Add to ORKGAbstract. It is shown that it is possible to bosonize fermions in any number of dimen-sions using the hydrodynamic variables, namely the velocity potential and density. The slow part of the Fermi field is defined irrespective of dimensionality and the commutators of this field with currents and densities are exponentiated using the velocity potential as conjugate to the density. An action in terms of these canonical bosonic variables is pro-posed that reproduces the correct current and density correlations. This formalism in one dimension is shown to be equivalent to the Tomonaga–Luttinger approach as it leads to the same propagator and exponents. We compute the one-particle properties of a spinless homogeneous Fermi system in two spatial d...
Bosonization is a useful technique for studying systems of interacting fermions in low dimensions. I...
3noWe present a comparison between the bosonization results for quantum quenches and exact diagonali...
Strong electron correlation phenomena are ubiquitous, such as unconventional superconductivity and t...
We present a detailed derivation of the representation of one-dimensional Fermionic operators in ter...
Abstract. We summarize recent developments in the field of higher dimensional bosonization made by S...
In this thesis the method of bosonization of fermionic many-body systems in any number of dimensions...
The (1+1)-dimensional bosonization relations for fermionic mass terms are derived by choosing a spec...
We discuss a generalization of the conventional bosonization procedure to the case of current-curren...
Here we address the problem of bosonizing massive fermions without making expansions in the fermion ...
We discuss an approach to higher-dimensional bosonization of interacting fermions based on a picture...
The quantum field Hamiltonian expressed in terms of density and current density variables has been e...
We derive the phase space particle density operator in the 'droplet' picture of bosonization in term...
I describe in these notes the physical properties of one dimensional interacting quantum particles. ...
This chapter gives an introduction to the physics of interacting quantum systems, both bosonic and f...
Correlated Density Matrix (CDM) theory permits formal analyses of microscopic properties of strongly...
Bosonization is a useful technique for studying systems of interacting fermions in low dimensions. I...
3noWe present a comparison between the bosonization results for quantum quenches and exact diagonali...
Strong electron correlation phenomena are ubiquitous, such as unconventional superconductivity and t...
We present a detailed derivation of the representation of one-dimensional Fermionic operators in ter...
Abstract. We summarize recent developments in the field of higher dimensional bosonization made by S...
In this thesis the method of bosonization of fermionic many-body systems in any number of dimensions...
The (1+1)-dimensional bosonization relations for fermionic mass terms are derived by choosing a spec...
We discuss a generalization of the conventional bosonization procedure to the case of current-curren...
Here we address the problem of bosonizing massive fermions without making expansions in the fermion ...
We discuss an approach to higher-dimensional bosonization of interacting fermions based on a picture...
The quantum field Hamiltonian expressed in terms of density and current density variables has been e...
We derive the phase space particle density operator in the 'droplet' picture of bosonization in term...
I describe in these notes the physical properties of one dimensional interacting quantum particles. ...
This chapter gives an introduction to the physics of interacting quantum systems, both bosonic and f...
Correlated Density Matrix (CDM) theory permits formal analyses of microscopic properties of strongly...
Bosonization is a useful technique for studying systems of interacting fermions in low dimensions. I...
3noWe present a comparison between the bosonization results for quantum quenches and exact diagonali...
Strong electron correlation phenomena are ubiquitous, such as unconventional superconductivity and t...