Enumerating inherited conics in André planes of odd order

Abstract

The process of deriving the Desarguesian plane PG(2,q2) to get the Hall plane is well known, and the problem of when a conic in PG(2,q2) inherits to an arc in the Hall plane has been solved. In this article we look at the generalisation of replacing an André net of PG(2,qt), t≥ 3 to construct an André plane of order qt. This article looks at the case where q is odd and t is prime, and determines when a conic in PG(2,qt) inherits to an arc in an André plane. Further, the number of arcs in an André plane that are inherited in this way is enumerated.