Abstract
We revisit the physics of a Kondo impurity coupled to a fermionic host with a diverging power-law density of states near the Fermi level,
ρ
(
ω
)
∼
|
ω
|
r
, with exponent
−
1
r
0
. Using the analytical understanding of several fixed points, based partially on powerful mappings between models with bath exponents
r
and
(
−
r
)
, combined with accurate numerical renormalization group calculations, we determine thermodynamic quantities within the stable phases and also near the various quantum phase transitions. Antiferromagnetic Kondo coupling leads to strong screening with a negative zero-temperature impurity entropy, while ferromagnetic Kondo coupling can induce a stable fractional spin moment. We formulate the quantum field theories for all critical fixed points of the problem, which are fermionic in nature and allow for a perturbative renormalization-group treatment.
ρ
(
ω
)
∼
|
ω
|
r
, with exponent
−
1
r
0
. Using the analytical understanding of several fixed points, based partially on powerful mappings between models with bath exponents
r
and
(
−
r
)
, combined with accurate numerical renormalization group calculations, we determine thermodynamic quantities within the stable phases and also near the various quantum phase transitions. Antiferromagnetic Kondo coupling leads to strong screening with a negative zero-temperature impurity entropy, while ferromagnetic Kondo coupling can induce a stable fractional spin moment. We formulate the quantum field theories for all critical fixed points of the problem, which are fermionic in nature and allow for a perturbative renormalization-group treatment.
| Original language | English |
|---|---|
| Article number | 195119 |
| Journal | Physical Review B |
| Volume | 88 |
| Issue number | 19 |
| DOIs | |
| Publication status | Published - 15 Nov 2013 |
Bibliographical note
13 pages, 11 figuresKeywords
- cond-mat.str-el