Note on the heating effect of moving dislocations

ACTA

560

METALLURGICA,

VOL.

4,

1956

verschiedener Spew. Suszeptibilitiit Ti-Al-Legierungen bei 20°C

30

20

10

LO

Gew. ‘lo Al FIG. 3.

Man kann sich unschwer

Phasendiagramme

struieren, welche den mitgeteilten nung

tragen.

Heranziehen

Dieselben weiterer

wiirden

es deshalb

suchungen

Daten

Charakter

vor, diese Frage

menhang mit den Ergebnissen metallogrnphischen

jedoch

experimenteller

mehr oder weniger spekulativen Wir ziehen

Ergebnissen

kon-

temperature

besitzen.

im ZusamUnter-

A. MUENSTER K. SAGEL

der Metallgesellschaft

U. ZWICKER

1. H. R. OGDEN, 0. J. MAYICUTH, W. L. FINLAY, und R. J. JaFFEE Trans. Amer. Inst. Min. Met. &%g. _ 191. 1150 (1951). 2. E. S. BUMPS, H. 0. KESSLER, und M. HANSEN Trans. Amer. Inst.Nin. Met. Eng. 194, 609 (1952). 3. A. A. MC&UII,LAN J. Inst.Met. 83, 181 (1954). 4. W. ROSTOKER J. Metals 4, 209 (1952). 5. H. W. WORNER J. Inst. Met. 81, 521 (1952/53). 6. W. L. FINLAY, R. J. JAFFEE, R. W. PARCEL, und R. D. DURSTEIN J. Metnls 6, 25 (1954). 7. H. R. OGDEN, D. J. MAYKUTH, W. L. FINLAY, und R. J. JAFFEE J. Met& 5, 267 (1953). 8. A. KNAPPWOST 2. Elektrochemie 59, 561 (1951).

plastic deformation.

Note on the Heating Effect of Moving Dislocations* and Weiner have

proposed that thermal stresses produced during fatigue are severe enough to create microcracks;

slip

plane

by

calculated

some

moving in many

200°C.

along slip aspects

of

In this note the heating effect is

in a different

manner,

of Freudenthal

We take the dislocation

and some of the

and Weiner are discussed. to be a moving line-source

of heat of strength q = b-rV erg cm-l set-1 where 6 is its Burgers 7 is the applied

vector,

shear stress.

V its velocity, The temperature

and at

(x,y) ist2) T=

‘-~ e’/”

2nK x,y

are

rectangular

dislocation, behind

K&r/R), r2 = x2 + ~2. co-ordinates

centered

y = 0 is the slip-plane,

the dislocation.

and K is the thermal

* Received March 9, 1956.

Freudenthal

the

planes is in fact of importance

Frankfurt/Main References

near

The heating effect of dislocations

assumptions

Aus dem Metall- Laboratorium

In a recent paper,(l)

“thermal

ohne

zu diskutieren.

A.G.

localized

flashes,”

einen

der zur Zeit laufenden

und riintgenographischen

these stresses are due to highly

associated with repeated and reversed slip processes, which in the extreme case may raise the

Rech-

the

K is the heat conductivity diffusivity (K divided by the

specific heat per unit volume). K,(z) has the asymptotic forms K,(z) -

on

and x is positive

--In z,

The Bessel function

z>

1;

LETTERS

TO

the scale of the temperature be many

atomic

pattern.

distances,

It will

so that near the

dislocation

(compare

alloy, of

24&T,

Seitzt3)).

in the two

T = .:Lg ln A r 77

procession

Even for fairly extreme values of

the slip-plane

T is of the order of only a fraction of a

degree a few at,omic distances

from the dislocation.

The question now is, do the temperature succession of dislocations

fields of a

add up to give an appreciable

We can make an estimate in two extreme cases.

Consider a procession

of n equally-spaced dislocations 2 the maximum spread over a distance jz. Then if A> temperature will be about

Similarly,

we would

for the hard light

suggest

a temperature-rise

about two degrees rather than fifty degrees. This discrepancy, of course, arises from the differing

values,

the constants,

rise?

561

of about half a degree.

A = 2K/V fixes

EDITOR

effective length of 10-r cm, giving a temperature-rise

The lengt’h

usually

THE

the

of

models,

of the length

dislocations.

case in which

We

dislocations

with a spacing

have move

and

dislocations

uniformly

interatomic

Weiner

distances.

Bunching

slip-plane

forces,

but it is unlikely

could

reach

may

the

and Weiner.

consider

occur

value

source, whereas by

and the temperature at a distance

will be n times what it would be (inter-dislocation

l/n

single dislocation. If A< 1, the maximum

which

.un

is identical

equation

nA

~mq

2nK

temperature

for a

will be about

s(-~-I - -a

T=

spacing)

2r

dr

A/n

suggested

by

was so severe that the distribution pile-up

and

Weiner’s

(5):

and the

If the bunching

was similar to that

of n dislocations,

the distance

between first and last, il, would be about n2 times the distance between the leading pair,(d) as against equally

2nh’

together,

then exceed

strength of the material.

of a static

spacing

Freudenthal

would require very

the array would

n times this distance

4

wit)h Freudenthal

theoretical

five

of retarding

that the average

high stresses to keep the dislocations the stress around

of

about

of the dislocations

because

Their distribution

along

by their

a procession

separated

in the

freely

determined

rate of emission from the Frank-Read Freudenthal

3, of the considered

spaced

the value

for Freudenthal

procession.

We

and Weiner’s

believe

of il for 500 dislocations,

from the simple picture

then

that

about

1O-4 cm

of the Frank-Read

source,

might be reduced to 1O-2 cm if bunching should occur, but that the figure of 10e4 cm is too small. The effect of stacking individual

where m is the spacing between successive dislocations

nearby

in unit,s of b. As before, there will be a temperature-

the possible

rise about’ n times that due to a single dislocation,

Weiner’s

provided the factor (A/J.)* is not too unfavorable. To determine the actual temperature rise, we have

by different arguments,

to estimate if one of appropriate.

plausible

the approximations A> 1, A< V has a maximum value of

fraction of the velocity It’ is commonly on one slip-plane source;

values for V, A, n, and decide

of sound, say i V,,-

assumed

that

il is some

lo5 cm/set.

all the dislocations

come from the same Frank-Read

if the sweeping velocity

of the source is about

parallel

slip-planes

rise in temperature.

equation

by Orowan.c6) temperature

by Cottrellc5) and before that

varies linearly with the amount

the slip-planes, packed

temperature. necessary

so that a large shear on many closely-

planes

could

that

simultaneously,

give

an

appreciable

For this magnified the

nearby

annealed material, 1 N 10e4 cm, and, with n = 500,R becomes about 10-r cm. Thus, A< ;1, and the second Freuform of our equation is the most appropriate. denthal and Weiner achieve a temperature rise of about 8°C on a slip-plane in aluminum, with 500 dislocations moving at Q8, in a procession 1O-4 cm in length; whereas our model suggests that this procession has an

evidence

presented

by

rise

in

heating effect’ it is

slip

and Freudenthal

suggests that’, during fatigue,

In

of glide

on each plane and inversely with the spacing between

about

source.

and

obtained

For a given shear stress, the rise in

that this is not highly probable.

of the Frank-Read

considerably

Freudenthal

7 is the same as that,

the same as the velocity of the moving dislocations, the spacing between successive dislocations will be 1, t’he length

slip processes into

increases

processes

occur

and Weiner suggest

Brawn(7)

The microscopical and

Forsyth’s)

slip only occurs simul-

taneously on planes a micron or more apart. the “striations” widening and intensifying during the test by the addition of individual slip processes one after the other. Furthermore, if displacements of 1500 A were to occur on many planes 200 A apart, as Freudenthal and Weiner suggest, the material would suffer the equivalent of a homogeneous shear of seven atomic

562

ACTA

~~T_~LLU~GICA,

diameters on each atom plane; and this is clearly not achieved over large volumes of the material. The nearest approximation to this case is fine flip, in which the displacement is about 50 k on many slip-planes 200 pi apart. Here the maximum rise in temperat~e might be a few degrees if many of t-he slip processes occurred sim~taneously. It seems inlprobable then that there can be appreciable local heating near the glide-plane, except perhaps at very high rates of loading. The creation of cracks during normal reversed stressing may be explained by the pile-up of dislocations,‘lO) and the softening processes by the local generation of vacancies.(ll) J. D. ESHELBY

VOL.

4,

1956

.ti mole 600 IPrecipitation

FIG. 1. Rate of evolution of energr- ve~‘sus t,irne-euwe for a meesurelnent at !%?.$“C.

thermostat with a very large heat capacity,t3) The specimen was located in a cent‘ral hole in the thermostat and a series of thermocouples, connected to a References sensitive galvanometer, was arranged between the 1. A. M. FREUDENTHAL and J. H. WEINER J. Appl. Phys. specimen and the wall of the thermostat in such a 27, 44 (1956). way that the deflection of the galvanometer was 2. 3-f. S. CARSLAW and J. C. JAEGERConcluction of Heat in Solids p. 234, Oxford (1947). pro~rtioi~a~ to the rise in temperature of the specimen 3. F. SE~TZA&awes in Physics 1, 43 (1952). 4. J. D. ESHELBY, F. C. FRARK, and F. R. N. N~BAREO caused by evolution of heat due to the tra~lsformation. Phil. Lwag,42, 351 (1951). As the heat liberated during the grain enlargement 5. A. H. COTTRELLDislocations and P.?astic Flow in Cry&a& of a metal is very small-at il. grain size of 0.01 mm p. 6 Oxford (1963). 6. E. OROWAN in Principles of Theological Meaewement the total boundary energy is of the magnit’ude of p. 180 Nelson (1949). 0.1 cal/mole-extreme precautions must be taken 7. A. F. BROWN Advances in Physics 1, 427 (1952). 8. P. J. E. FORSYTHJ. Inst. Metals 80, 181 (1952/53); 82, ttioreduce disturbing effects, which will be discussed 449 (1953,!54): P. J. E. FORSYTHand C. A. STUBBINGTON in a later article. The zinc specimens used ha.d the R.A.E. Report Met. 76 (1953), .iWel.78 (1954). 9. D. KuHL~A~~-W~LSDORF and H. WILSDORST Acta iWet. form of granules of a size of about 3 mm with the com4, 394 (1953). position: As < 0.000015~~“, Fe < 006~~. and Pb < 10. N. F. MOTT J. Pkys. 5’0~. Japan 10 (S), 650 (1955). 11. T. BROOM and J. H. MOLIXEUX J. Inst. .&f&a& 88, 528 O.O5O/ / 0‘ The granules were put, into a thin-walled (1954j55). aluminum container fitting into the measuring cell. * Received March 14, 1956. The junction of a Pt-PtRh peltiercouple was located at the center of the cont’ainer for calibration purposes. In Fig. I the rate of evolution of energy- versus Calorimetric Measurements of the time-curve for a measurelnent at 282.8% is shown. Grain-boundary Energy in Zinc* Although the mea,sureme~ts were carried out in an Although relative lain-boundary energies can be at,mosphere of argon, it was almost impossible to easily obtained, absolute values of these energies are avoid a small oxidation effect of the specimens, due more di&uit to estimate. The values reported in to rests of oxygen absorbed at the surface of the the literature are all indirect in the sense that they granules and the container. This oxidation effect have been obtained by comparing the energy of a gives an approximately exponential initial fall of grain boundary with that of an external surface, the measuring curves. The effect of the grain growth the surface energy of which is determined, e.g., from in the specimen, from a size of the grains of somewhat the dihedral angles formed between the soIid and a less than 0.1 mm to abont t mm, appears as a small liquid of known surface tension. This procedure, evolution of heat with a maximum after about though correct in principle, seems not to be very 3 hours, as shown Fig. 1. The form of the curve is accurate in practice. The present investigation is a bell-shaped, which may be expected for a coalescencedirect measurement of the grain-boundary energy in process. As the oxidation effect a’nd the growt,h of zinc with an isothermal calorimetric method, practiced the grains have different energies of activation, earlier.(ls 2, t.he temperatures of the measurements have been The calorimetric apparatus used for the measurechosen so that the maximum of the latter effect does ments was an electrically heated and regulated not occur until the rate of oxidation ha,s diminished.