The integral form of the equation of transfer in finite, two-dimensional, cylindrical media

J. Quanr. Spcc~ros~~.Rudicrr. Transfer Vol. 42, No. 2. pp. Printed in Great Britain. All rights reserved

I 17-l

36, 1989

0022-4073189

Copyright

THE INTEGRAL FORM OF THE EQUATION TRANSFER IN FINITE, TWO-DIMENSIONAL, CYLINDRICAL MEDIA S.

Department

of Mechanical

T.

$3.00 + 0.00

(1 1989 Maxwell Pergamon Macmillan plc

OF

THYNELL

Engineering, The Pennsylvania PA 16802. U.S.A.

State University,

University

Park.

Abstract-The corresponding integral form of the equation of radiative transfer in absorbing, emitting, linear-anisotropic scattering media bounded by emitting, diffusely-reflecting walls is formulated. The formulation includes a development of expressions for the radiation intensity, the incident radiation and the forward and backward radiation heat fluxes in the axial and radial directions, respectively. The integral form is represented by a system of coupled Fredholm type integral equations, which can be solved accurately by numerical techniques. The two-dimensional formulation is subsequently used to develop the corresponding integral equations in one-dimensional, axi-symmetric media. In addition, it is also shown that the respectively, are developed expressions for the net radiant fluxes in the r- and :-directions. different from the equations presented recently in the literature.

I. INTRODUCTION Radiative transfer is an important mode of energy transfer in numerous areas. Examples of such areas include, among others, modeling of heat-transfer in liquid and solid-propellant propulsion systems; development of methods for improving the efficiency of pulverized coal, natural gas and oil fired furnaces; analysis of heat transfer through various fibrous and foam insulations; in the studies of nuclear energy generation and explosions; and in the prediction and examination of i.r. signatures from rocket plumes. Thus, radiative transfer has received a considerable amount of attention in the literature. To analyze the radiative heat transfer, numerous approaches have been proposed for solving the equation of transfer either approximately or rigorously. A brief discussion of several solution methods has been presented by Viskanta.’ Examination of these methods has revealed that the integral form of the equation of transfer is often employed to develop the solution.2-7 The use of the integral equation rather than the equation transfer yields, in most cases, highly accurate results for the quantities of engineering interest, which are primarily the incident radiation and the net radiation heat fluxes. The high accuracy is, in part, attributed to the smoothing that occurs when integrating the intensity over all solid angles. That is, the radiation intensity is often a highly singular function, whereas the incident radiation and the net radiation heat fluxes are usually much smoother functions. As shown by other workers8m’0 and also revealed in the following sections, however, it is quite a laborious task to transform the equation of transfer into an equivalent integral form for the incident radiation and the radiation heat fluxes. The transformation yields one or more coupled singular Fredholm type integral equations of the second kind, which involve integrals that in most cases must be evaluated numerically. The objective of this work is to present a development of the integral form of the equation of transfer in absorbing, emitting, linear-anisotropic scattering, two-dimensional cylindrical media, which is bounded by emitting and diffusely reflecting walls at known temperatures. The development in the following section, however, leads to expressions that are partially different from the corresponding ones presented recently by Lin,” who considered the effects of isotropically scattering media. In addition, the corresponding integral equations for the incident radiation and the net radiant heat flux for one-dimensional, axi-symmetric media are also formulated utilizing the two-dimensional analysis as the basis.

PSRTC--C

117

S.T.THYNELL

IIX

ANALYSIS

2.

-3.I. Equation

?f’ transfb

We consider radiative heat transfer in absorbing, emitting, linear-anisotropic scattering. twodimensional cylindrical media bounded by diffusely emitting and reflecting opaque walls. The radiative properties are assumed gray and spatially independent, but the analysis is also applicable to a specific wavelength. The medium contains spatially distributed and varying energy sources of intensity Z,[T(r. z)], where T(r, :) is the temperature. Z,(T) is the Planck function. which for the gray analysis becomes Z,(T) = n’c?T’:‘n. A schematic of the physical model and coordinates arc illustrated in Fig. I. The mathematical description to this problem is given by”

=(I

[G(r, z) + aq,. (r. -_)cos tl + aq,r(r, z)sin 8 cos 41,

- Q)Zh[T(r. :)I + 5

inO
OdO
conditions

OGd)<2n.

(1)

are given by

Z(r,-c.d,$)=c,Zh,(r)+cqj_

(r,-c)=J,(r),

77

Z(R.~.H.~)=(~Z~~(;)+~~~(R.-_)=J~(Z).

Z(r. c, 8, 4) = cJZbI(r) + :(I;

O
CR.

O
Izl
(r. c) = J3(r),

O
o,
n 5 < 0 < 71,

0 d r < R.

0 < (b < 27-t.

(2Ll)

(2b)

(2c)

Here, Z(r, 2, (b, 0) is the radiation intensity, r and ; are the optical variables in the radial and axial directions, respectively, 0 and 4 are the polar and azimuth angles, respectively c, = 1 - p,, i = I. 2, 3 the surface emissivities of the opaque bounding surfaces from the inside, and Z,[T(r, z)] is the spatially distributed energy source due to the temperature T(r, z) of the medium, and for simplicity we define at the wall Z,i = Z,(T,). The incident radiation G(r, z)? and the forward and backward are, respectively, defined by radiation heat fluxes in the r- and z-directions T I( r, z, 8, ~$)sin 0 db’ dq5, ’ l C$=o s o=o

(3a)

q$(r,z)=2

’ I( r, z,t3, &)sin2 l3 cos C$de d@. ” .i @=I1 1‘0=0

(3b)

q<:(r,-_)=2

’ r;7 Z( r, z, 8. 4)cos i o=o i lI=O

(3c)

G(r.z)=Z

q:,(r,z)=2

”

’

8 sin 0 d8 d$,

(3d)

Z(r,z,8,7r--$))sin’Qcos$dHd4,

(1I$=II l,=0 n s;; (r, z)

=

rr,2

Z(r, z, n - 8, $)cos

2

8 sin tI do d4.

(3ei

i‘ @=O s H=O The net radiation

flux in the r- and z-directions q+(r’. 2) = q;(r,

are, respectively,

specified

as

z) - qc; (r, z),

(4a) (4b)

4L:I(r1=)=q~(r,=)-ql~(r,Z). The anisotropic

scattering

has been represented

in an approximate

P(cos 0) = 1 + c1cos 0,

manner

as (5a)

Integral form of the equation of transfer

where P(cos 0) is the scattering phase function and the scattering incoming (e’, 4’) and outgoing (0, 4) d irections of the electromagnetic cos0

=sinesin9’cos(4

119

angle 0 is related waves by

to the

-~f)+c0sec0s8f,

(5b)

and - 1 d a d 1 is the expansion coefficient to the scattering phase function. Equation (l), subject to boundary conditions given by Eqs. (2) represents a singular integro-differential equation due to the possibility of different surface temperatures and emissivities, as well as the effects of the< corners of the enclosure. As such, Eq. (1) is difficult to solve accurately, but the integro-differential equation is transformable into a corresponding integral equation of the Fredholm type, in which all such singularities are smoothed out. In the present analysis, however, it is necessary to construct three coupled integral equations. The reasons for this coupling of the integral equations are: (1) the formulation includes the effects of diffusely reflecting bounding surfaces, and (2) the effects of the linear-anisotropic scattering. To construct the integral equations, we first present the expressions for the radiation intensities. 2.2. Formal solutions

to the intensity

By following the development of, e.g., ijzigik,‘* it is possible the equation of transfer of the form

to construct

a formal

solution

to

s0 Z(s = 0,0)

= exp( - S,)Z,(S,)

+

exp( - s’)S(s’, a’) ds’.

(6)

s0 Here, S, is the optical

distance

the rays have traveled

Fig. 1. Schematic of the physical model and coordmates.

from their origin

(at s = S,), I,(&)

is the

Fig. 2. Illustration of the intensity having a contribution from the bottom bounding surface at z = --c. The expression for the intensity and the limits of the angular variables (0 +, 4 *) are specified by Eq. (9).

S.T. THYNELL

IX

(diffuse) intensity of the rays leaving the wall, and S(s’. Q’) is the source function in direction R‘ at .Y’. To transform Eq. (6) into the (1..I, 8. 4) coordinates of cylindrical geometry. we consider the following. First. the intensity is symmetric with respect to a plane formed by the r- and --axes. permitting us to limit the bounds on the azimuth angle given by 0 d # d n. Second, we introduce a forward (&‘) and a backward (0 ) intensity in the axial direction. and a forward (4’) and a backward intensity (4 ) in the radial direction; these are defined as

The source

function

is then given by

S(l., :. 0’. 4s‘) = (I - to)Ih[T(r, +z

in

[G(i+,~)+fzq,~_(r.~)(

O
;)I tcosf3’)+uq,~(r,r)sinff’(rt

/-_/cc,O
O
cos$*)J.

(8)

That is, the change in the sign on 0’ is related to the sign on +cos Q*, and similarly 4 7 is related to kcos 4 ‘. I*o construct the formal solution. we first consider directions of the intensity containing contributions from the bottom bounding surface at I = -- c. By considering Fig. 2, the transformation yields

exp[ - (2 - :‘)sec O+]S(r’, z’, N’, # *‘)sec If+ d-_‘,

O
t(r,R.(Pf) c+z '

(9)

where r’=[r’+(=

-z’f’tan?@+

-2rjz

--‘jtan8+(_tcos~‘)]“‘,

r’sin$“=rsin4=,

(lOa) (lob)

r(r, R, tp *) = r( f cos +4‘) + (R2 - rz sin’ # ‘)’ ‘. r, = r’j._.=_i,

(lOc) (10d)

Similarly, the intensity containing contributions from the bounding wall at Y = R are split up into axially forward (Fig. 3) and backward components. Such split up yields

I(f.:.W.#*)=J2(zZ)exp[-(z-q)secd+l exp[-(2

-:‘)secB+]S(r’,~‘,8+,$r’)sec8+d;’.

Integral

form of the equation

of transfer

and I(r, z, 8-, C#I ‘) = Jz(zz)exp[ - (z2 - z)sec 0-1 12 +

exp[-(z’-z)sec&]S(r’,z’,8~,~“)sec&dz’, s ..‘Z_

(12) where lz-~~I=t(r,R,~‘)cot8’. Finally, the radiation intensity containing is represented according to Fig. 4 as

(13)

a contribution

from the top bounding

surface at z = c

I(r,z,F,4+)=J3(r3)exp[-(c-z)sece-] exp[ - (z’ - z)sec &]S(r’,

+ o

t(r, R 4 ‘> c-z ’

z', 8 -, C#I *')sec 0 -

,,,*,q,

dz’,

(14)

where r3 = r’l,,=+,

(15)

The above formal solutions are used to construct integral expressions to the quantities of most interest in engineering applications, namely, the incident radiation and the radiation heat fluxes.

-r

Fig. 3. Illustration of the intensity having a contribution from the side bounding surface at r = R for z’ <.z. The expression for the intensity and the limits of the angular variables (O+, 4 *) are specified by Eq. (11).

Fig. 4. Illustration of the intensity having a contribution from the top bounding surface at z = c. The expression for the intensity and the limits of the angular variables (&, 4 *) are specified by Eq. (14).

S. T. THYNELI.

122

2.3. Incident radiation

G(r, 2)

To obtain an integral equation for the incident radiation, the formal solutions to the radiation intensities given by Eqs. (9). (11). (12) and (14) are substituted into the definition of G(r, z) given by Eq. (3a). To simplify the subsequent analysis. however, we represent the incident radiation as the sum of eight components: G(r. -) = i [G,+(r. -_) + G, (r. z)]. /= I

(16)

where

G!(r,z)=2

H+,d)*)sinH+dOi

d4*.

GT(r. r) = 2

(17c) tan,, -

G$(r.z)=2

(1%)

” s * - = 0 1 I, = (I

I,,.

R. .-@+ 1 < :

l(r,-_,H

,d*)sinC

dH

d$I.

(t7d)

The following analysis describes how the angular integrations are transformed into equivalent surface and volume integrals of the two-dimensional cylinder. However, we limit the details to those defined by G,‘(r, z), i = 1.2. since the expressions for these can be used to deduce the corresponding expressions for G,(r-, z), i = 3.4 due to symmetry in the integrals. 2.3.1. E.xpression for G :(r, :). First we introduce the Dirac-delta function 6(x) to write the definition of G:(r, 2) as

represent the angular variables of integration variable (r’. r), as shown in Fig. 5, the following

TO

The Jacobian

(8+, 4 +) in terms of a spatial transformation is introduced:

and an angular

(z - z’)tan H+ = [r’+ r” - 2rr’cos

cx]’ ‘.

(19a)

tan C#I+ = r’ sin cc/(r - r’cos

CC).

(I9b)

of the transformation

is given by (z - z’)r’

s(e+.$-) ;I(r’, J)

= d:(r, r’. r, z - z’) d,(r, r’, LX,0)’

(20)

where d,,(r. r’, 2, u) = [r’ + r” - 2rr’ cos tl + u~]~,~.

(21)

We also find that sinH’=d,(r.r’,a,O)jd,(r,r’,r,z-2’).

(22a)

cosfl+=(;-:‘),id,(r,r’.cr,z-2’).

(2%)

i = r’sin sin C#J

x/d,(r,

r’, c(, 0),

(22c)

cos C$T = (r - r’ cos ol)/d, (r, r’, do,0).

(22d)

cos g5’-’ = (r cos r - r’)/d,(r. r’, 4%.0).

(22e)

Integral

form of the equation

123

of transfer

(a)

TOP

VIEW

OF CYLINDER

r 4

(Z-Z’)

tone+

(b)

Fig.

5. Definition

of dummy variables and a.

of integration

r

Fig. 6. Illustration of the limits used on r’ and a in the various integrals. Here, it is assumed that z’< z with (a) applicable to r’ and z if z’ > z:. and (b) applicable to r’ and a: if z’
To specify the limits of integration, we use Figs. 6 and 7 to establish that the radiant energy propagating towards the point at (r, z) must be confined to within the circle of radius r:, which is centered at a radial distance rd+ from the z-axis, the line r’ = r set a and the r-axis. By substituting the above transformation into Eq. (18) and using Fig. 8 to express r: and ri in terms of known variables, we obtain Rcosa=r G T(r, 2) =

,S~CS

J, (r’)(c + z)K,(r,

2 s !l=O +2

j”

r’, a, c + z)r’

j”

J, (r’)(c

+ z)K,(r,

r’, a, c + z)r’

z’)K,(r,

ss G

+

dr’ da

s r'= 0

~,‘,I,

x=a+ r’= r&,

(-)r’

dr’ da

dr’ da

r’, r, z - z’)r’

dr’ da

1

dz’

(23)

The (s) symbol is introduced

to reduce the length of the expressions,

and it implies that the integrand

S. T. THYNELL

114

(a)

--

r

(b) Fig.

7. The slanted

r’-plane

Fig. 8. The radial distance r; to the center of the clrclc 01 using ratios of equ.tl radius r<’ and z: are determined triangles.

lines tllustrate the (r’. 1) domain in the that contributes to G,+(r. :). i = I. 2, which are components to the incident radiation.

is repeated.

Furthermore,

it is necessary

s*(l-. 1.‘. Iz. 1. z’) = (I - c0)Z,[T(r’. +

E

G(r’. z;) + ay,

to define a new source

function

as

:‘)I (z - z’) (r’. z’)

l/,(r. r’, 2. z -z

[

,+

)

q,.r(r’.

z’)

(1.cos x - 1.‘) d,(r. 1.‘. x, I - I’) 1 *

(74)

and

r A, = r;

cos

y

+

[r;’

rh = r(c * z’)/(c r’=Rlz

_ r$‘sin? ~(1’ ?,

+ z),

-z’j/(cf~).

tan c(5 = [ri+’ - (r - r,;)‘]’ The kernels

K,,(r, r’, x, u ) are introduced

‘jr.

as

K,,(r. 1.‘. x, II) = exp[ - d,(r, r’, x. u)]/d,,(r. r’, 2. 24). 23.2. Expression for G;(r, z). By substituting

G, (r. 2).

We continue the analysis by developing an expression Eq. (9) for 4 _ into Eq. (17a) and using the Dirac-delta function

t2h)

for in a

Integral

similar

manner

as in Eq. (18)

form of the equation

the resulting

ss

expression

of transfer

125

becomes

n?

G, (r,z)=2

[J,(r’)6(c+z’)+S(r’,z’,0+,&‘)sec0+]

$J =0 II+- 0

xexp[-(z-z’)sec0+]dz’sinB+dB+d&. In this case, the previous

transformation

(27)

given by Eqs. (19) can still be applied,

cos&‘=(r’-r

but we note that

cos c()/d, (r. Y’, c(, O),

(28)

which results in the same expression for the source function S*(r, r’, ~1,z, z’) as defined by Eq. (24). Using Figs. 6 and 7, the equivalent expression for the component of the incident radiation G ;(r, z) is Rcou=r

R

J, (r’)(c + z)K,(r, r’, 2, c + z)r’ dr’ da

G, (r,:)=2 s r = r \ec1

s I=0

2.3.3. Expression for G:(r, z). We continue by developing tution of Eq. (11) into Eq. (17b) applied to 4’ yields

+ To transform of integration

an expression

_ S(r’, z’ ,8’,$+‘)exp[-(z-z’)sec8+]sec0+dz’ __j:-_:

for G:(r, z). Substi-

sinO+dtI+d4+.

the surface integral involving Jz(zz) in Eq. (30) we treat zz = z’ as the dummy and introduce the transformation (z - z’)tan 0’ = [r’ + R’ - 2rR cos a]’ ‘,

The Jacobian

of this transformation

By utilizing Figs. 6 and 7 to deduce eliminate sin 0 +, we find ’ ss_‘

n

J?(z’)(R

(31b)

is

;(e+, 4’) d (z’, a)

G:(r,z)=2

variable

(314

= R sin r/(r - R cos 51).

tan$+

(30)

I

R(R -r

cosa) (32)

= d?(r, R, ‘A,z - z’)d,(r, R, CC,0)’ the limits

of integration

and by employing

Eq. (22a) to

- r cos a)K,(r, R, a, z - z’)R da dz’

RCOSZ-,

Rcosx=r

~SXJI

R (.)r’ dr’ dcc +

1

(.)r’ dr’ dcc dz’ s 2= 2”:

s r=o

S. T. THYNELL

IX

2.3.4.

Espression

for

in Eq. (I I ). Then,

Gz (r, z). To obtain

S(r’.

+

z’ ,o+,&‘)exp[-(=-=‘)sec6,+]secH+d;’

I=::

Using

G, (r, z), we first consider the backward direction of this expression over the appropriate solid angles yields

an integration

the preceding

sinf!I’dH+d$

4

(34)

i

development

G’(r.

involving

z), we deduce

immediately

that

Hco\1= , G,(r,;)=Z

J2(z’)(R I---

Hu,,r ( +

- r cos r)K,(r.

R. 2,;

- r’)R

da dz’

L

K (*)r’ dr’ da

i 1 7.’

i , = rwc1

(35)

dz’. 1

23.5. Expression for G(r, z). A close examination of the integrals presented in Eqs. (23) (29), (33) and (35) for G’(r, z). i = 1.2, reveals that the sum of these four equations add up to one volume integral and two surface integrals. The limits of these integrals are confined to within a cylinder whose top surface is located at z. It is thus obvious that the sum of the four expressions for G ,?(r. : L i = 3.4. adds UP to an equivalent volume integral and two surface integrals, whose limits are within a cylinder located above the point at z. By using symmetry in the integrals. WC deduce that the integral equation for the incident radiation is given by I? GO,. z) = 3 I-1e (I I , =,,

J,(r’)(c

+ z)K7(r,

J,(z’)(R

+2 i-

- r cos x)K,(r,

R, x. 2 - z’)R

da dz’

IL J?(r’)(c

+2

r’. ;I, c’ + :)r’dr’dr

- z)K,(r,

r’. IX,c - z)r’ dr’ dr

I-x=I, !^i -0 I

+q_

R

,; 1= 0 j r =o

S*(r.

r’, x. 2. z’)K?(r,

r’. Y(.: - z’)r’dr’dr

dz’.

(36)

where the source function S*(r, r’, 2. z. z ‘) is defined by Eq. (24). Since the source function contains the net radiant heat flux in the radial and axial directions, it is also necessary to develop expressions for these quantities in order to complete the formulation. The formulation is also necessary in the case of nonblack surfaces which enclose a purely absorbing/emitting medium. It should be noted that Eq. (36), applied to the special case of isotropic scattering (a = 0), is readily reduced to the of Eq. (36) integral equation for the source function as derived by Lin. ” In addition, evaluation at z = -c’ results in the contribution 271J,(r) from the first double integral; similarly, evaluation of Eq. (36) at z = c results in the contribution 2nJ,(r) from the third double integral. 2.4. Radial

radiant

heat ,fiuxes

q$ (r, z)

The forward and backward radiant heat fluxes, qg (r. z) and q, (r, z), respectively, angular coordinates (0 *, C#J ‘), are defined by r:? n? de+ q‘t (r. :) = 2 I(r, z, 8+. 4’)sin’Q’ s $$t=0 [S i)+= 0 +

a’ Z(r, z,8-,~*)sin28-d& s o- =0

1

based on the

cos4’d@‘.

(37)

Integral

Using the specific definitions we find

form of the equation

of the intensities

127

of transfer

Z(r, z, 9 +, I#J*) given by Eqs. (9)

(11),(12)

and (14)

J2(z2)exp[ - (z - z,)sec 0 ‘1

S(r', z', 13+, C#I*‘)exp[

+2

-

(Z - z')sec 8 +]sec 0

+dz’

sin* 8 +dO +cos 4 f d$ ?r

{;I=0 JIro_ i.l,(z2)exp[ - (z2- z)sece-1 _,cr;R.f*l

s. =z

+

,s(r’,z’,e-,@*‘)exp[-(z’-z)sec&]sec&dz Z,= _

+S(r’,

sin20~dO~cos~*dQ,*

z’, 8-,~“)sec8-]exp[-(z’-z)sece-]dz’sin2e--de~cos~’d~~.

(38)

To transform these integrals from the angular domain of (Ok, C#J ‘) to the (r’, CX)domain, we consider first the forward radial heat flux, qi (r, z). For the integrals in Eq. (38), we introduce for the surface integrals involving the contributions from the bounding intensities J,(r) and J3(r) and the volume integrals involving the source function, respectively, the transformation given by Eqs. (19) resulting in

(~-r’COS~)IZ--‘lr,dr’dr d4(r,r,,C(,Z_z,)

sin’O’cos~+d~*d~+=

,

(39)

where cOse*=Iz-z’l/d,(Y,r’,CI,Z-~‘).

For the two surface integrals involving the boundary transformation given by Eqs. (31), yielding

intensity

Jz(z?) in Eq. (38), we employ

(r-Rcoscr)(R-rcosa)

sin*8*cos#+dO*d~+=

d4(r, R, a, z - z’)

To establish the corresponding limits of integration, expression for the forward radial heat flux: Rcora=r

(40)

R da dz’.

we use Fig. 9, resulting

the

(41) in the following

rseca

q; (r, z) = 2

[~,(r’)(~+z)K~(r,r’,tl,c+z)+J~(r’)(c-z)K~(r,r’,~,c-z)l s 0=0

s I'= 0 11

x (Y - Y' cos

R

cc)r’ dr’ dcr + 2

(.)r’ dr’ dcr s Rcosa=r s r'=O

J,(z’)(r-Rcosa)(R-rcosa)K,(r,R,u,z-z’)Rdudz’

S*(r,r’,cr,z,z’)(r

(.)r’dr’dcr

1

dz’.

-r’cosc1)K3(r,r’,cI,z

-z’)r’dr’dcr

(42)

1%

S.T.THYNELL

The (e) symbol implies that the integrand is repeated and introduced to reduce the length of the expressions. In the case of the backward radial heat flux, it is now readily shown that the corresponding expressions to Eqs. (39) and (41’ are, respectively, given by (43) and sin-‘@* cosd,’

d@* d4”

-_

(Rcosa-r)(R-rcosff) d43(r,R, a, z - 2’)

--- R da dz’.

(44)

By using Eqs. (43) and (44) in Eq. (38) for 4 - and by deducing the limits from Fig. 9. we obtain Rcosd=r y<;:

(1.,

z)

2

=

s f =0

R

V,(r’)(c’ + z)&(r. Y’,~1,c + z) s ‘i;iTSCCZ

-t-Jl,(r’)(C -z)iY,(r,r’,x,c

-z)](r’cosa

-r)Y’dr’da

x K3(r, r’, a, ; I z’)r’ dr’ da dz’.

(45)

The resulting expression for the net radiant heat flux, which is defined by Eq. (4a), takes the form y,:,(v,zf=2

R [J, (Y’)(C + z)K 4(r,y’,a,c n s x=0 s I =n x(r +zJ

+z)+J3(r’)(c

-z)iY,(r,r’,ff,c

-z)]

- P cos a)K,(r,

R, a, z - z’)R dor dz’

-r’cosa)t.‘dr’da ii .J?(z’)(r - R cos a)(R s f z --( I 1= 0 S*(r,t”,a,z,z’)(r

-r’co~a)K~(r,r’,a,z

-z’)r’dr’dcl

dz’.

(46)

It should be noted that the above expression for the net radiai heat flux, reduced to the special case of isotropic scattering, does not completely agree with the one presented by Lin.” The difference between his (on p. 595) and Eq. (46) is found in the integrand of the surface integral involving the bounding intensity J,(z); Lin’s formula contains the term (I - R cos a)‘, whereas Eq. (46) contains the term (r - R cos a) (R - r cos a). The expression presented by Lin yields numerical results of the net radial heat flux that appears to be in error and physically unsound. For example, if we suppose that the radiation transfer originates from the bounding surface at Y = R. that is the bounding intensities J1 (r) = 0 and &(P) = 0 (cold and purely absorbing boundary surfaces at z = kc). and that the source function is negligibly small (cold and nonscattering medium); then the net radial heat flux is always positive according to Lin’s expression. This result does not seem to be possible. Thus, it appears that there is either a typographicai error, or that the application of Lin’s general formulas have resulted in incorrect integral expressions in this particular case. 2.5 Axial radiant heat fluxes 4: (r, z) The development of expressions for the forward and backward radiant heat fluxes in the axial direction, q$ (r, z) and qe: (r, z), respectively, proceeds in a similar manner as for the development

129

Integral form of the equation of transfer

of the heat fluxes in the radial direction. The axial heat fluxes are defined by

s; (r, z>= 2

ss x/2

4

,$+=o e*=o

Z(r,z,8*,~+)cos8*sin8’de~d~+

ss d-2

+2

n/2

Z(r,z,8’,~-)cos8’sin8’dB’d~~. ,#-=lJ 0+=0

(47)

Using the definitions of the intensities Z(r, z. 0 *, 4 ‘) given by Eqs. (9), (1 l), (12) and (14), the axial heat fluxes are q~~~,z~=2~~~=o~~~~~=~~~=_~~~,~~~~~~~+I.)+S(~..i.;R+,~+.)rers'j

+

s

+

s

’ S(r’, z’, 0 +, 4 +‘)exp[ - (Z - z')sec0 +]sec8 + dz’ sin 8 + cos 8 + de + d4 + i’=i2

’ S(r’, z’, 8 +, 4 -‘)exp[ - (Z - z')sec8 +]sec8 + dz’ sin 8 + cos 8 + de + d4 -, 2’=22 I (48)

and [J,(r')d(c -z') + S(r',~',e-,4+')sece-1

xexp[-(z’-z)secO-]dz’sin&cosO-de-d$+ [J,(r’)d(c -z’)+

S(r',z',e-, +-')sec e-1

xexp[-(z’-z)secO-]dz’sinfJ-cos8-d&d& +2C.oJ~O_

,,,,,,+,~*(z2)exp[-(z2-z)sece-l c--L

22 +

s I’=z

S(r’,z’,&,4+‘)exp[-(z’-z)secO-]sec&dz

sine-cm&de-d4+

tbw-,{ +2J;:_oJ::e

4 (z2)exp[ - (z2 - z)sec 8 -1

+

s

c--z

z2S(’r ,z’,O-,4-‘)exp[-(z’-z)secO-]sec&dz

I’- z

sin&cos8-de-d4-. (49)

S.T. THYNELL

Fig. 9. The slanted lines illustrate the (r’. 2) domain in the -‘-plane that contributes to the forward and backward radiation heat fluxes in the radial direction, y;t (r. z) and 4,; (r. z ). respectively.

Fig. 10. The slanted lines illustrate the (T’%z) domain in the =,-plane that contributes to the forward and backward radiation heat fluxes in the axial direction. (I,~ (r. -_) and y,,; (r. z). respectively

To transform these integrals from the angular domain of (0 +, C#I ‘) to the domain of (r’, x ), we employ the previous transformation given by Eqs. (19). For the surface integrals involving J,(r) and J3(r), and the volume integral involving the source function. we introduce the substitutions, respectively, given by (z

sin0’cosQ’dCI’d+‘=

_

=‘)Z

dd( 1. r’, rl, z - z’)

r’dr’da,

(50)

and sintI*

de* d4’

=

/z - Z’I

r’ dr’ da.

d-1(r, r’, a, z - z’)

For the surface integral involving the boundary the transformation given by Eqs. (31), yielding

intensity

J,(zl)

(51)

in Eqs. (48) and (49). we employ

(52) The limits of the integration for the z’ variable are readily established from Fig. 10, and we must have 0 d r ,< TCand 0 s r’ G R. The expressions for the forward and backward axial heat fluxes, respectively, are constructed as: n

R

J, (r’)(c

ql(r.z)=2

+ z)‘K,(r,

r’, CI,c + z)r’ dr’ dcr

s X=0 s ,'= 0 ’

+2 s.

s

J>(z’)(z

- z’)(R

- r cos x)K,(r,

R, CC,z - z’)R dcc dz’

z=O

')(z -

z’)K3(r,

r’, a, z - z’)r’ dr’ do! dz’,

(53a)

131

Integral form of the equation of transfer

and R

qP;(r,z)=2

n

J3(r’)(c

-

z)‘K,(r,

r’,

a,

c

z)r’dr’ dcc

-

s ;r=O s r'= 0 ‘

+2

n

SJ

J2(z’)(z’ - z)(R - r cos a)K,(r, R, a, z - z’)R dcr dz’

3-0

c

n

R

a=0

s r'=O

S*(r, r’, a, z, z’)(z’ - z)K,(r, r’, a, z - z’)r’dr’

+2 LS

dcc dz’.

(53b)

The resulting expression for the net radiant heat flux, which is defined by Eq. (4b), takes the form qt,(r, z) = 2

s’ sR

[J,(r’)(c + z12K(r, r’, a, c + z) - J3(r’)(c

Z=O

4

- z)‘K,(r,

r’, cx,c - z)]

r'= 0

c

x r’ dr’ dg + 2

l-S

J,(z’)(z - z’)(R - r cos a)K,(r, R, a, z - z’)R dcr dz’

0=0

S*(r, r’, LY,z, z’)(z - z’)K,(r, r’, LX,z - z’)r’ dr’da dz’. +~s:.-c~~~os.lo

n

(54)

It should be noted that there is also a discrepancy between the above Eq. (54), applied to the special case of isotropic scattering, and the corresponding one developed by Lin.” The difference between the two expressions is observed in the integrand of the integral involving the bounding intensity J,(z). In Lin’s work, the integrand contains the term (r - R cos a), whereas in this work it contains the term (R - r cos cc). The effect of Lin’s result is that it appears to produce physically unrealistic results; that is, for c( < cos~‘(r/R), a negative contribution to the net flux is predicted. However, such negative contribution to the net axial heat flux is possible only for z’ > z.

3. RADIATION

TRANSFER AXI-SYMMETRIC

IN

ONE-DIMENSIONAL, MEDIA

In numerous applications, the radiative energy transfer takes place in axi-symmetric media. In such media, the radiation transfer is independent of rotation about the z-axis as well as translation along the z-axis. In previous works, the integral form of the equation of radiative transfer in absorbing, emitting, isotropically scattering media has been formulated’0 and solvedI using the appropriate expansion functions. The objective of this section is to reduce the formulae developed in Sec. 2 for the incident radiation and the net radiant heat flux in the radial direction to the corresponding ones in the one-dimensional case. 3.1. Incident radiation G(r) We consider an infinitely long cylinder, in which the radiation transfer depends only on the radial variable r. Using Eq. (36) as the basis for the subsequent analysis, the integral equation for the incident radiation is written as 00 n G(r) = 45,

s &-‘=a s x=0

(R-rcosa)K,(r,R,u,z’)Rdccdz n:

n

R

r’, a, z’)r’ dr’ du dz’.

(55)

Here, we arbitrarily set z = 0 and note that the integrals are symmetric in the z/-direction. source function S&(r, r’, a, z’) in the one-dimensional case is defined by

The

+4

S?,(r,

.?‘=!I r-0 sss

r’, a, z’) = (1 - o)Z,[T(r’)]

Sy,(r, r’, a, z’)K,(r,

r’=O

+ z

G(r’) + aq+(r’)

(rcosa-r’) d, (r, r ‘, a, z’)

1’

(56)

S. T.

131

THYNELL

It is now desirable to reduce the number of integrals such reduction, we consider first the integral defined

By introducing

in Eq. (55) from three to two. To perform by

the transformation (58)

d, (r, r’, a, z’) = [I, (r. r’. 2. O)sec 1~. we find dz’ = o’,(r, r ‘, z, 0)sec’ 1~d/c Substitution

of this transformation

(5%

into Eq. (57) yields

(r cos x - r’)_ G(r’)Ki, [d, (Y, r’, a, 0)] + aqCr(r’)Ki2[d, (r. r’, CC.O)] --~---~ n, cr. r’. L-i.01

F,(r)=4

x -~--~~~ ri, (r. r’. 1. 0) where Q(x)

is the Bickley

function14.‘” defined

(60)

by

nz! K,(s)

exp( - .Y set P)COS’ ’ p dp.

=

(hl)

s0 By using its relation

to the modified

Bessel function Ki, (s) =

and the addition

theorem”

applied

to r’ < r given by

F,(r)

that the function

(03,

K,(u) du,

I’

K,[d, (r, r’, x, O)lexp(il$) = it may be shown

K,,(x), namely.

ci

,I:

K,+,Cr)ln(r’)exp(inu),

can be written

(63)

as

I F,(r) = 47~

T ,=n u=l SS[

G(r’)K,,(ru)Z,(r’u)

+ aqGT(r’) k K,,(ru)l,(r’u)

ss[ R

+ 4n

du r’dr’

1

I

T=T ti=I

G(r’)Z,(ru)&(r’u)

Here, i = v; - 1 and the angle $ is located opposite the surface integral in Eq. (55) and define %

- aqGr(r’) i &(ru)K,(r’u)

du r’ dr’. (64) 1 to r’ for r’ < r and vice versa. Next we consider

*

F?(r) = 4J,

(R - r cos a )K,(r, R. r, z’)R dcc dz’.

(65)

1: -01 z=O Using

the transformation

given by Eq. (58), Eq. (65) becomes

F,(r) = 4J, The use of the addition

’ (Rs z=o

theorem

r cos r)K&[d, (r, R, x, O)]

yields the desirable

R dcc d2 (r? R, u, 0)’

(66)

result given by

1 F:(r) = 4nRJ, By introducing

the kernel

L,,,(r,

% s

r’) defined

L,, (r, r ‘) = 47t

L K, (Ru)Z,(ru) du. s [,=I u

u=I

by

K,(ru)Z,(r’u)

du ~ t?1+?7’ r’ < r, u

%

L,.,(r,

r’) = 4n( - l),+’

(67)

i u= I

I,(rU)K,,(r’u)

du z, u

(6W

r’ > r,

(68b)

Integral

the integral

equation

form of the equation

for the incident

G(r) = RJ&,,,(R

radiation

133

of transfer

is represented

by

r)

s[i

1

R

+

(1 -w)lb[T(r’)]

r’=O

3.2. Net radiative heat flux

r’) r’dr’.

L,,,(r, r’)+azqgT(r’)L,,,(r,

+zG(r’)

(69)

q;,(r)

The development of the integral equation for the net radiative heat flux follows the procedure used above for the incident radiation. Using Eq. (46) as the basis for the analysis, we express the net radiative heat flux in the form q2, (r) = 4J,

n (r-R x s I=0 s a=0

cos

T. f4 By defining

n

a)(R - r

F,(r)

function

a)K4(r, R, Z, z’)R da dz’

R

:‘=0 z=o /=O sss

a working

cos

S*(r, r’, E, z’)(r - r’ cos cc)K,(r, r’, 2, z’)r’ dr’ dcr dz’. as

x (r -r’cosa)K,(r,r’,cc,z’)dz’dccr’dr’, and using the transformation

given by Eq. (58)

G(r ‘)I& [d, (r. r ‘. a,

&:7(r) = 4

this function

WI+ q,rWG

is expressed

F3(r) = 471

ss “’

x

r=O

u=l

(rcostl

Finally,

we introduce

3

7

, = r’ u=l

of the modified

dz(r, r’, LX,0)’

(72)

Bessel function

and

1

cr’dr’

1

-G(r’)Z,(ru)K,(r’u)+uq,~(r’)~Z,(ru)K,(rIU)

of the surface

’

(r-R

s a=0

cr’dr’.

(74)

given by Eq. (58) into Eq. (74) to obtain R da

cos cr)(R - r cos a)Ki3[d, (r, R, a, 0)]

(75) 4

Expressing the Bickley function in terms of repeated using the addition theorem, we find I;,(r) = -4nRJ2 ‘Then, based on the developed

(73)

in Eq. (70) as

cos cc)(R - r cos a)K,(r, R, u, z’)R du dz’.

’ (r-R m s :‘=0 s ol=lJ

the transformation

integral

1

dcr r’ dr’

m

a definition

F4(r) = 4J2

integrals

3

ss[

47c

F4(r) = 45, Next, we substitute

-r’)

k4 (r, r’, @,O)ld,cr r, c1oj

G(r’)K,(ru)Zo(r’u)+oq,T(r’)~K,(ru)Z,(r’u) R

+

in terms of repeated Eq. (63), we find

(71)

as

x (r -r’coscr)

Expressing the Bickley function applying the addition theorem,

(70)

expressions

integrals

(r,

of the modified

R,

a,

0)’

Bessel function

CC 1 1 K, (Ru)Z, (ru) du. s u=l n for F,(r)

and F4(r), we express

and

(76) the net radiative

heat

S. T. THYNELL

134

flux as q,r(r) =

-RJ2L,,(R, r)

sci R

+

“’= 0

(1 - w)I~[T(Y’)] + 2

L,,o(r, r’) + a z

G(r)

qpr(r’)L,,,

(r, r’)

r’ dr’.

(77)

I

To eliminate the boundary intensity J2 in Eqs. (69) and (77), we use Eqs. (2b) and (4a) applied to the one-dimensional case for r = R. This yields 1 -tz

nJz = T& + ___(z

Evaluation

q,;,(R).

(78)

of Eq. (77) at r = R and the use of Eq. (78) to eliminate

q;,(R)

yield

~27143 RJ2=(zn

+p2

+

P2

RL,., (R,R) (1 -co)1,[7’(r’)]+~G(r’)

I

L:,(R,r’)+a~~q,~(r’)L:,(R,r’)

r’dr’,

(79)

where

L&CR, r’) = Substitution

RL.,(R r’) (271 + P~RL,.,(R

of Eq. (79) into Eqs. (69) and (77) produces

(80)

RI’

the desirable

result given by

(1 -o)Ih[T(ri)]+zG(r’)

G(r) = c27db2LTn(R,r) +

x [Lo,o(r,r’) + P~L~,~(R, r)L?, UC r')l +~~g,~(r’)~Lo,~~r.r’)-~2~l,o(R,r~L~l(R,r’)l

r’dr’

(81)

1 and

s[i R

qB,(r)= - ~2~~b2L~l(R r>+

r =0

(1 - wN,[T(r’)]

G(r’)

+ z

x LL,(r, r’) - PAL,.,CRrWiYoCRr')l

+~~q,,(~‘)[LI.,(r,r’)-~2LI,,(R,r)L~l(R,r’)l

r’dr’.

(82)

1

To obtain an accurate solution to the coupled integral equations given by Eqs. (81) and (82), it is used to construct an initial estimate to G(r) and qi,(r). is suggested that the P,-approximation” A significantly improved value is expected to both of these quantities if the P, solution is substituted into the right-hand side of Eqs. (81) and (82). The integrals over r’ can be performed analytically.” thereby reducing the number of required numerical integrations in Eqs. (55) and (70) from three to one. Such reduction in the computational effort represents a significant achievement, and it is of particular interest to those workers who analyze the interaction of radiation with other modes of energy transfer. 4.

SUMMARY

A rigorous approach has been implemented to develop expressions for the radiation intensities, incident radiation and the forward and backward radiation heat fluxes in the radial and axial directions, respectively, in absorbing, emitting, linear-anisotropic scattering, two-dimensional

Integral form of the equation of transfer media bounded for the incident

135

by diffusely emitting and diffusely reflecting surfaces. Subsequently, the expressions radiation and the net radiant heat flux in the radial direction have been reduced

to integral equations in axi-symmetric, one-dimensional media. A solution to the formulated integral equations may be constructed by various numerical and semi-analytical means. ~C~~~wZe~ge~e~r-The author is grateful to acknowledge the partial support from the Office of Naval Research under contract No. ~~~4-86-K-~8. REFERENCES I. R. Viskanta. Fortschr. Yer- Tech. 22, 51 (1984). N. D. Sze, JQSRT 16, 763 (1976). S. A. Elwakil, J. Appl. Phys. D: Appl. Phys. 13, 339 (1980). G. Spiga, F. Santarelli, and C. Stramigioli, Int. J. Hent Muss Tran~/kr 23, 841 (1980). M. N. &isik and Y. Yener, J. Heat Transfer 104, 351 (1982). M. M. R. Williams, lM,4 J. Appl. cash. 31, 37 (1983). 7. S. T. Thynell and M. N. &igik, Appl. Phys. 60, 541 (1986). 8. M. G. Smith, Proc. Camb. Phil. Sot. 60, 909 (1964). 9. G. C. Pomraning and C. E. Siewert, JQSRT 28, 503 (1982). 10. S. T. Thynell and M. N. Ozisik, JQSRT 36, 492 (1986). 11. J. D. Lin, JQSRT 37, 591 (1987). 12. M. N. &isik, Radiative Transfer, Wiley, New York, NY (1973). 13. S. T. Thynell and M. N. t)zigik, JQSRT 38, 413 (1987). 14. W. G. Bickley and J. Nayior, Phil. Mug., 7th Ser., No. 20, 343 (1935). 15. W. W. Yuen and L. W. Wong, JQSRT 29, 145 (1983). 16. I. S. Gradshteyn and I. M. Ryzhik, Table oflntegrafs, Series, and Products, p. 979, Academic Press, FL (1980). 2. 3. 4. 5. 6.

NOMENCLATURE a = Linear anisotropic

scattering coefficient c = Half the optical axial length of the enclosure F;(r) = Functions defined in Sec. 3 G(r, z) = Incident radiation G:(r, z) = Components to the incident radiation, Eqs. (17) f(r, z, 0,4) = Radiation intensity &(T) = n2BT4/lr, the Planck function & = Emission from the ith wall I,(X) = Modified Bessel function of the first kind J, (r) = Diffuse intensity of bounding surface at z = -c Jr(z) = Diffuse intensity of bounding surface at r = R J3(r) = Diffuse intensity of bounding surface at z = c K,,(r, r’, CI,u) = Kernels of integral equations, Eq. (26) Kn(x) = Modified Bessel function of the second kind Xi,(x) = Bickley function .L,,,(r, P’) = Kernei for one-dimensional case, Eqs. (68) L,&(R, I’) = Kernel for one-dimensional case, Eq. (80) n = Index of refraction q#r(r, z) = Net radiation heat flux in r-direction q$ (r, t) = Radiation heat flux in forward ( + ) and backward ( - ) r-direction qez(r, z) = Net radiation heat flux in z-direction qt (r, z) = Radiation heat flux in forward (+) and backward ( -) z-direction P(0) = Scattering phase function r = Optical radial variable r,i = Radius of circle, Eq. (25f) t-2 = Radial distance, Eq. (25e) r&, = Radial distance, Eq. (2%) rfmax= Radial distance, Eq. (25d) rl = Radial distance, Eq. (IOd) r, = Radial distance, Eq. (15). R = Optical radius S(r, z, 8, #) = Source function, Eq. (8) S*(r, r’, GI,z, 2’) = Source function, Eq. (24) %p(r, r’, tl, 2’) = Source function, Eq. (56) f (r, R, rb *) = Distance defined by Eq. (10~) T(r, z) = Temperature

S. T.

THYNEL.~.

T, = Wall temperature : = Optical axial variable Z? = Axial distance, Ey. (I 3) z& = Axial distance, Eq. (2Sa) Greek letters 2,: = Angle, Eq. (Xb), illustrated in Figs. 6 zi = Angle. Eq. (25g). illustrated in Figs. 6 6(s) = Dirac-delta function C,= Emissivity of bounding surface 0 = Polar angle (I= = Forward and backward polar angles. Eqs. (7a) and (7b) Q = Scattering angle # = Azimuth angle 4’ = Forward and backward azimuth angles. Eqs. (7~) and (7d) 6 = Stefan-Boltzmann constant \jJ = Diffuse reflectivity of bounding surface $ = Angle defined in the addition theorem, Eq. (63) (1)-1 Single scattering afbedo