«6-
According to the theory, this interpolation can be expected to give
better results than any other method, if the data has indeed the character of a
stationary random function and if the proper correlation function is used.
To qualify as a stationary random function, one requirement is that the
systematic trend in the data must be eliminated by reducing the heights to a
suitable reference surface. This surface is accordingly called a trend surface.
Such a surface can be computed in advance. Kraus [45], [47] suggests to use for
this a low-degree polynomial surface. Alternatively, a trend surface can be
computed simultaneously with the interpolation. Hardy [32] does this by adding a
polynomial of low degree to the left side of eq. (3). Lauer [52] and Chiles and
Deiner [23] also add a linear sum of functions but do not specify the individual
unctions.
These analytic functions will seldom be flexible enough to eliminate the
systematic trend in extensive areas. A better trend surface can be obtained by a
preliminary interpolation which produces an appreciable amount of smoothing. A
moving surface method has been used for this purpose by Koch [42] and by Schut [9].
Arthur [13] was the first to publish a method of this type. Having
initially used a distance function
f3l-2 (4a)
which proved in many cases to give a singular matrix B, he later [14] changed to a
Gaussian curve
f * exp(-ar?) (4b)
in which 222.5 and, as before, » is the ratio between the distance under consider-
ation and a fixed distance for which he chose the average distance between
reference points.
Kraus, first in 1970 [44] and in several following publications, also
makes use of a Gaussian curve. The coefficient a is here computed to make this
curve agree as well as possible with the values of the correlation function
computed according to the theory from the reference heights. Smoothing becomes
possible by replacing the value of the curve at r-0 by a larger value. This
formulation is used in the Stuttgart Contour Program, described by Stanger [68].
Assmus [15] documents an extension of this program in which breaklines are dealt
with very satisfactorily by specifying that the value of the correlation function
is zero for any two points separated by a breakline.
Lauer [52] describes the use in his dissertation of a distance function
which can be written in the form
= by.
f = exp(-ar’); a0 (4c)
and concludes from experiments that »=1.2 is an optimum value. Koch [43] and
Fuchs [10-3] make use of the summation of surfaces as well as of a moving surface
method; filtering is possible also. Koch [42] prefers the distance function, due
to Hirvonen,
f = 1/(1+2) (4d)
Lauer, in [53], lists as satisfactory this function and also a weighted average of
this function and 1/(1+r).
Finally, Hardy, first in 1971 [32], makes use of the distance function
f = (d?+C)P (4e)
