Höck, Martin: Numerical Renormalization Group calculations of the magnetization of Kondo impurities. 2013
Inhalt
- Acknowledgments
- Introduction
- Introduction, motivation, and outline
- The single-channel single-impurity Kondo model
- The Kondo effect
- The Hamiltonian of the single-channel single-impurity Kondo model
- A minimal model for deposited magnetic atoms and molecules
- The bilinear spin Hamiltonian for the description of an isolated magnetic molecule
- A Kondo model for deposited magnetic atoms and molecules
- Symmetry properties of the Hamiltonian
- The Numerical Renormalization Group for the thermodynamics of the single-channel Kondo model
- Overview of a Numerical Renormalization Group calculation
- The Numerical Renormalization Group (NRG)
- Transformation to a continuous energy representation
- Transformation to a dimensionless representation
- Example: One-dimensional tight-binding electrons
- Logarithmic discretization I: Standard discretization with z-averaging
- Logarithmic discretization II: Improved discretization by Campo & Oliveira
- Excursus: Continuum result for the spectral density of the operator f_{0 \mu}
- Spectral densities
- One-electron spectral density of the ideal Fermi gas
- Spectral density of f_{0 \mu}
- Logarithmic discretization III: "Optimal" discretization by Žitko & Pruschke
- Parameters of the logarithmically discretized Hamiltonian for a constant density of states
- Tridiagonalization of the discretized Hamiltonian: Mapping to the "Wilson chain"
- Iterative diagonalization of the Wilson chain, basis truncation, and Renormalization Group aspect
- Iterative construction of the Wilson chain and rescaling of the truncated Hamiltonians
- "Traditional" basis truncation
- "Modern" basis truncation
- Motivation for the energy-based truncation scheme
- Renormalization Group aspect
- Implementation of the iterative diagonalization
- Creating a matrix representation using quantum numbers Q and M
- Excursus: Transforming to the eigenbasis of the Hamiltonian
- Calculating the matrix representations of the creation operators for the next step
- Temperature in a NRG calculation
- Calculation of thermodynamic observables
- Application: The single-impurity Kondo model in zero magnetic field
- The single-channel single-impurity Kondo model with and without uniaxial anisotropy in non-zero magnetic field
- The isotropic single-impurity Kondo model in non-zero magnetic field
- The Bethe ansatz solution for the universal impurity contribution to the magnetization of the isotropic single-impurity Kondo model
- The closed expressions for the zero-temperature impurity contribution to the magnetization
- Asymptotic field dependencies of the zero-temperature impurity contribution to the magnetization
- "Numerical Renormalization Group calculations of the magnetization of Kondo impurities with and without uniaxial anisotropy"
- Abstract
- Introduction
- Model
- Method and observables
- Impurities with D=0
- Impurities with easy axis anisotropy
- Field-dependence of the impurity magnetization
- Impurity contribution to the magnetization and the susceptibility
- Impurities with hard axis anisotropy
- Magnetic field dependence of the impurity magnetization
- Field-induced Kondo effects
- Effective models near groundstate level crossings in the limit of arbitrarily large anisotropy
- Magnetic field dependence of impurity contributions near effective level crossing fields
- Temperature dependence of impurity contributions at effective level crossing fields
- Properties of the effective model for vanishing electron g-factor
- Comparison of anisotropy- and field-induced pseudo-spin-1/2 Kondo effect for half-integer impurity spin
- Summary
- Acknowledgments
- Numerical Renormalization Group calculations with conduction electron Zeeman term
- Dependence of the zero-temperature magnetization on the coupling strength for D=0
- Effect of the electron g-factor on M and the connection between M and M_{imp}
- Technical details regarding the study of the effective model for vanishing electron g-factor
- References
- Summary
- Appendix
- Initialization of the iterative diagonalization of the Wilson chain
- Bibliography