A (conic) blocking semioval is a set of points in a projective plane (containing a conic) that is both a blocking set and a semioval. Recently, Dover, Mellinger, and Wantz constructed two new families of conic blocking semiovals in the Desarguesian projective planes of odd order. One of their examples, say S, arises by considering in PG(2,q2), q odd, a unitary polarity commuting with an orthogonal polarity. In particular, such a conic blocking semioval has [Formula presented]+q2+1 points and is stabilized by a group G isomorphic to PGL(2,q). In this paper, we show that in the same geometric setting there are conic blocking semiovals, having the same size, admitting the same group G, but not isomorphic to S.
Blocking semiovals in PG(2,q2), q odd, admitting PGL(2,q) as an automorphism group / Bartoli, Daniele; Pavese, Francesco. - In: FINITE FIELDS AND THEIR APPLICATIONS. - ISSN 1071-5797. - STAMPA. - 54:(2018), pp. 315-334. [10.1016/j.ffa.2018.08.013]
Blocking semiovals in PG(2,q2), q odd, admitting PGL(2,q) as an automorphism group
Francesco Pavese
2018-01-01
Abstract
A (conic) blocking semioval is a set of points in a projective plane (containing a conic) that is both a blocking set and a semioval. Recently, Dover, Mellinger, and Wantz constructed two new families of conic blocking semiovals in the Desarguesian projective planes of odd order. One of their examples, say S, arises by considering in PG(2,q2), q odd, a unitary polarity commuting with an orthogonal polarity. In particular, such a conic blocking semioval has [Formula presented]+q2+1 points and is stabilized by a group G isomorphic to PGL(2,q). In this paper, we show that in the same geometric setting there are conic blocking semiovals, having the same size, admitting the same group G, but not isomorphic to S.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.