Translation planes of order   admitting collineation groups of order   preserving a parabolic unital

doi:10.1285/i15900932v26n2p105

Translation planes of order $q2$ admitting collineation groups of order $q3u$ preserving a parabolic unital

Vikram Jha, Norman L. Johnson

Abstract

The set of translation planes of order $q2$ that admit collineation groups of order $q3u$ , where u is a prime p-primitive divisor of $q2-1$ , consists of exactly the Desarguesian plane, assuming that the group does not contain a translation subgroup of order a multiple of $q2$ . This applies to show that if the group preserves a parabolic unital then the plane is forced to be Desarguesian.

DOI Code: 10.1285/i15900932v26n2p105

Keywords: Spread; Translation plane; Parabolic unital; Unital group

Classification: 51E23; 51A40

Full Text: PDF

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Note di Matematica

Translation planes of order $q<sup>2</sup>$ admitting collineation groups of order $q<sup>3</sup>u$ preserving a parabolic unital

Abstract

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