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Something about cold fusion. Interesting

WARNING: This text will contain errors. Consider it a poor facsimile of the
original paper since that's what is was transcribed from. Be especially wary
of numbers and symbols since these are the hardest to decipher from context.
Question marks in the text indicate severe ambiguity.

--------



Electrochemically Induced Nuclear Fusion of Deuterium

Martin Fleischmann
Department of Chemistry
The University
Southhampton, Hants. S09 5NH
ENGLAND

Stanley Pons*
Department of Chemistry
University of Utah
Salt Lake city, UT 84112 USA

Submitted to Journal of Electroanalytical Chemistry March 11,
1989; in final form March 20, 1989

* To whom correspondence should be addressed.



INTRODUCTION

The strange behavior of electrogenerated hydrogen dissolved in
palladium has been studied for well over 100 years and, latterly
these studies have been extended to deuterium and tritium [1].
For discharge of deuterium from alkaline solutions of heavy water
we have to consider the reaction steps:

- -
D O + e -> D + OD (i)
2 ads

- -
D + D O + e -> D + OD (ii)
ads 2 2

D -> D (iii)
ads lattice


D + D -> D (iv)
ads ads 2

It is known that at potentials negative to +50 mV on the
reversible hydrogen scale the lattice is in the beta-phase,
hydrogen is in the form of protons (as shown by the migration in
an electric field) and is highly mobile (D = 10E-7 cm*cm/s for
the alpha-phase at 300K).

The overall reaction path of D2 evolution consists of steps (i)
and (ii) [2] so that the chemical potential of dissolved D+ is
normally determined by the relative rates of these two steps.
The establishment of negative overpotentials on the outgoing
interface of palladium membrane electrodes for hydrogen discharge
at the ingoing interface [3] (determined by the balance of all the
steps i) to (iv)) demonstrates that the chemical potential can be
raised to high values. Our own experiments with palladium
diffusion tubes indicate that values as high as 0.8 eV can
readily be achieved [4] (values as high as 2eV may be achievable).
The astronomical magnitude of this value can readily be
appreciated; attempts to attain this level via the compression of
D2 (step (iv)) would require pressures in excess of 10E24
atmospheres. In spite of this high compression, D2 is not
formed; i.e. the s-character of the electron density around the
nuclei is very low and the electrons form part of the band
structure of the overall system. A feature which is of special
interest and which prompted the present investigation is the very
high H/D separation factor for absorbed hydrogen and deuterium
(see Figs. 4 and 6 of Ref [2]). This can only be explained if
the H+ and D+ in the lattice behave as classical oscillators
(possibly as delocalised species) i.e. they must be in very
shallow potential wells. In view of the very high compression
and mobility of the dissolved species there must therefore be a
significant number of close collisions and one can pose the
question: would nuclear fusion of D+ such as

2 2 3 1
D + D -> T(1.01 MeV) + H(3.02 MeV) (v)
or
2 2 3
D + D -> He(0.82 MeV) + n(2.45 MeV) (vi)

be feasible under these conditions?


EXPERIMENTAL

In the work reported here D+ was compressed galvanostatically
into sheet, rod and cube samples of Pd from 0.1 M LiOD in 99.5%
D2O + 0.5% H2O solutions. Electrode potentials were measured
with respect to a Pd-D reference electrode charged to the alpha-
beta-phase equilibrium. We report here experiments of several
kinds:

1) Calorimetric measurements of heat balances at low current
densities (=1.6 mA/cm*cm) were made using a 2mm x 8cm x 8cm Pd
sheet cathode surrounded by a large Pt sheet counter electrode.
Measurements were carried out in Dewar cells maintained in a
large constant temperature water bath (300K), the temperature
inside the cell and of the water bath being monitored with
Beckman thermometers. The Heavy Water Equivalent of the Dewar
and contents and the rate of Newton's law of cooling losses were
determined by addition of hot D2O and by following the cooling
curves.

2) Calorimetric measurements at higher current densities
were carried out using 1, 2 and 4mm diameter x 10 cm long Pd rods
surrounded by a Pt wire anode wound on a cage of glass rods. The
Dewars were fitted with resistance heaters for the determination
of Newton's law of cooling losses; temperatures were measured
using calibrated thermistors. Experiments with rods up to 2 cm
in diameter will be reported elsewhere [5]. Stirring in these
experiments (and in those listed under 1)) was achieved, where
necessary, by gas sparging using electrolytically generated D2.
Measurements at the highest current density reported here
(512 mA/cm*cm) were carried out using rods of 1.25 cm length; the
results given in Table 1 have been rescaled to those for rods of
10 cm length.


3) The spectrum of gamma-rays emitted from the water bath due to
the (n,gamma) reaction

1 2
H + n(2.45 MeV) -> D + gamma(2.5 MeV) (vii)


was determined using a sodium iodide crystal scintillation
detector and a Nuclear Data ND-6 High Energy Spectrum analyzer.
The spectrum was taken above the water immediately surrounding an
0.8 x 10 cm Pd-rod cathode charged to equilibrium; it was
corrected for background by subtracting the spectrum over a sink
(containing identical shielding materials) 10 m from the water
bath.

The neutron flux from a cell containing a 0.4 x 10 cm Pd-rod
electrode was measured using an Harwell Neutron Dose Equivalent
Rate Monitor, Type 95/0945-5. The counting efficiency of this
Bonner-sphere type instrument for 2.5 MeV neutrons was estimated
to be 2.4 x 10E-4 and was further reduced by a factor of 100 due
to the unfavorable configuration (the rod opposite the BF filled
3
detector). The background count was determined by making
measurements 50m from the laboratory containing the experiments;
both locations were in the basement of a new building which is
overlain by 5 floors of concrete. In view of the low counting
efficiency, counting was carried out for 50 hours. Measurements
on a 0.4 x 10 cm rod electrode run at 64 mA/(cm*cm) gave a
neutron count 3 times above that of the background.

4) The rate of generation/accumulation of tritium was
measured using similar cells (test tubes sealed with Parafilm)
containing 1 mm diameter x 10 cm Pd rod electrodes. Measurements
on the D/T separation factor alone were made using an identical
cell containing a 1 mm diameter x 10 cm Pt electrode (this
measurement served as a blank as the H/D separation factors on Pd
and Pt are known to be closely similar). 1 ml samples of the
electrolyte were withdrawn at 2 day intervals, neutralised with
potassium hydrogen phthalate and the T-content was determined
using Ready Gel liquid scintillation "cocktail" and a Beckman LS
5000 TD counting system. The counting efficiency was determined
to be about 45% using standard samples of T-containing solutions.
The beta-decay scintillation spectrum was determined using the
counting system.

In these experiments standard additions of 1 ml of the electrolyte
were made following sampling. Losses of D2O due to electrolysis
in these and all the other experiments recorded here were made up
using D2O alone. A record of the volume of D2O additions was
made for all the experiments.

In all of the experiments reported here all connections were
fitted into Kel-F caps and the caps were sealed to the glass
cells using Parafilm.

Results for the mass spectroscopy of the evolved gases and full
experimental details for all the measurements will be given
elsewhere [5].

RESULTS

1) and 2)

In the calorimetric experiments we can set lower and upper bounds
on the rates of Joule heating depending on whether reactions (i),
(ii) , and (iv) are balanced by

- -
4OD -> D O + O + 4e (viii)
2 2

at the anode or by the reverse of reactions (i), (ii), and (iv).
In the former case the Joule heating is simply the cell current
multiplied by (cell voltage - 1.54 V) where 1.54 V is the cell
voltage at which reactions (i), (ii), and (iv) balanced by (viii)
are thermoneutral: irreversibilities in the electrode reactions
and ohmic resistance losses have identical effects on the Joule
heating. However, if reactions (i), (ii), and (iv) are reversed
at the anode and, equally, if the reverse of reactions (viii)
contributes to the cathode processes, then we get an upper bound
to the Joule heating which is simply the cell current multiplied
by the cell voltage.

We have confirmed in long duration experiments that the rates of
addition of D2O to the cells required to maintain constant
volumes are those for reactions (i), (ii), and (iv) balanced by
reaction (viii). Furthermore, subtraction of the ohmic potential
losses in solution for the cell containing the large Pt-anode
shows that the electrolysis of D2O is the dominant process, i.e.
we have to assume that the Joule heating is close to the lower
bound.

Table 1 gives the results for experiments designed to cover the
effects of electrolyte geometry, electrode size, current density
(or overpotential) method of operation, etc. The nature and
large magnitude of the effects can be appreciated from the
following observations:


a) excess enthalpy generation is markedly dependent on the
applied current density (i.e. magnitude of the shift in the
chemical potential) and is proportional to the volume of the
electrodes; i.e. we are dealing with a phenomenon in the bulk of
the Pd-electrodes.


b) enthalpy generation can exceed 10 watts/(cm*cm*cm) of the
palladium electrode; this is maintained for experimental times in
excess of 120 hours during which typically heat in excess of
4MJ/(cm*cm*cm) of electrode volume was liberated. It is
inconceivable that this could be due to anything but nuclear
processes.


c) in research on thermonuclear fusion, the effects are
expressed as a percentage of the breakeven where 100% breakeven
implies that the thermal output equals the input (neglecting the
power required to drive the equipment). In electrochemical
experiments we have additionally to take into account whether
breakeven should be based on the Joule heat or total energy
supplied to the cell. Furthermore, in the latter case the energy
supplied depends on the nature of the anode reaction. Table 2
lists three such figures of merit and it can be seen that we can
already make reasonable projections to 1000%. Some of the
factors important to scale-up are already apparent from Tables 1
and 2.


d) the effects have been determined using D2O alone.
Projections to the use of appropriate D2O/DTO/T2O mixtures (as is
commonly done in fusion research) might therefore be expected to
yield thermal excesses in the range 10E3 - 10E4 % (even in the
absence of spin polarisation) with enthalpy releases in excess of
10 kW/(cm*cm*cm). We have to report here that under the
conditions of the last experiment even using D2O alone, a
substantial portion of the cathode fused (melting point 1554
degrees C) part of it vapourised and the cell and contents and a
part of the fume cupboard housing the experiment were destroyed.


TABLE 1. Generation of excess enthalpy in Pd-cathodes as a
function of current density and electrode size.

Cube Sheet Rod Rod Rod electrode type

1x1x1 cm 0.2x8x8cm 0.4x10cm 0.2x10cm 0.1x10cm dimensions

125 0.8 8 8 8 current density (mA/cm*cm)

WARNING 0.153 .153 .036 .0075 excess rate of heating
(watts/cm*cm*cm)
IGNITION?
(see text) 0 .122 .115 .095 excess specific rate of
heating (watts/cm*cm*cm)

250 1.2 64 64 64 current density (mA/cm*cm)

.027 1.751 .493 .079 excess rate of heating
(watt)

.0021 1.39 1.57 1.01 excess specific rate of
heating (watts/cm*cm*cm)

1.6 512 512 512 current density *
(mA/cm*cm) *

0.79 26.8 3.02 .654 excess rate of heading
(watt) *

.0061 21.4 9.61 8.33 excess specific rate of
heating (watts/cm*cm*cm)

* Measured on electrodes of length 1.25 cm and rescaled to 10 cm.

TABLE 2. Generation of excess enthalpy in Pd rod cathodes
expressed as a percentage of breakeven values.

0.4x10cm 0.2x10cm 0.1x10cm dimensions
8 8 8 current density (mA/cm*cm)
111 62 23 excess heating * (% of breakeven) *
53 27 12 excess heating** (% of breakeven) **
1224 286 60 excess heating*** (% of breakeven) ***
64 64 64 current density (mA/cm*cm)
66 46 19 excess heating * (% of breakeven) *
45 29 11 excess heating** (% of breakeven) **
438 247 79 excess heating*** (% of breakeven) ***
512 512 512 current density (mA/cm*cm)
59 14 5 excess heating * (% of breakeven) *
48 11 5 excess heating** (% of breakeven) **
839 189 81 excess heating*** (% of breakeven) ***

* % of breakeven based on Joule heat supplied to
cell and anode reaction

- -
4OD -> 2D O + O + 4e
2 2

** % of breakeven based on total energy supplied to
cell and anode reaction

- -
4OD -> 2D O + O + 4e
2 2

*** % of breakeven based on total energy supplied to
cell and for an electrode reaction

- -
D + 2OD -> 2D O + 4e
2 2

with a cell potential of 0.5V.

2 2
All %'s based on D + D reactions, i.e. no projection
to [next line lost in scanning]

3) Fig. 1A illustrates the gamma-ray spectra which have been
recorded in regions above the water bath adjacent to the
electrolytic cells and this spectrum confirms that 2.45 MeV
neutrons are indeed generated in the electrodes by reaction (vi).
These gamma-rays are generated by the reaction (vii). We note
that the intensities of the spectra are weak and, in agreement
with this, the neutron flux calculated from the measurements with
the dosimeter is of the order 4 x 10E4 1/s for a 0.4 x 10 cm rod
electrode polarised at 64 mA/(cm*cm).

Figure 1A

gamma-ray spectrum recorded above the water bath containing the
rod cathodes. Measurements carried out with a sodium iodide
crystal scintillation detector and a Nuclear Data ND-6 High
Energy Spectrum Analyzer. The background in this region (taken
over a water bath 5 m from the experiment containing identical
shielding materials) is level at about 400 counts; spectrum
accumulation time: 48 hours.

4) In agreement with this low neutron flux, the accumulation
in the electrolyte also indicates a low rate for reaction (v)
(which has been found to be somewhat faster than (vi) in high
energy physics experiments). The time dependent fraction of
tritium in the solvent can be shown to follow(?)

(1):
-(1 + lambda * delta )*Rt
D,T
alpha = gamma * exp ---------------------------
T T lambda * S * N
D,T

delta
D,T
+ ((1 + lambda)gamma + beta/R) * --------------------- * -+
T (1 + lambda*delta ) |
D,T |
|
+-------------------------------------------+
|
| -(1 + lambda * delta )Rt
| D,T
+--> * (1 - exp --------------------------)
lambda*S * N
D,T

where:

gamma is the fraction of T in the electrolyte/solvent feeds,
T

lambda * R (atoms T/s, here 4x10E11 atoms/s) is the sampling rate
which has been assumed to be continuous in time,

N is the total number of atoms of D in the Dewar (14.6x10E23),

S is the D/T separation factor,
D,T

beta is the rate of the nuclear reaction (v) (events/s), and

R is the rate of electrolysis expressed as atoms D 1/s
(here 1.24x10E14(?) atoms/s)

It can be seen that the final value alpha for the cell containing
T
the Pt-cathode (for which we assume beta = 0) is:
A

delta
D,T
alpha = ((1 + lambda)*gamma + beta/R) * ---------------------- (1)
T T (1 + lambda * delta )
D,T

Blank experiments using Pt-cathodes (which have very similar
separation factors to Pd) indicate little accumulation of DTO so
that S is close to unity under the conditions of our
D,T
experiments. DTO accumulates in the cells containing Pd cathodes
to the extent of about 100dpm/ml of electrolyte and Fig. 1B
demonstrates that the species accumulated is indeed tritium. Use
of equation (2) then indicates that reaction (v) takes place to
the extent of 1-2 x 10E4 atoms/s which is consistent with the
measurements of the neutron flux, bearing in mind the difference
in radii. On the other hand the data on enthalpy generation
would require rates for reactions (v) and (vi) in the range 10E11-
10E14 atoms/s. It is evident that reactions (v) and (vi) are
only a small part of the overall reaction scheme and that other
nuclear processes must be involved.

(see figure on trailing pages)

Figure 1B

beta-ray disintegration scintillation spectrum measured with a
Bockman LS5000TD counter-spectrometer.

DISCUSSION

We realise that the results reported here raise more questions
than they provide answers and that much further work is required
on this topic. The observation of the generation of neutrons and
of tritium from electrochemically compressed D+ in Pd cathode is
in itself a very surprising result and, evidently, it is
necessary to reconsider the quantum mechanics of electrons and
deuterons in such host lattices. In particular we must ask: is
it possible to achieve a fusion rate of 10E-19 1/s for reactions
(v) and (vi) for clusters of deuterons (presumably located in the
octahedral lattice positions) at typical energies of 1eV?
Experiments on isotopically substituted hydrides of well defined
structures might well answer this question.

The most surprising feature of our results however, is that
reactions (v) and (vi) are only a small part of the overall
reaction scheme and that the bulk of the energy release is due to
an hitherto unknown nuclear process or processes (presumably
again due to clusters of deuterons). We draw attention again to
the very large magnitude of the effects in the confinement
parameter diagram, fig. 2. We note that the values of the
confinement parameter are extremely high compared to conventional
research on fusion (high particle densities, lifetimes of 10E2 -
10E4 years) while the chemical potential is very low compared to
the equivalent parameter, (T), in those experiments. It is
evident that diagrams of this kind require extension in the third
dimension for electrochemical experiments since the results are
so markedly dependent on electrode volume (increase of current
density displaces the points in a vertical direction). We draw
attention again to the fact that the experiments already carried
out are close to the breakeven point; further work to extend the
electrode dimension (and to establish the nature of the processes
responsible for the enthalpy release) is in progress. Finally, we
urge the use of extreme caution in such experiments: a plausible
interpretation of the experiment using the Pd-cube electrode is
in terms of ignition. Projection of the values in Tables 1 and 2
to more extreme conditions indicate that this may indeed be
feasible.

Figure 2

2 2
Confinement parameter-chemical potential-size diagram for D + D
2 3
fusion reaction in Pd-cathodes, projection to the D + T
reaction.

ACKNOWLEDGEMENT

We wish to thank Johnson Matthey PLC for the loan of precious
metals for this project.

LITERATURE REFERENCES

1. W. M. Mueller, J. T. Blacklodge, G. G. Libowitz, "Metal
Hydrides", Academic Press, New York (1968); G. Bambakadis, Ed.,
"Metal Hydrides", Plenum Press (1981).

2. B. Dandapani and M. Fleischmann, Journal of Electroanalytical
Chemistry, 12 (1972) 323.2.39

3. A. N. Frumkin and N. A. Aladzhalova, Acta Physicochim.
U.R.S.S., 2 (1940) 1.9

4. Unpublished results

5. M. Fleischmann, M. Hawkins, and B. Pons, to be published.
 
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