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Fluctuation effects in phase segregation
PhysicaB 165&166 (1990) 815-816 North-Holland
FLUCTUATION
EFFECTS
IN PHASE
SEGREGATION
P. Kumar Department
of Physics,
University
of Florida-Gainesville,
F1.32611,
U.S.A
M. Bernier Service de Physique CEA-CEN
du Solide et de Resonance
Saclay, 91191 Gif sur Yvette,
The excess specific
heat observed
*He is attributed 3-dimensional,
Cedex,
France
above the phase separation
to the fluctuations
rich solid the fluctuations
Magnetique
that represent
temperature
the symmetry
of the 4He rich phase are 2dimensional
the characteristic
length
scale is approximately
I. INTRODUCTION
in solid mixtures
of the condensing
the interparticle
change
the non Ising
between
are significant
then derive the fluctuation
heat of mixing specific ment
heat with
measured
by EMD adds to the usual
of the solid mixture the regular
some excess
specific
solution
heat
perature
To(z),
increases
as the temperature
cess specific
where
heat
z is the molar
which
range
range
tem-
of 3He, that
To(z).
This exof
on the dimensionality
of
the *He has been known one might
order.
what
we find when lines:
analyzing
the excess
fluctuations
expect
planar
specific
order. the data heat
domains
the condensation
of spherical
range
to con-
for the 4He rich com-
Furthermore
consist
for the short
these
Gaussian
fraction
as the contribution
while the lattice
else should
fluctuations
lar concentration
is however
domains
H,
can also be simply requirements.
expected
OF THE
term.
the instability
separation,
for phase
are fully characterized HflTo(z)
[l] along
of the inhomogeneous
with
the
energy
ensures
d = 3 for z in the
proper
lattice
fluctuations in units
and Landesman
a fictitious [2]: a lattice
the 4He is characterized the occupancy +1/Z
of these regular
using
gas where
a more elaborate
a spin
models, solution
0921-4526/90/$03.50
in the mean
-l/2
energy
@ 1990 - Elsevier
gas
The Hamiltonian
field theory,
used by Edwards
reduces
to the
and Balibar
Science
the symA is indeed
fluctuations
need
the coefficient the Gaussian
must be
fluctuations
separation
only
symmetry
temperature
term
lattice
denotes
increase
(I)
defined by vectors
of the
the contribution
The above form of the
the fluctuations
is characterized
of the lattice
I(V + &)A?
away
the energy.
by a length
from
the
Each of these
scale & measured
constant.
contribution
can then be written
to the thermodynamic
free
as 151
of while
version of the lattice
Thus
fluctuations.
that
Ff = -ksT
en
n/
Where
As is the Fourier
a specific
heat 2
[4].
Publishers
d A, exp {--a
[kJ)
flf
q
by the spin component
1 is given in Ref.[3].
theory
by Bernier
the occupancy
by the spin component
of 3He is described
on a lattice;
model
spin model proposed
following
- I] A* t c&r e
The last
The fluctuation Let us consider
the
Hamiltonian
Since it must also represent
EMD [l] and the kis are the reciprocal state.
the
by
= [(T/To(z))
of EMD
FLUCTUATIONS
down
and the Gaussian
to T - To(z).
We can
and expanding
the parameter
only the first, quadratic,
condensing
can be fitted
written
Note that
to be small
exthey
where zs is the given mo-
of 3He in the mixture,
This is essentially
with the dimension
II. DESCRIPTION
as A = z-z0
for small A (51 . The fluctuation
Hamiltonian metry
atomic because
Hf by defining
Hamiltonian
where To(z) is the phase
i.e. 3-d
of 0.5 and d = 2 for z close to one.
neighborhood
variable
proportional
is hcp and thus,
anywhere
agree-
separation
T approaches
depends
In a 3He rich mixture,
for the short
fluctuation
order.
dense at the surface ponent
There
the phase
can be understood
the fluctuations, the short
theory.
above
describing
and host atoms
only at much lower temperatures.
Debye
and is in excellent
terms
the impurity
sures, on cooling, has been studied by Edwards, MC Williams specific
they are
spacing.
and Daunt (EMD) [l]. The temperature
dependent
In a 3He
while in an even mixture
We can ignore
The segregation of a 3He -4 He mixture at high pres-
of 3He and
state.
R
B.V. (North-Holland)
transform
of A(r).
I
(2)
Eq.(2) leads to
[5] _ 1 Ad
X(1 -2)
-2pgEgd
T
1
d”-2
-[To(x) 1
(3)
816
P. Kumar, M. Bernier
Here Ad is the surface sions,
area of a unit sphere
.$ is a characteristic
herence
length
ity of the dominant
as a function
fluctuations.
this result is better
approximation
In critical
near one, the condensing tuations
has a planar
symmetry plane,
dimension
the log-log
distance
temperature
is closer
The length
tures,
based
support
Balibar
z, there
z range.
Panczyk
phase
diagram
analyzed
length
to be published
in .I. Low Temp.
Phys.
diagram
proposed
pressure
I In
: The excess specific heat as a function
of 7’-To(r)
for
the data of EMD (Ref.[l])
at a
z = l/2.
The crosses denote
pressure
of 3.58 MPa and the circles represent
of 2.7 MPa.
The dashed
line represents
the pressure
an exponent
a =
0.5.
by
solid mix-
specific
heat
in
the dimension-
be 3 for z < 0.7 and 2 for analyzed
[6] have reported however
here are
in the small results
the data
way for the excess
discussion
Fig.1
scale for the density
of the excess
region,
in the same
d = 2.
of the interparticle
is a need for measurements et al.
in Fig.2.
distance.
the phase
should
in that
more detailed
and M. Bernier,
(1990)
close
from the experimental
2. In as much as most of the data
for large
Adams,
heat
is clearly
by EMD [I]. We find that
ality of the fluctuations larger
E.D.
and the Debye
are shown
[4] for the high
on an analysis
the experiments
specific
for z = 0.997 and 0.999.
the interparticle
results and
and
z
to be 1.2 while for smaller
all cases it is the characteristic
These
Gonano
to be
to one indicating
scale in units
it is 1.3 and 0.67 respectively
Edwards
J.R.
(1968)
d = 3. The data from Ref.[l] for
namely
594
2.7 and 3.6 MPa as
The exponent
for z = 0.5 is found
variation
Scribner,
Auc-
scales are supposed
pressures,
The transition
time the exponent as well.
79
21,
is then d = 2. For z
2 = 0.997 and 0.999 at P = 3.6 MPa
data
P. Kumar
R.A.
Lett.
by a length
plot of the excess
heat are from Ref.[l].
The coefficient
diagram
and the dominant
in Eq.(3)
to 0.5 giving the dimension This
[7]
Benjamin,
takes place in the more isotropic
for z = 0.5 at two different given in Ref.[l].
[5]
In the
Rev.
Phenomena”,
d = 3.
the effective
specific
Panczyk,
Phys.
of Critical
goes into an hcp lat-
characterized
bee phase for which all the length Fig.1 shows
of the phase
fluctuation
near 0.5 the condensation similar;
phenomena o = 2-du.
M.F.
Theory
excess specific heat becomes
are in the basal
(11. The effective
[6]
“Modern (1974)
used here v = 0.5 and therefore
of d. In the region
a clear measure
specific
of d, the dimensional-
known as the exponent
the power law of the diverging
tice which
the fluctuation
S. K. Ma, New York
of & and Y is the co-
In Eq.(3)
heat has been expressed
Gaussian
average
exponent.
[5]
in d dimen-
for the
cannot
be
heat.
A
specific
can be found in Ref.[7].
REFERENCES
[ll
D.O.
Edwards,
L&t.
9,
I4 M.
AS.
McWilliams
and
J.G.
Daunt,
Phys.
Rev.
10-X
195 (1962)
Bernier
and A. Landesman,
Jour.
de Physique
32,
(1971)
Fig.2
[31J. Lajzerowicz and references
[41D.O.
Edwards
and
J. Sivardiere,
Phys.
Rev.
All,
2079
therein. and S. Balibar,
(1975)
Rev.
39,
4083
10-l
AT(K)
: The excess specific heat at small z. The pressure
3.58 MPa.
The circles represent
z = 0.997 and the crosses Phys.
10.’
C5a-213
(1989)
line in this figure represents
the excess specific
are for I = 0.999. an exponent
The dashed
o = 1.
is
heat for
FLUCTUATION
EFFECTS
IN PHASE
SEGREGATION
P. Kumar Department
of Physics,
University
of Florida-Gainesville,
F1.32611,
U.S.A
M. Bernier Service de Physique CEA-CEN
du Solide et de Resonance
Saclay, 91191 Gif sur Yvette,
The excess specific
heat observed
*He is attributed 3-dimensional,
Cedex,
France
above the phase separation
to the fluctuations
rich solid the fluctuations
Magnetique
that represent
temperature
the symmetry
of the 4He rich phase are 2dimensional
the characteristic
length
scale is approximately
I. INTRODUCTION
in solid mixtures
of the condensing
the interparticle
change
the non Ising
between
are significant
then derive the fluctuation
heat of mixing specific ment
heat with
measured
by EMD adds to the usual
of the solid mixture the regular
some excess
specific
solution
heat
perature
To(z),
increases
as the temperature
cess specific
where
heat
z is the molar
which
range
range
tem-
of 3He, that
To(z).
This exof
on the dimensionality
of
the *He has been known one might
order.
what
we find when lines:
analyzing
the excess
fluctuations
expect
planar
specific
order. the data heat
domains
the condensation
of spherical
range
to con-
for the 4He rich com-
Furthermore
consist
for the short
these
Gaussian
fraction
as the contribution
while the lattice
else should
fluctuations
lar concentration
is however
domains
H,
can also be simply requirements.
expected
OF THE
term.
the instability
separation,
for phase
are fully characterized HflTo(z)
[l] along
of the inhomogeneous
with
the
energy
ensures
d = 3 for z in the
proper
lattice
fluctuations in units
and Landesman
a fictitious [2]: a lattice
the 4He is characterized the occupancy +1/Z
of these regular
using
gas where
a more elaborate
a spin
models, solution
0921-4526/90/$03.50
in the mean
-l/2
energy
@ 1990 - Elsevier
gas
The Hamiltonian
field theory,
used by Edwards
reduces
to the
and Balibar
Science
the symA is indeed
fluctuations
need
the coefficient the Gaussian
must be
fluctuations
separation
only
symmetry
temperature
term
lattice
denotes
increase
(I)
defined by vectors
of the
the contribution
The above form of the
the fluctuations
is characterized
of the lattice
I(V + &)A?
away
the energy.
by a length
from
the
Each of these
scale & measured
constant.
contribution
can then be written
to the thermodynamic
free
as 151
of while
version of the lattice
Thus
fluctuations.
that
Ff = -ksT
en
n/
Where
As is the Fourier
a specific
heat 2
[4].
Publishers
d A, exp {--a
[kJ)
flf
q
by the spin component
1 is given in Ref.[3].
theory
by Bernier
the occupancy
by the spin component
of 3He is described
on a lattice;
model
spin model proposed
following
- I] A* t c&r e
The last
The fluctuation Let us consider
the
Hamiltonian
Since it must also represent
EMD [l] and the kis are the reciprocal state.
the
by
= [(T/To(z))
of EMD
FLUCTUATIONS
down
and the Gaussian
to T - To(z).
We can
and expanding
the parameter
only the first, quadratic,
condensing
can be fitted
written
Note that
to be small
exthey
where zs is the given mo-
of 3He in the mixture,
This is essentially
with the dimension
II. DESCRIPTION
as A = z-z0
for small A (51 . The fluctuation
Hamiltonian metry
atomic because
Hf by defining
Hamiltonian
where To(z) is the phase
i.e. 3-d
of 0.5 and d = 2 for z close to one.
neighborhood
variable
proportional
is hcp and thus,
anywhere
agree-
separation
T approaches
depends
In a 3He rich mixture,
for the short
fluctuation
order.
dense at the surface ponent
There
the phase
can be understood
the fluctuations, the short
theory.
above
describing
and host atoms
only at much lower temperatures.
Debye
and is in excellent
terms
the impurity
sures, on cooling, has been studied by Edwards, MC Williams specific
they are
spacing.
and Daunt (EMD) [l]. The temperature
dependent
In a 3He
while in an even mixture
We can ignore
The segregation of a 3He -4 He mixture at high pres-
of 3He and
state.
R
B.V. (North-Holland)
transform
of A(r).
I
(2)
Eq.(2) leads to
[5] _ 1 Ad
X(1 -2)
-2pgEgd
T
1
d”-2
-[To(x) 1
(3)
816
P. Kumar, M. Bernier
Here Ad is the surface sions,
area of a unit sphere
.$ is a characteristic
herence
length
ity of the dominant
as a function
fluctuations.
this result is better
approximation
In critical
near one, the condensing tuations
has a planar
symmetry plane,
dimension
the log-log
distance
temperature
is closer
The length
tures,
based
support
Balibar
z, there
z range.
Panczyk
phase
diagram
analyzed
length
to be published
in .I. Low Temp.
Phys.
diagram
proposed
pressure
I In
: The excess specific heat as a function
of 7’-To(r)
for
the data of EMD (Ref.[l])
at a
z = l/2.
The crosses denote
pressure
of 3.58 MPa and the circles represent
of 2.7 MPa.
The dashed
line represents
the pressure
an exponent
a =
0.5.
by
solid mix-
specific
heat
in
the dimension-
be 3 for z < 0.7 and 2 for analyzed
[6] have reported however
here are
in the small results
the data
way for the excess
discussion
Fig.1
scale for the density
of the excess
region,
in the same
d = 2.
of the interparticle
is a need for measurements et al.
in Fig.2.
distance.
the phase
should
in that
more detailed
and M. Bernier,
(1990)
close
from the experimental
2. In as much as most of the data
for large
Adams,
heat
is clearly
by EMD [I]. We find that
ality of the fluctuations larger
E.D.
and the Debye
are shown
[4] for the high
on an analysis
the experiments
specific
for z = 0.997 and 0.999.
the interparticle
results and
and
z
to be 1.2 while for smaller
all cases it is the characteristic
These
Gonano
to be
to one indicating
scale in units
it is 1.3 and 0.67 respectively
Edwards
J.R.
(1968)
d = 3. The data from Ref.[l] for
namely
594
2.7 and 3.6 MPa as
The exponent
for z = 0.5 is found
variation
Scribner,
Auc-
scales are supposed
pressures,
The transition
time the exponent as well.
79
21,
is then d = 2. For z
2 = 0.997 and 0.999 at P = 3.6 MPa
data
P. Kumar
R.A.
Lett.
by a length
plot of the excess
heat are from Ref.[l].
The coefficient
diagram
and the dominant
in Eq.(3)
to 0.5 giving the dimension This
[7]
Benjamin,
takes place in the more isotropic
for z = 0.5 at two different given in Ref.[l].
[5]
In the
Rev.
Phenomena”,
d = 3.
the effective
specific
Panczyk,
Phys.
of Critical
goes into an hcp lat-
characterized
bee phase for which all the length Fig.1 shows
of the phase
fluctuation
near 0.5 the condensation similar;
phenomena o = 2-du.
M.F.
Theory
excess specific heat becomes
are in the basal
(11. The effective
[6]
“Modern (1974)
used here v = 0.5 and therefore
of d. In the region
a clear measure
specific
of d, the dimensional-
known as the exponent
the power law of the diverging
tice which
the fluctuation
S. K. Ma, New York
of & and Y is the co-
In Eq.(3)
heat has been expressed
Gaussian
average
exponent.
[5]
in d dimen-
for the
cannot
be
heat.
A
specific
can be found in Ref.[7].
REFERENCES
[ll
D.O.
Edwards,
L&t.
9,
I4 M.
AS.
McWilliams
and
J.G.
Daunt,
Phys.
Rev.
10-X
195 (1962)
Bernier
and A. Landesman,
Jour.
de Physique
32,
(1971)
Fig.2
[31J. Lajzerowicz and references
[41D.O.
Edwards
and
J. Sivardiere,
Phys.
Rev.
All,
2079
therein. and S. Balibar,
(1975)
Rev.
39,
4083
10-l
AT(K)
: The excess specific heat at small z. The pressure
3.58 MPa.
The circles represent
z = 0.997 and the crosses Phys.
10.’
C5a-213
(1989)
line in this figure represents
the excess specific
are for I = 0.999. an exponent
The dashed
o = 1.
is
heat for