We investigate a many-body wave function for particles on a cylinder known as Laughlin's function. It is the power of a Vandermonde determinant times a Gaussian. Our main result is: in a many-particle limit, at fixed radius, all correlation functions have a unique limit, and the limit state has a non-trivial period in the axial direction. The result holds regardless how large the radius is, for fermions as well as bosons. In addition, we explain how the algebraic structure used in proofs relates to the formalism of quasi-state decompositions
We supplement the determinantal and Pfaffian bounds of Sims and Warzel (Commun Math Phys 347:903--93...
Rapidly rotating two-dimensional ultracold Bose-Einstein condensates of spinless bosons in a harmoni...
International audienceIn two-dimensional space there are possibilities for quantum statistics contin...
We investigate a many-body wave function for particles on a cylinder known as Laughlin's function. I...
Laughlin states are N-particle wave functions, successfully describing the fractional quantum Hall e...
We consider general N-particle wave functions that have the form of a product of the Laughlin state ...
Revised version, to appear in Journal of Statistical Physics.International audienceWe consider gener...
We prove sharp density upper bounds on optimal length-scales for the ground states of classical 2D C...
Minor revisions. Accepted for publication in Communications in Mathematical PhysicsWe consider fract...
The most robust fractional quantum Hall states occur in the lowest Landau level at filling factors, ...
We investigate lattice effects on wave functions that are lattice analogs of bosonic and fermionic L...
Expository text based on joint works with Elliott H. Lieb, Alessandro Olgiati, Sylvia Serfaty and Ja...
Typos corrected and one remark added. To be published in Letters in Mathematical Physics.Internation...
A natural, "perturbative", problem in the modelization of the fractional quantum Hall effect is to m...
This paper has its motivation in the study of the Fractional Quantum Hall Effect. We consider 2D qua...
We supplement the determinantal and Pfaffian bounds of Sims and Warzel (Commun Math Phys 347:903--93...
Rapidly rotating two-dimensional ultracold Bose-Einstein condensates of spinless bosons in a harmoni...
International audienceIn two-dimensional space there are possibilities for quantum statistics contin...
We investigate a many-body wave function for particles on a cylinder known as Laughlin's function. I...
Laughlin states are N-particle wave functions, successfully describing the fractional quantum Hall e...
We consider general N-particle wave functions that have the form of a product of the Laughlin state ...
Revised version, to appear in Journal of Statistical Physics.International audienceWe consider gener...
We prove sharp density upper bounds on optimal length-scales for the ground states of classical 2D C...
Minor revisions. Accepted for publication in Communications in Mathematical PhysicsWe consider fract...
The most robust fractional quantum Hall states occur in the lowest Landau level at filling factors, ...
We investigate lattice effects on wave functions that are lattice analogs of bosonic and fermionic L...
Expository text based on joint works with Elliott H. Lieb, Alessandro Olgiati, Sylvia Serfaty and Ja...
Typos corrected and one remark added. To be published in Letters in Mathematical Physics.Internation...
A natural, "perturbative", problem in the modelization of the fractional quantum Hall effect is to m...
This paper has its motivation in the study of the Fractional Quantum Hall Effect. We consider 2D qua...
We supplement the determinantal and Pfaffian bounds of Sims and Warzel (Commun Math Phys 347:903--93...
Rapidly rotating two-dimensional ultracold Bose-Einstein condensates of spinless bosons in a harmoni...
International audienceIn two-dimensional space there are possibilities for quantum statistics contin...