Classification of k-Sets in PG(1,25), for k=4,…,13
Abstract
A k-set in the projective line is a set of k projectively distinct points. From the fundamental theorem over the projective line, all 3-sets are projectively equivalent. In this research, the inequivalent k-sets in PG(1,25) have been computed and each k-set classified to its (k-1)-sets where k=5,…,13. Also, the PG(1,25) has been splitting into two distinct 13-sets, equivalent and inequivalent.
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