Comic blocking sets in Desarguesian projective planes (Q1882447)

A conic blocking set (CBS) \(C\) in a projective plane \(\Pi\) is a set of lines such that any conic of \(\Pi\) meets \(C\). The author constructs examples of concurrent lines which form CBSs. Moreover, in planes of order \(2^n\), examples of irreducible CBSs are constructed (irreducible: \(C\setminus\{l\}\) is not a CBS for all lines \(l\) in \(C\)).