Maximal sets of non-polar points of quadrics and symplectic polarities over GF(2)

Abstract

A cap on a non-singular quadric over GF(2) is a set of points that are pairwise non-polar; equivalently the join of any two of the points is a chord. A non-secant set of the quadric is a set of points off the quadric that are pairwise non-polar; equivalently the join of any two of the points is skew to the quadric. We determine all the maximal caps and all the maximal non-secant sets of all non-singular quadrics over GF(2); and also all the maximal sets of non-polar points for symplectic polarities over GF(2). The classification is in terms of caps of greatest size on elliptic quadrics Q − 8+3 (2), hyperbolic quadrics Q + 8+7 (2) and on quadrics Q 4k+2(2), and of non-secant sets of greatest size of Q − 8+1 (2), Q + 8+5 (2) and Q 4k (2), for all quadrics of these types that occur as sections of the parent quadric or belong to the symplectic polarity. The sets of greatest size for these types of quadrics are larger than for other types. The results have implications about the non-existence of ovoids and the exterior sets of Thas. Only one part of the simple geometric inductive argument extends to larger ground fields.