On Almost Complete Subsets of a Conic in PG(2,q), Completeness of Normal Rational Curves and Extendability of Reed-Solomon Codes

Abstract

A subset S of a conic C in the projective plane PG(2,q) is called almost complete (AC-subset for short) if it can be extended to a larger arc in PG(2,q) only by the points of C S and by the nucleus of C when q is even. New upper bounds on the smallest size t(q) of an AC-subset are obtained, in particular, align* &t(q)<q(3 q+ q +3)+q3 q+43q q;&t(q)<1.835q q.align* The new bounds are used to increase regions of pairs (N,q) for which it is proved that every normal rational curve in PG(N,q) is a complete (q+1)-arc or, equivalently, that no [q+1,N+1,q-N+1]q generalized doubly-extended Reed-Solomon code can be extended to a [q+2,N+1,q-N+2]q MDS code.