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Elemental Plutonium: Electrons at the Edge

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Title: Elemental Plutonium: Electrons at the Edge

1
Elemental Plutonium Electrons at the Edge

Gabriel Kotliar
Physics Department and
Center for Materials Theory
Rutgers University

SFU September 2003

2
Outline , Collaborators, References

Plutonium Puzzles
Solid State Theory, Old and New (DMFT)
Results
Conclusions

Los Alamos Science,26, (2000) S. Savrasov and G.
Kotliar Phys. Rev. Lett. 84, 3670-3673, (2000).
S.Savrasov G. Kotliar and E. Abrahams, Nature
410, 793 (2001). X. Dai,S. Savrasov, G.
Kotliar,A. Migliori, H. Ledbetter, E. Abrahams
Science, Vol300, 954 (2003).

3
Pu in the periodic table
actinides
4
Pu is famous because of its nucleus.
Fission Pu239 absorbs a neutron and breaks apart
into pieces releasing energy and more neutrons.
Pu239 is an alpha emitter, making it into a
most toxic substance.
5

Mott transition in the actinide series (Smith
Kmetko phase diagram)
6
Electronic Physics of Pu
7
Small amounts of Ga stabilize the d phase (A.
Lawson LANL)
8
Elastic Deformations
Uniform compressionDp-B DV/V
Volume conserving deformations
F/Ac44 Dx/L
F/Ac Dx/L
In most cubic materials the shear does not depend
strongly on crystal orientation,fcc Al,
c44/c1.2, in Pu C44/C 6 largest shear
anisotropy of any element.
9
The electron in a solid wave picture
Sommerfeld

Bloch, Landau Periodic potential, waves form
bands , k in Brillouin zone .
Landau Interactions renormalize parameters ,
10
Anomalous Resistivity
Maximum metallic resistivity
11
Pu Specific Heat
12
Electronic specific heat
13
Localized model of electron in solids.
(Mott)particle picture.SolidCollection of atoms
L, S, J

Think in real space , solid collection of atoms
High T local moments, Low T spin-orbital order

14
Specific heat and susceptibility.
15
(Spin) Density Functional Theory.

Focus on the density (spin density ) of the
solid.
Total energy is obtained by minimizing a
functional of the density (spin density).
Exact form of the functional is unknown but good
approximations exist. (LDA, GGA)
In practice, one solves a one particle
shrodinger equation in a potential that depends
on the density.
A band structure is generated (Kohn Sham
system).and in many systems this is a good
starting point for perturbative computations of
the spectra (GW).
Works exceedingly well for many systems.
W. Kohn, Nobel Prize in Chemistry on October 13,
1998 for its development of the
density-functional theory

16
Kohn Sham system
17
Delta phase of Plutonium Problems with LDA

Many studies and implementations.(Freeman,
Koelling 1972)APW methods, ASA and FP-LMTO
Soderlind et. Al 1990, Kollar et.al 1997,
Boettger et.al 1998, Wills et.al. 1999).all give
an equilibrium volume of the d phase Is 35
lower than experiment this is the largest
discrepancy ever known in DFT based calculations.
LSDA predicts magnetic long range (Solovyev
et.al.) Experimentally d Pu is not magnetic.
If one treats the f electrons as part of the core
LDA overestimates the volume by 30

18
DFT Studies of a Pu

DFT in GGA predicts correctly the volume of the a
phase of Pu, when full potential LMTO (Soderlind
Eriksson and Wills) is used. This is usually
taken as an indication that a Pu is a weakly
correlated system
.

19
One Particle Local Spectral Function and Angle
Integrated Photoemission
e

Probability of removing an electron and
transfering energy wEi-Ef,
f(w) A(w) M2
Probability of absorbing an electron and
transfering energy wEi-Ef,
(1-f(w)) A(w) M2
Theory. Compute one particle greens function and
use spectral function.

n
n
e
20
Dynamical Mean Field Theory

Focus on the local spectral function A(w) of the
solid.
Write a functional of the local spectral function
such that its stationary point, give the energy
of the solid.
No explicit expression for the exact functional
exists, but good approximations are available.
The spectral function is computed by solving a
local impurity model. Which is a new reference
system to think about correlated electrons.
Ref A. Georges G. Kotliar W. Krauth M.
Rozenberg. Rev Mod Phys 68,1 (1996) .
Generalizations to realistic electronic
structure. (G. Kotliar and S. Savrasov 2001-2002 )

21
Mean-Field Classical vs Quantum
Classical case
Quantum case
A. Georges, G. Kotliar (1992)
Phys. Rev. B 45, 6497
22
Canonical Phase Diagram of the Localization
Delocalization Transition.
23
DMFT has bridged the gap between band theory and
atomic physics.

Delocalized picture, it should resemble the
density of states, (perhaps with some additional
shifts and satellites).
Localized picture. Two peaks at the ionization
and affinity energy of the atom.

24
One electron spectra near the Mott transition.
25
What is the dominant atomic configuration? Local
moment?

Snapshots of the f electron
Dominant configuration(5f)5
Naïve view Lz-3,-2,-1,0,1
ML-5 mB
S5/2 Ms5 mB
Mtot0
More refined estimates ML-3.9 Mtot1.1
This bit is quenches by the f and spd electrons

26
Pu DMFT total energy vs Volume (Savrasov
Kotliar and Abrahams 2001)
27
Double well structure and d Pu

Qualitative explanation
of negative thermal expansion
Sensitivity to impurities which easily raise the
energy of the a -like minimum.

28
Generalized phase diagram
T
U/W
Structure, bands, orbitals
29
Minimum in melting curve and divergence of the
compressibility at the Mott endpoint
30
Cerium
31
Photoemission Technique

Density of states for removing (adding ) a
particle to the sample.
Delocalized picture, it should resemble the
density of states, (perhaps with some
satellites).
Localized picture. Two peaks at the ionization
and affinity energy of the atom.

32
Lda vs Exp Spectra
33
Pu Spectra DMFT(Savrasov) EXP (Arko Joyce Morales
Wills Jashley PRB 62, 1773 (2000)
34
Alpha and delta Pu
35
Phonon Spectra

Electrons are the glue that hold the atoms
together. Vibration spectra (phonons) probe the
electronic structure.
Phonon spectra reveals instablities, via soft
modes.
Phonon spectrum of Pu had not been measured until
recently.

36
Phonon freq (THz) vs q in delta Pu X. Dai et. al.
Science vol 300, 953, 2003
37
Inelastic X Ray. Phonon energy 10 mev, photon
energy 10 Kev.
E Ei - Ef Q ki - kf
38
Expt. Wong et. al.
39
Wong et. al.
40
Expts Wong et. al.
41
Epsilon Plutonium.
42
Phonon frequency (Thz ) vs q in epsilon Pu.
43
Phonons epsilon
44
Conclusions

Pu is a unique ELEMENT, but by no means unique
material. It is one among many strongly
correlated electron system, materials for which
neither the standard model of solids, either for
itinerant or localized electrons works well.
The Mott transition across the actinide series
B. Johansson Phil Mag. 30,469 (1974) concept has
finally been worked out!
They require, new concepts, new computational
methods, new algorithms, DMFT provides all of the
above, and is being used in many other problems.

45
Conclusions

Constant interplay between theory and experiment
has lead to new advances.
General anomalies of correlated electrons and
anomalous system specific studies, need for a
flexible approach. (DMFT).
New understanding of Pu. Methodology applicable
to a large number of other problems, involving
correlated electrions, thermoelectrics,
batteries, optical devices, memories, high
temperature superconductors, ..

46
Conclusions

DMFT produces non magnetic state, around a
fluctuating (5f)5 configuraton with correct
volume the qualitative features of the
photoemission spectra, and a double minima
structure in the E vs V curve.
Correlated view of the alpha and delta phases of
Pu. Interplay of correlations and electron
phonon interactions (delta-epsilon).
Calculations can be refined in many ways,
electronic structure calculations for correlated
electrons research program, MINDLAB, .

47
What do we want from materials theory?

New concepts , qualitative ideas
Understanding, explanation of existent
experiments, and predictions of new ones.
Quantitative capabilities with predictive
power.
Notoriously difficult to achieve in strongly
correlated materials.

48
Some new insights into the funny properties of Pu

Physical anomalies, are the result of the unique
position of Pu in the periodic table, where the f
electrons are near a localization delocalization
transition. We learned how to think about this
unusual situation using spectral functions.
Delta and Alpha Pu are both strongly correlated,
the DMFT mean field free energy has a double
well structure, for the same value of U. One
where the f electron is a bit more localized
(delta) than in the other (alpha). Negative
thermal expansion, multitude of phases.

49
Quantitative calculations

Photoemission spectra,equilibrium volume, and
vibration spectra of delta. Good agreement with
experiments given the approximations made.Many
systematic improvements are needed.
Work is at the early stages, only a few
quantities in one phase have been considered.
Other phases? Metastability ? Effects of
impurities? What else, do electrons at the edge
of a localization localization do ? See epsilon
Pu spectra

50
Collaborators, Acknowledgements References

Collaborators S. Savrasov ( Rutgers-NJIT)
X. Dai ( Rutgers), E. Abrahams (Rutgers), A.
Migliori (LANL),H Ledbeter(LANL).
Acknowledgements G Lander (ITU) J Thompson(LANL)
Funding NSF, DOE, LANL.

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 2002)

55
Phonon entropy drives the epsilon delta phase
transition

Epsilon is slightly more metallic than delta, but
it has a much larger phonon entropy than delta.
At the phase transition the volume shrinks but
the phonon entropy increases.
Estimates of the phase transition neglecting the
Electronic entropy TC 600 K.

56
Results for NiO Phonons
Solid circles theory, open circles exp. (Roy
et.al, 1976)
DMFT Savrasov and GK PRL 2003
57

Two models of a solid. Itinerant and localized.
Mott transition between the two.
Spectral function differentiates between the two
phases.
Insert the phase diagram that I like.

58
LDADMFT functional
F Sum of local 2PI graphs with local U matrix and
local G
59
The electron in a solid particle picture.

NiO, MnO, Array of atoms is insulating if
agtgtaB. Mott correlations localize the electron
e_ e_ e_
e_

Superexchange

Think in real space , solid collection of atoms
High T local moments, Low T spin-orbital order

60
Summary
Spectra
Method
E vs V
LDA
LDAU
DMFT
61
For future reference.
62
Shear anisotropy.

C(C11-C12)/2 4.78
C44 33.59 19.70
C44/C 6 Largest shear anisotropy in any
element!

63
Electronic specific heat
64
(No Transcript)
65
DMFT BOX
66
Anomalous Resistivity
Maximum metallic resistivity 200 mohm cm
67
Magnetic moment

L5, S5/2, J5/2, MtotMsmB gJ .7 mB
Crystal fields G7 G8
GGAU estimate (Savrasov and Kotliar 2000)
ML-3.9 Mtot1.1
This bit is quenched by Kondo effect of spd
electrons DMFT treatment
Experimental consequence neutrons large
magnetic field induced form factor (G. Lander).

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