Abstract:
Abstract: Symmetric Balanced Incomplete Block Designs with λ=1 is a common class of BIBDs which are mostly used in
incomplete experimental block design set up because of their simplicity in set up and also in analysis. Over the years since
development of the BIBDs by Yates in the year 1939. A number of research has been done on the design to establish properties of
the design and also to determine the construction methods of the design. In terms of properties, the studies have only been able to
establish necessary but not sufficient not sufficient conditions for the existence of the design. For the symmetric BIBDs the studies
have also determined the non-existence properties for such designs. However, the sufficient existence property for the design have
not been established. In terms of construction, the studies have been able to derive several construction methods for BIBDs.
However, these methods have been determined not to be adequate in constructing all the BIBDs which still leave the existence of
some BIBDs as unknown. For symmetric BIBDs with λ=1 which are also known as projective planes, the studies have not been
able to establish the sufficient properties for existence of this class of BIBDs just like the other classes of symmetric BIBDs.
Therefore, this give room for investigating other properties of this class of BIBDs. The present study therefore, aimed at deriving
the properties of the design from the known properties of BIBDs and also using the properties to determine the construction
technique that would be suitable used in constructing this class of BIBDs. The study used the known properties of symmetric
BIBDs to derive new properties of symmetric BIBDs, then restricted it to the case of λ=1. Which aided in derivation of new
properties of the design and also the construction method. The study was able to derive three new properties for this class of BIBD
and it was also able to show that the class of BIBD would be best constructed using PG(2,S).
Keywords: Symmetric BIBD, Projection Geometry, Perfect Odd Square, Galos Field
