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the cameras.dbf for possible future use. In
this way, the system updates its knowledge
just as a human expert does.
Apart from the body of rules contained in the
knowledge base, the primary tool used by the
expert system is the accuracy predictor. The
accuracy predictor is used with cameras.dbf to
modify design parameters until the design
accuracy is met. The accuracy achievable for
different geometry are shown in Table 1 for
Wild P31 (f=100mm oc, = 3 um and 2 um);
Zenzanon etr (f-150mm, c, = 2.4 um) (Chen,
1985) and Zeiss UMK (f-100mm, o, = 2 ym ). The
system assumes a safety factor of 1.2, so that
the design accuracy in this case is #0.092
(+0.11/1.2). It also assumes that more than 12
camera stations will be undesirable.
6. DISCUSSION
The result of a consultation with the expert
system is a detailed recommendation which
describes the equipment and also the initial
network geometry for the data acquisition
phase. Note that the choice of camera is user-
Specified; the system responds by establishing
if that particular camera is suitable for the
specified task. In the case reported, we see
that for the same o, - 2 ym, the P31 requires
5 stations, while the UMK requires only three.
The Zenzanon cannot satisfy the specification.
All these clearly show the importance of
format size.
Associated with each recommendation, we can
develop a cost. Clearly, the cost of a three
station solution is superior to that of a five
station solution in terms of time and amount
of measurements to be performed. The
interesting problem arises when two different
systems yield the same number of camera
stations for a specified objective. By
formalising the cost calculation, we can
resolve this dilemma.
It is interesting to compare equation 4 with
the coarse object point accuracy indicator of
Fraser (1989)
G- = qSo (5)
C
as S = D/f. We find that our PEP is a
formulation of the factor q. Fraser reports
the value of q varies from 0.5-1.0 for the
case of strong geometry (four or more camera
stations). We obtain values of PEF in the
range 0.6-1.2 for four or more stations
(Bammeke, 1992b). We suggest that equation 4
may be taken as a formulation for equation 5.
7. CONCLUSIONS
The criteria for verifying the suitability of
using an expert system approach to solve a
task are outlined in section 2.3. For the
cognitive aspects of network design, it can be
shown that the answer to each of the questions
{a) to (g) in section 2.3 is 'yes'. Further,
we have shown that a suitable knowledge-base
can be constructed using databases,
appropriate rules and the accuracy predictor.
We have constructed a prototype expert system
which can:
(a) recommend an initial configuration for
a task.
(b) ensure the recommended configuration
satisfies the required accuracy level
Further work should be aimed at developing a full
cost model; integrating the expert system with a
simulator; and increasing the reliability of the
knowledge base through enriching the knowledge
content. Finally, the use of the expert system for
real projects should confirm the validity of our
conclusions or otherwise!
REFERENCES
Bammeke, A. A., 1992a. Development of Mathematical
Formulae for Predicting Accuracies of Close-Range
Photogrammetric Networks. Photogrammetric Record
(in press).
Bammeke, A. A., 1992b. Designing and Planning of
Close-Range Photogrammetric Networks: Is an expert
system approach feasible?. Ph.D thesis, Polytechnic
of East London (in preparation).
Chen, L. -C., 1985. A Selection Scheme for Non-
metric Close-Range Photogrammetric Systems. Ph.D
thesis, University of Illinois, 216p.
Fraser, C. S., 1989. Optimization of networks in
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445pp.
Kenefick, J. F., 1971. Ultra-Precise Analytics.
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Martin, J., and Oxman, S., 1988. Building Expert
Systems. Prentice Hall, New Jersey, 455p.
Ripple, W. J., and Ulshoefer, V. S., 1987. Expert
Systems and Spatial Data Models for Efficient
Geographic Data Handling. Photogrammetric
Engineering and Remote Sensing, 53(10): 1431-1433.
Sarjakoski, T., 1986. Potential of Expert-System
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Sarjakoski, T. 1988. Artificial Intelligence in
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Shortis, M. R., and Hall, C. J., 1989. Network
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Australian Journal of Geodesy, Photogrammetry and
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Shortis, M. R., and Fraser, C. S., 1991. Current
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ACKNOWLEDGEMENT
This work has been carried out through the aid of
a Commonwealth Scholarship tenable at the
Polytechnic of East London. We also wish to
acknowledge the advise and assistance of Dr. Peter
Woolliams, Department of Systems and Computing; and
Prof. Peter Dale, Department of Land Surveying of
the Polytechnic of East London.
