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THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Outline, Collaborators, References Introduction to extensions of DMFT for applications to
electronic structure. [ S. Savrasov and GK cond-matt0308053]
C-DMFTstudy of the Mott transition. [O. Parcollet G. Biroli and GK cond-mat 0308577 ]
Applications to materials: MIT in Ti2O3[S. Poteryaev S. Lichtenstein and GK cond-mat 0311319 ]
Delta –Epsilon transition in Plutonium [Xi Dai S. Savrasov GK A Migliori H. Ledbetter E. Abrahams Science 300, 953 (2003)]
Outlook.
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
cluster cluster exterior exteriorH H H H
H clusterH
Simpler "medium" Hamiltonian
cluster exterior exteriorH H
Dynamical Mean Field Theory (DMFT) Cavity Construction: A. Georges and G. Kotliar PRB 45, 6479 (1992).
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
DMFT Cavity Construction. A. Georges and G. Kotliar PRB 45, 6479 (1992). First happy marriage of atomic and band physics.
Reviews: A. Georges G. Kotliar W. Krauth and M. Rozenberg RMP68 , 13, 1996 Gabriel Kotliar and Dieter Vollhardt Physics Today 57,(2004)
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
1
10
1( ) ( )
( )n nn k nk
G i ii t i
w ww m w
-
-é ùê ú= +Sê ú- + - Sê úë ûå
EDMFT [H. Kajueter Rutgers Ph.D Thesis 1995 Si and Smith PRL77, 3391(1996) R. Chitra and G. Kotliar PRL84,3678 (2000)]
1
10
1( ) ( )
V ( )n nk nk
D i ii
w ww
-
-é ùê ú= +Pê ú- Pê úë ûå
0
1 † 10 0 ( )( )[ ] ( ) [ ( ) ( ) ]n n n n S Gi G G i c i c ia bw w w w- -S = + á ñ
†
0 0
( ) ( , ') ( ') ( , ') o o o oc Go c n n Ub b
s st t t t d t t ¯+òò
† †
, ,
( )( )ij ij i j j i i ii j i
t c c c c U n n
()
1 100 0 0( )[ ] ( ) [ ( ) ( ) ]n n n n Si G D i n i n iw w w w- -P = + á ñ
,ij i j
i j
V n n
0 0( , ')Do n nt t+
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Site Cell. Cellular DMFT. C-DMFT. G. Kotliar,S.. Savrasov, G. Palsson and G. Biroli, Phys. Rev. Lett. 87, 186401 (2001)
tˆ(K) hopping expressed in the superlattice notations.
•Other cluster extensions (DCA Jarrell Krishnamurthy, Katsnelson and Lichtenstein periodized scheme, Nested
Cluster Schemes Schiller Ingersent ), causality issues, O. Parcollet, G. Biroli and GK cond-matt 0307587 (2003)
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Two paths for ab-initio calculation of electronic structure of strongly correlated materials
Correlation Functions Total Energies etc.
Model Hamiltonian
Crystal structure +Atomic positions
DMFT ideas can be used in both cases.
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
LDA+DMFT V. Anisimov, A. Poteryaev, M. Korotin, A. Anokhin and G. Kotliar, J. Phys. Cond. Mat. 35, 7359 (1997). A Lichtenstein and M. Katsnelson PRB 57, 6884 (1988).
The light, SP (or SPD) electrons are extended, well described by LDA .The heavy, D (or F) electrons are localized treat by DMFT.
LDA Kohn Sham Hamiltonian already contains an average interaction of the heavy electrons, subtract this out by shifting the heavy level (double counting term)
Kinetic energy is provided by the Kohn Sham Hamiltonian (sometimes after downfolding ). The U matrix can be estimated from first principles of viewed as parameters. Solve resulting model using DMFT.
Impurity Solvers: QMC-IPT-NCA……..
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Functional formulation. Chitra and Kotliar Phys. Rev. B 63, 115110(2001), Ambladah et. al. Int. Jour Mod. Phys. B 13, 535 (1999) Savrasov and Kotliarcond- matt0308053 (2003).
1 †1( ) ( , ') ( ') ( ) ( ) ( )
2Cx V x x x i x x xff f y y-+ +òò ò
†( ) ( ' ')G R Ry r y r=- < > ( ' ') ( ) ( ' ') ( )R R R R Wf r f r f r f r< >- < >< >=Ir>=|R, >
[ , ] [ , , 0, 0]EDMFT loc loc nonloc nonlocG W G W G W
1 1 1 10
1 1[ , ] [ ] [ ] [ , ]
2 2 C hartreeG W TrLnG Tr G G G TrLnW Tr V W W E G W
Double loop in Gloc and Wloc
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Next Step: GW+EDMFT S. Savrasov and GK.(2001). P.Sun and GK. (2002). S. Biermann F. Aersetiwan and A.Georges . (2002). P Sun and G.K (2003)
Implementation in the context of a model Hamiltonian with short range interactions.P Sun and G. Kotliar cond-matt 0312303 or with a static U on heavy electrons, without self consistency. Biermann et.al. PRL 90,086402 (2003)
W
W
EH +
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Self-Consistency loop. S. Savrasov and G. Kotliar (2001) and
cond-matt 0308053
G0 G
Im puritySolver
S .C .C .
0( ) ( , , ) i
i
r T G r r i e w
w
r w+
= å
2| ( ) | ( )k xc k LMTOV H ka ac r c- Ñ + =
DMFT
U
E
0( , , )HHi
HH
i
n T G r r i e w
w
w+
= å
THE STATE UNIVERSITY OF NEW JERSEY
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How good is approach ?
It becomes exact as the coordination number increases or in the limit of infinite dimensions introduced by Metzner and Vollhardt. PRL 62,34, (1989).
How good is it in low dimensions ? Promising recent developments from theory and experiments.
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Schematic DMFT phase diagram and DOS of a partially frustrated integer filled Hubbard model and pressure driven Mott transition.
S Lefebvre et al. PRL (2000)
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Recent Experiments support qualitative single site DMFT predictions
Mo et al., Phys. Rev.Lett. 90, 186403 (2003).
Limelette et. al.(2003)
Ito et. al. (1995)
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Theoretical issue: is there a Mott transitionin the integer filled Hubbard model, and is it well described by the single site DMFT ?
Study frustrated t t’ model t’/t=.9
YES! Parcollet Biroli Kotliar cond-matt 0308577
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Evolution of the k resolved Spectral Function at zero frequency.
Uc=2.35+-.05, Tc/D=1/44
U/D=2 U/D=2.25
( 0, )vs k A k
Qualitative effect, formation of hot regions! D wave gapping of the single particle spectra
as the Mott transition is approached. Very strong k dependece near the trasition.
THE STATE UNIVERSITY OF NEW JERSEY
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Ti2O3 : Coulomb or Pauling
C.E.Riceet all, Acta CrystB33,1342(1977) LTS 250 K, HTS 750 K.
THE STATE UNIVERSITY OF NEW JERSEY
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Ti2O3.
Isostructural to V2-xCrxO3. Al lot of the qualitative physics of the high temperature part of the phase diagram of V2O3 can be understood within single site DMFT. Is this true in Ti2O3?
Band Structure Calculations good metal. L.F. Mattheiss, J. Phys.: Condens. Matter 8, 5987 (1996) .Unrestricted Hartree Fock calculations produce large antiferromagnetic gap. M. Cati, et. al. Phys. Rev. B. f55 , 16122 (1997).
THE STATE UNIVERSITY OF NEW JERSEY
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U = 2, J = 0.5, W = 0.5β = 20 eV-1, LT structure
U = 2, J = 0.5, W = 0.5 β = 10 eV-1, HT
structure
2site-Cluster DMFT with intersite Coulomb2site-Cluster DMFT with intersite Coulomb
A. Poteryaev
THE STATE UNIVERSITY OF NEW JERSEY
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Pauling and Coulomb Ti2O3[S. Poteryaev S. Lichtenstein and GK cond-mat 0311319 ]
Dynamical Goodenough-Honing picture
THE STATE UNIVERSITY OF NEW JERSEY
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Conclusion Ti2O3
2 site cluster DMFT describes the MIT in Ti2O3. Different from V2O3 where single site DMFT works
well, and cluster corrections are small [A. Poteryaev] It requires the Coulomb interactions, and a frequency
dependent enhancement of the a1g-a1g hopping, induced by the Coulomb interactions. [Haldane Ph.D thesis, Q Si and GK 1993 ].Dynamical Pauling-Goodenough mechanism is able to trigger the MIT at low enough temperatures.
Coulomb and Pauling synergistically cooperate.
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Pu phases: A. Lawson Los Alamos Science 26, (2000)
LDA underestimates the volume of fcc Pu by 30%
Predicts magnetism in d Pu and gives negative shear
Core-like f electrons overestimates the volume by 30 %
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
The delta –epsilon transition
The high temperature phase, (epsilon) is body centered cubic, and has a smaller volume than the (fcc) delta phase.
What drives this phase transition?
Having a functional, that computes total energies opens the way to the computation of phonon frequencies in correlated materials (S. Savrasov and G. Kotliar PRL 90, 056401)
TotalEnergyasafunctionofvolumeforTotalEnergyasafunctionofvolumeforPuPu
(after Savrasov, Kotliar, Abrahams, Nature ,410,793, (2001)
DMFTPhononsinfccDMFTPhononsinfcc-Pu-Pu
C11 (GPa) C44 (GPa) C12 (GPa) C'(GPa)
Theory 34.56 33.03 26.81 3.88
Experiment 36.28 33.59 26.73 4.78
(after Dai, Savrasov, Kotliar,Ledbetter, Migliori, Abrahams, Science, 9 May 2003)
(experiments from Wong et.al, Science, 22 August 2003)
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Phonon entropy drives the epsilon delta phase transition
Epsilon is slightly more delocalized than delta, has SMALLER volume and lies at HIGHER energy than delta at T=0. But it has a much larger phonon entropy than delta.
Different from Cerium see Jeong et. al. cond-mat/0308416
At the phase transition the volume shrinks but the phonon entropy increases.
Estimates of the phase transition following Drumont and Ackland et. al. PRB.65, 184104 (2002); (and neglecting electronic entropy). TC ~ 600 K.
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Outlook Dynamical mean field theory,” local reference “ for
correlated electron systems. Analogy to FLT, DFT. The need of simpler
reference frames for thinking about complex problems.
Future directions: downfolding and RG, algorithmic speedups.
While a general method is under construction, the extensions described in this talk, already allow to perform quantitative calculations and obtain quantitative insights.
THE STATE UNIVERSITY OF NEW JERSEY
RUTGERS
Conclusion
Introduction to DMFT and its extensions. Flexibility of a local approach.
DMFT describes well the Mott transitions. Formation of hot and cold regions near FS.
MIT in Ti2O3 cluster DMFT .Dynamical Pauling-Coulomb mechanism.
Delta-Epsilon Plutonium. Correlations and phonon entropy.