared to the integer dimensional case. Here we construct a local Hamiltonian on a fractal lattice whose ground state exhibits topological braiding properties. The fractal lattice is obtained from a second-generation Sierpinski carpet with Hausdorff dimension 1.89. We use local potentials to trap and exchange anyons in the model, and the numerically obtained results for the exchange statistics of the anyons are close to the ideal statistics for quasiholes in a bosonic Laughlin state at half filling. For the considered system size, the energy gap is about three times larger for the fractal lattice than for a two-dimensional square lattice, and we find that the braiding results obtained on the fractal lattice are more robust against disorder. We propose a scheme to implement both fractal lattices and our proposed local Hamiltonian with ultracold atoms in optical lattices.

Topics & Concepts

Topological quantum computerFractalAnyonHamiltonian (control theory)PhysicsSquare latticeLattice (music)Fractal dimensionSierpinski triangleGround stateQuantum mechanicsTopology (electrical circuits)Statistical physicsMathematicsCombinatoricsQuantumMathematical analysisMathematical optimizationIsing modelAcousticsQuantum many-body systemsCold Atom Physics and Bose-Einstein CondensatesTopological Materials and Phenomena