A contour map of the moon

ICARUS 3, 476-485 (1.964)

A Contour Map of the Moon C. L. G O U D A S Mathematics Research Laboratory, Boeing Scientific Research Laboratories, Seattle, Washington Communicated by Z. Kopal Received October 5, 1964 The lunar elevation data provided by Schrutka-Rechtenstamm supplemented by similar data near the limbs provided by Davidson and Brooks, were used to determine the equation of surface of the Moon as a sum of spherical harmonics including terms up to the eighth order. This equation was used to construct a contour map of the Moon. The same work was repeated for data provided by Baldwin which also were supplemented by the same data by Davidson and Brooks. The two maps have some basic similarities. After improving the equation of surface derived from Schrutka-Rechtenstamm's data in such a way that a homogeneous Moon with this equation of surface would also satisfy the conditions, f = 0.633 (Koziel, 1964), ~ = 0.0006267 (Jeffreys, 1959), ~ = 0.0002274 (Jeffreys, 1961), we derive a third contour map which seems to be more realistic than the previous two. a c q u i r e a nonnegligible f o u r t h o r d e r h a r I. INTRODUCTION T h e first c o n t o u r m a p of t h e M o o n was monic. T h e basic a r g u m e n t in this line is t h a t if t h e M o o n was a t r i a x i a l ellipsoid, t h e n c o n s t r u c t e d b y F r a n z (1899) j u s t before t h e t h e c o n t o u r lines a r o u n d Oceanus P r o c e l t u r n of t h e c e n t u r y . H e e m p l o y e d only 55 l a rum, Mare Imbrium, and Mare Serenitatis points, a n u m b e r n o t t o o low w h e n suffiof e l e v a t i o n - 1 . 2 a n d - - 2 . 4 k m s h o u l d n o t c i e n t l y a c c u r a t e , or w h e n e x p e c t a t i o n s are be followed in t h e d i r e c t i o n t o w a r d t h e n o t exceeding t h e possibilities. H e w o r k e d n o r t h e a s t e r n l i m b b y a zero e l e v a t i o n line w i t h linear i n t e r p o l a t i o n b e t w e e n t h e k n o w n b u t b y a n even lower elevation. I t a p p e a r s points, a r a t h e r p o o r t e c h n i q u e for t h e t h a t t h e c e n t r a l bulge of t h e M o o n is folp r e s e n t a n d in this p a r t i c u l a r case. His lowed b y depressions a t a p p r o x i m a t e l y h a l f results a p p e a r , however, v e r y i n t e r e s t i n g for t h e w a y t o w a r d s t h e l i m b s which finally a r e a n u m b e r of reasons. F i r s t , similarities bet w e e n his m a p , t h e m a p p r o d u c e d in 1963 b y succeeded b y h i g h l a n d s o n l y in t h e d i r e c t i o n B a l d w i n , a n d t h e m a p p r e s e n t e d here on of, a p p r o x i m a t e l y , t h e n o r t h l u n a r pole a n d the east-west diameter. The southern hemit h e basis of B a l d w i n ' s d a t a , are obvious a n d sphere does n o t fit c o m p l e t e l y in this p a t t e r n m a n y . I t shows, in c o n f o r m i t y w i t h t h e and, as we shall see later, this is so for t h e l a t t e r t w o m a p s , t h a t p a r t of M a r e T r a n c o n t o u r m a p give~ b y B a l d w i n . T h e reason quillitatis, M a r e Serenitatis, M a r e I m b r i u m , p a r t of M a r e Frigoris, a n d Oceanus Procel- is t h a t t h e l u n a r figure possesses a t h i r d ] a r u m are below t h e m e a n l u n a r level. Sec- o r d e r zonal h a r m o n i c , i.e., a p e a r - s h a p e d c o m p o n e n t , which results in a n a s y m m e t r y ond, t h e T e r r a e of t h e s o u t h e r n h e m i s p h e r e between the northern and southern hemiare highlands. F i n a l l y , a careful s t u d y of this spheres. B y a n a r g u m e n t of a n a l o g y to t h e m a p leads easily t o t h e conclusion t h a t if t h e E a r t h ' s s i m i l a r h a r m o n i c , K a u l a (1963) h a s far side of t h e M o o n is s y m m e t r i c a l to t h e d e d u c e d t h a t this a s y m m e t r y results in a n e a r one, a n a s s u m p t i o n v e r y p r o b a b l y true, t h e n t h e l u n a r figure, as well as p o t e n t i a l , term 476

A CONTOUR

K3o((;M'/R) (ro/R)~T~o,

MAP

(1)

in the gravity field of the Moon, where G is the Gaussian constant, r0 and M ' the mean radius and mass of the Moon, R the selenocentric distance of the attracted body, and T30 the third order Legendre polynomial. Kaula has estimated that the order of magnitude of K30 is 4-9.3 X 10-5. The present author (Goudas, 1964b) has given K.~0 = - 8 . 6 3 X 10 5,

(2)

and the agreement, if not accidental, is satisfactory. The solid harmonic (1) is the result of the surface harmonic,

j3oroT3o,

(3)

and it is shown (Goudas, 1964c) that j30 = ~K30.

(4)

The "pear-shape" term in the lunar figure partly conceals, therefore, the existence of an even larger fourth order harmonic, a fact difficult to ascertain without a harmonic analysis of hypsometric data. Once such an analysis is made, mere inspection of Franz's map verifies the fact. We shall see that this is also true for the maps by Baldwin and Schrutka-Rechtenstamm. The map by Ritter (1934) was the next to appear. Measurements of elevations were made by him on the basis of the terminator technique which has not received a final qualification even today. Hopmann (1964) proposes to apply this technique somewhat differently and avoid the inaccuracies due to the vagueness of the curve of the terminator. Ritter's results seem to have large systematic errors due exactly to this reason, and his map does not seem to be accurate or useful. Schrutka-Rechtenstamm and Hopmann (1958) published a map based on the 150 points measured initially by Franz (1901) and subsequently remeasured by SchrutkaRechtenstamm (1958). The mean error in the latter measurement is about 1.23 km and the bulge deduced from them is about 3 km according to Schrutka, the assumption being that the Moon is a triaxial ellipsoid. Approximately the same size of bulge was deduced from the same data by this author (Goudas, 1963) but without this assumption.

OF THE

MOON

477

The current values of f and ~ of the Moon are decisively against this large ellipsoidal value of the bulge which is overestimated for reasons explained by this author (1964c). Fortunately enough the map by SchrutkaRechtenstamm and Hopmann is not based on this assumption and in spite of the large mean error, it represents a considerable improvement over the map by Franz. The optical impression one has from the telescopic view of the Moon has been completely disregarded by Franz and Schrutka and Hopmann in the compilation of their maps which, therefore, are the presentation of unbiased measurements. Thus, according to the map by Schrutka-Rechenstamm and Hopmann, Mare Nubium, part of the Oceanus Procellarum, part of Mare Imbrium, part of Mare Tranquilitatis, Mare Vaporum, and Sinae Medii and Aestuum are above the mean lunar level, in contradiction to the general expectation that Maria must in general be below mean level. As will later be pointed out, the harmonic analysis of the figure of the Moon has shown that this result can very well be true. The frame of "standard coordinates" and the principal axes of inertia should coincide and a "balanced" contour map of the Moon must always satisfy this requirement. The possible inhomogeneity of the Moon makes it difficult to decide whether a map satisfies this requirement or not. In case the density depends only on the distance from the center or if the Moon is nearly homogeneous, the above condition is satisfied if the mass over the mean lunar level is centered around the E a r t h Moon line or the 0~ axis. The same must be approximately true for the low lands or the depression areas. This argument can be reciprocated and used as a criterion in consideration of the density distribution of the Moon. For example, if it is assumed that the map of Schrutka and Hopmann is correct, it can be concluded that either the lunar density depends only on the distance from the center or that the Moon is approximately homogeneous. From this point of view the contour map by Franz seems slightly off balance. The contour map by Baldwin (1963) was based on more points (696) measured from five Lick plates. A harmonic analysis of the

478

c . L . GOUDAS

lunar figure based on these measurements has verified the conclusions of Baldwin in connection with the bulge. In addition, the equation of surface obtained from the same analysis made possible the construction of a contour m a p which is similar to the m a p b y Baldwin but not in minute details. This, of course, is expected since we have employed harmonics up to the eighth order only and thus the details of the elevation data derived from plate measurements were smoothed out leavi~g the general underlying pattern of the contour map. Most of the conclusions drawn by Baldwin in connection with his contour m a p have in this way been independently verified. We shall further discuss this m a p later on. In the meantime it should be mentioned that the elevation data b y Baldwin have received some criticism by H o p m a n n (1964) and the present author (Goudas, 1964c) on different grounds. H o p m a n n has announced t h a t the results of measurement of the same 18 formations made by Baldwin (1963), by S c h r u t k a - R e c h t e n s t a m m (1958, 1964) and by the A r m y M a p Service (Marchant, 1960; Breece et al., 1964) are very poorly correlated. According to the same author the best measurements at present are those of the A r m y M a p Service followed in the second place b y the measurements by Schrutka-Rechtenstamm. Finally, in last place come the data b y Baldwin. I t must be pointed out, however, t h a t the nonexistence of strong correlations between measurements of the same quantities cannot decide indisputably which measurements are the best. Nevertheless, the present author (Goudas, 1964c) has concluded t h a t the measurements b y Schrutka-Rechtens t a m m (1958) are more accurate in comparison to the measurements by Baldwin (1963) and in this respect he is in agreement with the opinion of Hopmann. The basis of this comparison is much stronger and the conclusion definitive when established. A set of absolute high measurements, as a whole, must be compatible with the measurements of, f, ~, (~nd "y obtained from librations. On the assumption t h a t the Moon is nearly homogeneous or t h a t its density varies but only with the distance from its center and not with the direction, it is found t h a t Schrutka's measurements are compatible with the correct

values of f, 5, and ~,. I t has also been shown that Baldwin's measurements lead to a negative value for the mechanical ellipticity f, and to unacceptable values for ~ and ~,. The data derived by the A r m y M a p Service and by S c h r u t k a - R e c h t e n s t a m m (1964) were not available to the author at the time of this publication and so he cannot agree or disagree with H o p m a n n in connection with the accuracy of these data. It is hoped t h a t the results of their harmonic analysis will be published in the near future. The contour m a p of the A r m y M a p Service (Breece et al., 1964) is based on 256 points evenly distributed over the visible face of the Moon. The average probable error in the elevations is given to be about 858 meters, which is about the same as the average errors in the data of Baldwin but definitely smaller than Schrutka's average error. Although it is impossible to assess the real value of this set of measurements and, therefore, of the corresponding hypsometric m a p before a harmonic analysis is performed on them, we can say t h a t this m a p has more points in common with the m a p by Schrutka and H o p m a n n than with the m a p b y Baldwin. For example, Mare I m b r i u m is deep everywhere according to Baldwin, it is half below level (nowhere lower than 1 km) and half above level (nowhere more t h a n 1 km) according to Schrutka and H o p m a n n , and finally it is almost everywhere above level with some parts reading the level of 3 km, according to the m a p of the A r m y M a p Service. Another example is Mare N u b i u m which, according to the maps of Schrutka and H o p m a n n and the A r m y M a p Service, is above level, and according to Baldwin's map, is below level. II. A TECHNIQUE FOR CONSTRUCTION OF CONTOUR MAPS

As is pointed out b y H o p m a n n (1964) and others, most of the existing measurements of absolute heights can be very accurate if treated as relative heights between consecutive lunar formation, but it is very doubtful whether they represent accurate relative heights for formations quite apart. For this reason maps based on such measurements are bound to have more value as maps of relative heights with the merit

A CONTOUR

MAP OF THE

t h a t they show with sufficient accuracy the elevation relationships of nearby formations everywhere on the Moon. In other terms, they are locally and everywhere correct within the claimed accuracies. However, they do not give absolute contour lines or hypsometric curves with respect to the center of the Moon. I t must be realized t h a t lunar chartography is clearly divided into "relative" and "absolute" and the two are different in substance and in purpose. For instance, the m a p b y Baldwin can be regarded as a good example of a m a p of relative contours so long as we do not try to correlate distant formations. The contour m a p by Schrutka and H o p m a n n is more like, but not exactly, one of the second kind. Maps of absolute contours must satisfy additional necessary conditions which those of relative contours do not need to satisfy. This is exactly the basis on which improved absolute contour maps can be derived from data which nearly, but not exactly, satisfy these necessary conditions. If the data do not satisfy them even approximately, then they m u s t be rejected. In this article it will be shown how this can be done in theory and how it was applied in the case of the data by Schrutka-Rechtenstamm. At first we determine with the aid of elevation data the equation of surface of the Moon in the form of a sum of spherical harmonics. I t is best if we include in this equation sufficient terms so as to make the mean squared error of the least squares fit smaller than the mean squared error of the observations. This m a y perhaps imply the inclusion of harmonics up to the 10th order or even higher. Second, it is necessary to make some assumption about the other side of the Moon. Two assumptions have been tested in connection with this. First, it was assumed that the lunar surface is symmetrical with respect to the plane 0~'~ of the standard frame of reference and, second, t h a t it is symmetrical with respect to the origin of the standard frame. The values of J20 and J22 obtained from a least square fit of the data and based separately on each one of these two assumptions were compared afterwards with the expected values of J20 and J22 of the Moon as these are computed with the aid of the current values off, ~, and

479

MOON

% As a result of this comparison the second assumption was rejected because it led to values for J20 and J2~ far worse t h a n those found by means of the first assumption about the far lunar side. In detail it was found t h a t for the elevation data by Schrutka and for the first assumption the values of ,120 and J22 were J20 = - 0 . 1 0 ,

J22 = 0.31,

(5)

whereas for the same data and for the second assumption they were J20 = 0.23,

J22 = 0.46.

(6)

The data by Baldwin for the same two assumptions gave, respectively, J~0 = 0.94,

J22 = - 0 . 0 3 0 ,

(7)

J20 = 0.98,

J22 = - 0 . 0 2 7 .

(8)

and,

The expected values (Goudas, 1964c) are J20 = - 0 . 5 9 ,

J22 = 0.067,

(9)

and it becomes clear t h a t the second assumption is worse than the first, because for both sets of data it led to larger deviations in the results from their expected values. A second conclusion is, of course, now inevitable. After this discussion it becomes obvious that the values of the harmonic coefficients depend on the assumption adopted for the far lunar side. For example, the values (8) were improved in the right direction b y the adoption of the assumption t h a t the lunar surface is symmetrical with respect to the plane 0 ~ although this i m p r o v e m e n t is very insufficient. The same change of assumption in the case of Schrutka's data led to an improvement far more substantial and resulted in values which can be considered completely satisfactory if one takes into consideration the estimated uncertainties due to errors in the data. But undoubtedly it m a y be possible to make an even better assumption t h a t will approximate more the correct values (9) of the harmonics. Such an assumption can be, e.g., a combination of the two assumptions already described. Once the equation of surface is available and the values of J20 and J22 are found to be different from those expected, we put in

480

c . L . GOUDAS

their position the values given by Eq. (9). This is important because in this way we shall derive a contour m a p which will be compatible with the otherwise known values of f, B, and % In more detail, this equation

of surface and hence the contour map produced from it will have the same moments of inertia as the real Moon and also the same kinetic behavior in relation to librations. After this we proceed as follows: The equation of surface is,

r(~,l) = r o l l +

~ (jijcosjl i = 1 j=O

+

. ~, ~j(~) ] , 3, ij sin 3l)'l

(10)

where r0 in this ease is the mean lunar radius adopted in the derivation of the elevation data plus the value J00. We introduce the notation

f([3,1) =ro ~ 2 (j,icosjl i~1 j=0

+ j'~j sin

jl) 7',j(~3)

= ~ 2 (Jijcosjl i=1 j=O

+ d'~jsinjl)T~j(~);

in Fig. 1 was derived. The terminating points of each horizontal line represent to an accuracy of one part in one thousand the zeros of the functionf(~,l) - k with t~ = constant, k = constant, in the interval - r / 2 ~< l ~< rr/2. If we connect the terminating points by a continuous line, we have an isolevel contour of elevation k kilometers. The contours in Fig. 1 correspond, for example, to k = 0 k m and are based on Schrutka's (1958) data. If we now give different values to It, we shall obtain contours of different elevations which, if put in the same diagram, will represent a complete contour map. This way of compiling a contour m a p seems to be very effective and for the time being sufficiently accurate, since the error in the derived contours is always less than a few meters and never more than 10. The second way by which the contours of equal elevation can be traced numerically has already been described by this author (Goudas, 1963). A remark to be added here is t h a t the values of J2o and J22 should be replaced by their correct ones in case the harmonic analysis did not produce the expected values. Also, it was realized from experience t h a t instead of using the formulas

(11)

Of

f(~,l)

0~ =

gives in kilometers the elevation above or below the new mean level. An isolevel contour is any curve satisfying the equation f(3,1) -- k (constant).

(12)

For --~-/2 ( ~ ~< 7r/2, -~-/2 <~ l <~ ~/2, there is a finite number of curves satisfying Eq. (12). There are a number of ways one can compute these curves numerically. We have used two such methods. The first one was applied on an analog computer at Cambridge Research Laboratories, Bedford, Massachusetts. The value of f(¢,l)- k was first evaluated in the computer for a fixed value of B. Then the sign of this quantity was tested and the pen of a plotter following the variation of 1 from --7r/2 to +1r/2, printed a straight line on the paper whenever the sign was negative and raised whenever it was positive. The same was repeated for all values of ~ from - 7 r / 2 to +7r/2 always keeping k constant. In this way a pattern like the one shown

f(l + 51,~) -.f(1,~) 5l

4S = .f(13 + ~ ) - f ( 1 , ~ )

,

(13)

,

(14)

in computing the derivatives of f(¢~,/) it, is better to use the formulas, J ( - - J o sin jl

O~. = i=1

j=0

+ ,l'ij cosjl) Tij(~),

(15)

(Of= J i i e °~s j l O ~ i=1 j=o d + J'~.j sin j/) ~

Tij(2)

= ~ ~(Jijcosjl+Jlijsinjl) i=1

j=0

[Ti,/+I(B) - j which are exact.

tan /3 Tij(~)],

(16)

481

A CONTOUR MAP OF THE MOON

-80 ° -70 ° _ 60

°

50 °

50 °

.50 •

.40 °

-30~ -20 °

- 20"

EAST

-0° WEST

-0 -)0°I -10'

-

7 -80

0

~

70° - ~0°

FtG. 1. Zero elevation contours. The evaluation of the r.h.s, of formulas (15) and (16) is also easier from the programming point of view because it does not imply recomputation of the same functions for three different pairs (~,l) as in the case of formulas (13) and (14), but only for one pair. The term Ti.:+1(/3) appearing in formula (13) does not produce additional difficulty because the expressions of Tij(B) are already computed up to the term Tn~(/3) and the t e r m T~.,,+I(~) is equal to zero. Finally, the step of a d v a n c e m e n t along the same contour suggested in an earlier publication [Goudas, 1963, Eq. (66)] was found to be in certain cases too large or too small and it had to be varied according to circumstances. III. A

CONTOUR M A P FROM ~CHRUTKA~S D A T A

Both techniques described in the previous section were applied in order to reproduce the contour maps derived b y SchrutkaR e c h t e n s t a m m and Hopmann, and Baldwin, using the d a t a employed b y the above authors. No effort was made to m a k e the results from the harmonic analysis of each set of data compatible with the most recent values of the mechanical ellipticity and the

other two relations among the moments of inertia of the Moon. First, the data by Schrutka-Rechtens t a m m (1958) were treated, putting n = 6 in Eq. (11). The contour maps obtained from both techniques were virtually identical and are presented in Fig. 2. The same work was then repeated for n = 8. The contours obtained in this case were superimposed on a mosaic photograph of the Moon kindly provided by Mr. Robert Carder of A C I C (USAF), and the result is given in Fig. 3. According to this m a p the deepest part of the near lunar side is the northeastern portion of Oceanus Procellarum, which is about 4 k m below the 1738.0 k m mean sphere. Almost all of Oceanus Procellarum is below level and so is Mare Serenitatis and Imbrium. The last two seas are not more than 2 kin below level. The area of Mare N u b i u m is also below level but not deeper than 1 km. Mare Huinorum is about on the level. On the western hemisphere the deepest part is between Rheita Valley and crater Biela with elevation --3 kin. Mare Foecunditatis is at elevation - 2 k m and Mare Tranquilitatis and Serenitatis between 0 and - 2 km. The region of highest elevation is, according to this contour map, at

NORTH

t\/xtY-q~. "//IIII l/J t\t\h-?~

~ X Il ll i/X

SOUTH

Fro. 2. Contour map of ~he Moon based on the harmonic analysis of Sehrutka's (1958) elevation data. (Six surface hm'moni~,s are used.)

FIa. 3. Contour map of the Moon based on the harmonic analysis of Schrutka's (1958) elevation dat,a. (Eight surface harmonics are u ~ d . ) 482

A C O N T O U R M A P OF T H E

:Sinus Aestuum, which is about 3 km above level. The whole part of the peninsula of Terrae extending from the south pole to about 30 ° positive latitude as well as some portions of the neighboring Maria are above level. The area between the south pole and crater Lilius is higher than 1 km and so is a small area near the north pole and crater Meton. The last two high elevation regions together with the central bulge constitute the basis for the existence of a fourth zonal harmonic J40T40(/3) in the equation of surface / 4 and K4o(r(~/R)T4o(#) in the gravity field of the Moon, where K4o = J4o/3ro. A study of the variation of altitudes along the equator shows again the reasons why fourth order tesserM harmonics should also exist. IV. A CONTOUR MAP FROM BALDWIN'S

DATA

The same procedure was followed in the case of Baldwin's data. In Fig. 4 we give the contour map obtained by taking n = 6. In Fig. 5 we give the contour lines obtained

483

MOON

in the same way and by taking n = 8 superimposed on another copy of the same mosaic photograph used for Fig. 3. The transition from n = 6 to n = 8 does not seem to have any substantial effect on the pattern of the contours other than changing their elevation. This is due to the faster convergence of the coefficients of the harmonics with increasing n in the present case rather than in the case of Schrutka's data. The contour map in Fig. 5 seems to be a smoothed-out version of the map compiled by Baldwin where the smoothing came as a result of the harmonic analysis. The description of Baldwin's map with only small changes can therefore describe sufficiently well this map also. Inclusion of more terms in the harmonic expansion would result in a more detailed map but the author is convinced that a map of absolute contours cannot be reliable to minute details on the basis of accuracies accessible today in elevation measurements. From this point of view we can appreciate more the map presented by Scbrutka and Hopmann.

NORTH

j,o// /

i lh \I

,

I/IL

SOUTH

FIG. 4. Contour map of the Moon based on the harmonic analysis of Baldwin's (1963) elevation data. (Six surface harmonics are used.)

FIG. 5. Contour map of the Moon based on tile harmonic analysis of Baldwin's (1963) elevation data. (Eight surface harmonics are used.)

FIG. 6. Contour map of the Moon based on the "most probable" surface harmonics. 484

A CONTOUR MAP OF THE MOON

V. A BALANCED CONTOUR MAP

The equation of surface of the Moon obtained from an analysis of Schrutka's data (1958) was shown (Goudas, 1964c) to be in agreement: with the observed values of f, fl, and "t and as a consequence it is accepted as best representing the first eight harmonics of the lunar figure at present. The values of f, ~, and 7 depend, however, on the two coefficients of the second zonal and sectorial harmonics and to a second order on the rest of the harmonic coefficients. As a result the compatibility of the data by Schrutka with the values of f, ~, and y rests upon a comparison between the two known coefficients with their corresponding values as given by the harmonic analysis. The rest of the coefficients obtained from the same analysis cannot be qualified since no previous knowledge about their size is available and we accept them as the best until improved values from the data provided by the Army Map Service and Schrutka-Rechtenstamm will be obtained. The contour map derived by applying the technique described in a previous section and employing the harmonics from Schrutka's data, is shown in Fig. 6. The difference between this map and the one given in Fig. 3, where the second zonal and sectorial harmonics do not have their correct coefficients, does not seem to be extremely large. The main merit of this contour map is that it represents a Moon with exactly the same values of f, ~, and "t as are determined from librations and so gives a dynamically balanced body unlike any contour map hitherto published. REFERENCES B.*.bDW1N, R. B. (1963). "Measure of the Moon." Univ. of Chicago Press, Chicago, Illinois. BALDWIN, 1~. B. (1964). Comments on the paper by C. L. Goudas, "Development of the Lunar Topography into Spherical Harmonics." Icarus 3, 166.

485

BREECE, S., HARDY, M., AND MARCHA~-T, M. Q. (1964). Horizontal and vertical control for lunar mapping (Part II: AMS Selenodetic Control System 1964). Army Map Service, Tech. Rept. No. 29. FRANZ, J. (1899). Die Figur des Mondes. Astron. Beobachtungen KSnigsberg, 38. FRA~Z, J. (1901). Ortsbestimmung yon 150 Mondkratern. Mitt. Stert~w. Breslau 1. GOUDAS, C. L. (1963). Development of the lunar topography into spherical harmoni(.s. Icar~ls 2, 423-439. GOUDAS, C. L. (1964a). The fi~u:'~' of the Moon. Icarus 3, 168. GOUDAS, C. L. (1964b). Note on the gravitational field of the Moon. Icarus 3, 273-276. GOUDAS, C. L. (1964c). Moments of inertia and gravity fiekl of the Moon. Icar~s 3, 375-409 (1964). HOPMANN, J. (1964), Communication to Commission 17 (Figure and Motion of the Moon) of Intern. Astron. Union, Hamburg. JEFFREYS, H. (1959). "The Earth," 4th ed., pp. 145-168. Cambridge Univ. Press, Cambridge, England. JEFFREYS, H. (1961). Mo,~thly Notices Roy. Astron. Soc. 12.9, 421-432. KAVLA, W. M. (1963). "Calculation of Perturbation of Lunar Orbiters." U. S. Govt. Memorandunl.

KOZIEL, K. (1964). Agenda and draft reports. Intern. Astron. Union, 12th General Assembly, Hamburg. MARC~IANT, M. Q. (1960). Horizontal and vertical control for lunar mapping (Part I: Methods). Army Mapping Service, Tech. Rept. No. 29. RITT~R, H. (1934). Versuch einer Bestimmung yon Schichtlinien auf dem Monde. Astron. Naet, r.

~52, 157. SCI-IRUTKA-RECHTENSTAMM, G. (1958). Neureduktion der 150 Mondpunkte der Breslauer Messungen yon J. Franz. Oesterr. Akad. Wiss. Math.-Naturw. K1. Sitzber., AbL 11 167 (Nos. 1-4). SCHRUTKA-RECHTENSTAMM, G. (1964). Private communication. SCHRUTKA-RECHTENSTAMM, G., .~ND HOPMANN, J. (1958). Die Figur des Mondes. Oesterr. Akad. Wiss. Math.-Naturw. Kl. Sitzber., Abt. I1 167 (Nos. 8-10).