Add to ORKGpre-printWe demonstrate how the generalized Pauli exclusion principle emerges for quasiparticle excitations in 2D topological phases. As an example, we examine the Levin-Wen model with the Fibonacci data (specified in the text), and construct the number operator for fluxons living on plaquettes. By numerically counting the many-body states with fluxon number fixed, the matrix of exclusion statistics parameters is identified and is shown to depend on the spatial topology (sphere or torus) of the system. Our work reveals the structure of the (many-body) Hilbert space and some general features of thermodynamics for quasiparticle excitations in topological matter
We systematically study the exclusion statistics for quasi-particles for Conformal Field Theory spec...
Many-body localized systems in which interactions and disorder come together defy the expectations o...
The fractional quantum Hall effect (FQHE), discovered in 1982 in a two-dimensional electron system, ...
Abstract An anyonic exclusion statistics, which generalizes the Bose-Einstein and Fermi-Dirac statis...
Strongly interacting topologically ordered many-body systems consisting of fermions or bosons can ho...
We generalize Haldane's definition of exclusion statistics to systems with infinite dimensional Hilb...
We discuss exclusion statistics parameters for quasiholes and quasielectrons excited above the fract...
Journal ArticleIn this paper we propose a new assignment for mutual exclusion statistics between qua...
Journal ArticleQuasielectrons and quasiholes in the fractional quantum Hall liquids obey fractional ...
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Journal ArticleWe study statistical characterization of the many-body states in exactly solvable mod...
We introduce a rigorous approach to the many-body spectral theory of extended anyons, that is quantu...
We propose a new fractional statistics for arbitrary dimensions, based on an extension of Pauli’s ex...
Topologically ordered phases are gapped states, defined by the properties of excitations when taken ...
We develop the basis of the two dimensional generalized quantum statistical systems by using results...
We systematically study the exclusion statistics for quasi-particles for Conformal Field Theory spec...
Many-body localized systems in which interactions and disorder come together defy the expectations o...
The fractional quantum Hall effect (FQHE), discovered in 1982 in a two-dimensional electron system, ...
Abstract An anyonic exclusion statistics, which generalizes the Bose-Einstein and Fermi-Dirac statis...
Strongly interacting topologically ordered many-body systems consisting of fermions or bosons can ho...
We generalize Haldane's definition of exclusion statistics to systems with infinite dimensional Hilb...
We discuss exclusion statistics parameters for quasiholes and quasielectrons excited above the fract...
Journal ArticleIn this paper we propose a new assignment for mutual exclusion statistics between qua...
Journal ArticleQuasielectrons and quasiholes in the fractional quantum Hall liquids obey fractional ...
Journal ArticleWe derive the occupation-number distribution in a generalized ideal gas of particles ...
Journal ArticleWe study statistical characterization of the many-body states in exactly solvable mod...
We introduce a rigorous approach to the many-body spectral theory of extended anyons, that is quantu...
We propose a new fractional statistics for arbitrary dimensions, based on an extension of Pauli’s ex...
Topologically ordered phases are gapped states, defined by the properties of excitations when taken ...
We develop the basis of the two dimensional generalized quantum statistical systems by using results...
We systematically study the exclusion statistics for quasi-particles for Conformal Field Theory spec...
Many-body localized systems in which interactions and disorder come together defy the expectations o...
The fractional quantum Hall effect (FQHE), discovered in 1982 in a two-dimensional electron system, ...