Add to ORKG4+epsilon pages, 4 figures; published version with minor correctionsInternational audienceInspired by the four-fold spin-valley symmetry of relativistic electrons in graphene, we investigate a possible SU(4) fractional quantum Hall effect, which may also arise in bilayer semiconductor quantum Hall systems with small Zeeman gap. SU(4) generalizations of Halperin's wave functions [Helv. Phys. Acta 56, 75 (1983)], which may break differently the original SU(4) symmetry, are studied analytically and compared, at nu=2/3, to exact-diagonalization studies
The commensurability condition is applied to determine the hierarchy of fractional fillings of Landa...
The fractional quantum Hall effect1–4 (FQHE) in an electron gas with multiple internal degrees of fr...
A two-dimensional electron system placed in a magnetic field develops Landau levels, where strong Co...
Multi-component quantum Hall systems, i.e. 2D electrons with an internal symmetry in a strong perpen...
Role of spin-like internal degrees of freedom in the fractional quantum Hall regime has been intensi...
We develop a Fermionic Chern-Simons (CS) theory for the fractional quantum Hall effect in monolayer ...
Monolayer and bilayer of graphene are new classes of two-dimensional electron systems with unconvent...
13 pages, 7 figures; reference added, accepted for publication in PRBWe consider trial wavefunctions...
4 pages, 3 figures; slightly modified published versionInternational audienceWe study the recently o...
The fractional quantum Hall effect is a very particular manifestation of electronic correlations in ...
We discuss the even-denominator fractional quantized Hall effect using halperin's wave functions, an...
In this paper the topological approach to quantum Hall effects is carefully described. Commensurabil...
We have focussed to study the even-denominator fractional quantum Hall (EDFQH) states observed in mo...
We investigate spin and valley symmetry-broken fractional quantum Hall phases within a formalism tha...
658-662The electrons in most of the conductors can be described by non-relativistic quantum mechani...
The commensurability condition is applied to determine the hierarchy of fractional fillings of Landa...
The fractional quantum Hall effect1–4 (FQHE) in an electron gas with multiple internal degrees of fr...
A two-dimensional electron system placed in a magnetic field develops Landau levels, where strong Co...
Multi-component quantum Hall systems, i.e. 2D electrons with an internal symmetry in a strong perpen...
Role of spin-like internal degrees of freedom in the fractional quantum Hall regime has been intensi...
We develop a Fermionic Chern-Simons (CS) theory for the fractional quantum Hall effect in monolayer ...
Monolayer and bilayer of graphene are new classes of two-dimensional electron systems with unconvent...
13 pages, 7 figures; reference added, accepted for publication in PRBWe consider trial wavefunctions...
4 pages, 3 figures; slightly modified published versionInternational audienceWe study the recently o...
The fractional quantum Hall effect is a very particular manifestation of electronic correlations in ...
We discuss the even-denominator fractional quantized Hall effect using halperin's wave functions, an...
In this paper the topological approach to quantum Hall effects is carefully described. Commensurabil...
We have focussed to study the even-denominator fractional quantum Hall (EDFQH) states observed in mo...
We investigate spin and valley symmetry-broken fractional quantum Hall phases within a formalism tha...
658-662The electrons in most of the conductors can be described by non-relativistic quantum mechani...
The commensurability condition is applied to determine the hierarchy of fractional fillings of Landa...
The fractional quantum Hall effect1–4 (FQHE) in an electron gas with multiple internal degrees of fr...
A two-dimensional electron system placed in a magnetic field develops Landau levels, where strong Co...