We consider general N-particle wave functions that have the form of a product of the Laughlin state with filling factor 1/ℓ and an analytic function of the N variables. This is the most general form of a wave function that can arise through a perturbation of the Laughlin state by external potentials or impurities, while staying in the lowest Landau level and maintaining the strong correlations of the original state. We show that the perturbation can only shift or lower the 1-particle density but nowhere increase it above a maximum value. Consequences of this bound for the response of the Laughlin state to external fields are discussed.© The Author(s) 201
An analytical expression for the von Neumann entropy of the Laughlin wave function is obtained for a...
Strongly correlated two-dimensional electronic systems subject to a perpendicular magnetic field at ...
We develop a method to efficiently calculate trial wave functions for quantum Hall systems which inv...
Revised version, to appear in Journal of Statistical Physics.International audienceWe consider gener...
Typos corrected and one remark added. To be published in Letters in Mathematical Physics.Internation...
We prove sharp density upper bounds on optimal length-scales for the ground states of classical 2D C...
Expository text based on joint works with Elliott H. Lieb, Alessandro Olgiati, Sylvia Serfaty and Ja...
We investigate a many-body wave function for particles on a cylinder known as Laughlin's function. I...
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...
This paper has its motivation in the study of the Fractional Quantum Hall Effect. We consider 2D qua...
Laughlin states are N-particle wave functions, successfully describing the fractional quantum Hall e...
A natural, "perturbative", problem in the modelization of the fractional quantum Hall effect is to m...
I discuss results bearing on a variational problem of a new type, inspired by fractional quantum Hal...
An analytical expression for the von Neumann entropy of the Laughlin wave function is obtained for a...
Strongly correlated two-dimensional electronic systems subject to a perpendicular magnetic field at ...
We develop a method to efficiently calculate trial wave functions for quantum Hall systems which inv...
Revised version, to appear in Journal of Statistical Physics.International audienceWe consider gener...
Typos corrected and one remark added. To be published in Letters in Mathematical Physics.Internation...
We prove sharp density upper bounds on optimal length-scales for the ground states of classical 2D C...
Expository text based on joint works with Elliott H. Lieb, Alessandro Olgiati, Sylvia Serfaty and Ja...
We investigate a many-body wave function for particles on a cylinder known as Laughlin's function. I...
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...
This paper has its motivation in the study of the Fractional Quantum Hall Effect. We consider 2D qua...
Laughlin states are N-particle wave functions, successfully describing the fractional quantum Hall e...
A natural, "perturbative", problem in the modelization of the fractional quantum Hall effect is to m...
I discuss results bearing on a variational problem of a new type, inspired by fractional quantum Hal...
An analytical expression for the von Neumann entropy of the Laughlin wave function is obtained for a...
Strongly correlated two-dimensional electronic systems subject to a perpendicular magnetic field at ...
We develop a method to efficiently calculate trial wave functions for quantum Hall systems which inv...