Published online by Cambridge University Press: 07 September 2010
Abstract
Let πl∞ be a semifield plane of order qN, with middle nucleus GF(q). Relative to any fixed natural autotopism triangle, every fixed affine point I (not on the triangle) determines up to isomorphism a unique coordinatising semifield DI. I is called a central unit if DI is commutative. We determine the geometric distribution of the central units of πl∞ and hence show that the plane has precisely (qN – l)(q – 1) central units.
Introduction
Let πl∞ be a semifield plane with an autotopism triangle OXY: where XY = l∞ is the translation axis, and OY is a shears axis, with O ∈ πl∞. Now each choice of a “unit point” I, off the chosen autotopism triangle (assumed fixed from now on) determines uniquely up to isomorphism a semifield DI that coordinatises πl∞. We shall call I a central unit relative to the chosen frame if DI is a commutative semifield. By a criterion of Ganley [2] [theorem 3] the finite semifield planes admitting central units are precisely the finite translation planes that admit orthogonal polarities. However, no geometric characterisation of the set of central units in a given semifield plane has ever been recorded. The purpose of this note is to provide a geometric description of the distribution of the central units of a given commutative semifield plane.
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