An analytical expression for the von Neumann entropy of the Laughlin wave function is obtained for any possible bipartition between the particles described by this wave function, for a filling fraction ν = 1 . Also, for a filling fraction ν = 1 / m , where m is an odd integer, an upper bound on this entropy is exhibited. These results yield a bound on the smallest possible size of the matrices for an exact representation of the Laughlin ansatz in terms of a matrix-product state. An analytical matrix-product state representation of this state is proposed in terms of representations of the Clifford algebra. For ν = 1 , this representation is shown to be asymptotically optimal in the limit of a large number of particles
We show that for a finite von Neumann algebra, the states that maximise Segal’s entropy with a given...
We introduce a new class of unitary transformations based on the su(1, 1) Lie algebra that generaliz...
Abstract We consider entanglement of first-quantized identical particles by adopting an algebraic ap...
An analytical expression for the von Neumann entropy of the Laughlin wave function is obtained for a...
An analytical expression for the von Neumann entropy of the Laughlin wave function is obtained for a...
We consider general N-particle wave functions that have the form of a product of the Laughlin state ...
The most robust fractional quantum Hall states occur in the lowest Landau level at filling factors, ...
Revised version, to appear in Journal of Statistical Physics.International audienceWe consider gener...
International audienceThe decomposition of the Laughlin wave function in the Slater orthogonal basis...
We develop a method to efficiently calculate trial wave functions for quantum Hall systems which inv...
We investigate a many-body wave function for particles on a cylinder known as Laughlin's function. I...
We analyze Susskind's proposal of applying the non-commutative Chern-Simons theory to the quantum Ha...
Abstract Using random matrix techniques and the theory of Matrix Product States we show that reduced...
AbstractA new upper bound for the von Neumann entropy of a state of a compound quantum system is giv...
We prove that the asymptotic behavior of the recoupling coefficients of the symmetric group S-k is c...
We show that for a finite von Neumann algebra, the states that maximise Segal’s entropy with a given...
We introduce a new class of unitary transformations based on the su(1, 1) Lie algebra that generaliz...
Abstract We consider entanglement of first-quantized identical particles by adopting an algebraic ap...
An analytical expression for the von Neumann entropy of the Laughlin wave function is obtained for a...
An analytical expression for the von Neumann entropy of the Laughlin wave function is obtained for a...
We consider general N-particle wave functions that have the form of a product of the Laughlin state ...
The most robust fractional quantum Hall states occur in the lowest Landau level at filling factors, ...
Revised version, to appear in Journal of Statistical Physics.International audienceWe consider gener...
International audienceThe decomposition of the Laughlin wave function in the Slater orthogonal basis...
We develop a method to efficiently calculate trial wave functions for quantum Hall systems which inv...
We investigate a many-body wave function for particles on a cylinder known as Laughlin's function. I...
We analyze Susskind's proposal of applying the non-commutative Chern-Simons theory to the quantum Ha...
Abstract Using random matrix techniques and the theory of Matrix Product States we show that reduced...
AbstractA new upper bound for the von Neumann entropy of a state of a compound quantum system is giv...
We prove that the asymptotic behavior of the recoupling coefficients of the symmetric group S-k is c...
We show that for a finite von Neumann algebra, the states that maximise Segal’s entropy with a given...
We introduce a new class of unitary transformations based on the su(1, 1) Lie algebra that generaliz...
Abstract We consider entanglement of first-quantized identical particles by adopting an algebraic ap...