A Geometric Relationship Between Equivalent Spreads
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By Andrè theory, it is well known how to algebraically convert a spread in a projective space to an equivalent spread (representing the same translation plane) in a projective space of different dimension and of different order (corresponding to a subfield of the kernel). The goal of this paper is to establish a geometric connection between any two such equivalent spreads by embedding them as subspaces and subgeometries of an ambient projective spaces. The connection can be viewed as a generalization of a construction due to Hirschfeld and Thas.
[1] Guglielmo Lunardon,et al. Normal Spreads , 1999 .
[2] Johannes André,et al. Über nicht-Desarguessche Ebenen mit transitiver Translationsgruppe , 1954 .
[3] J. Thas,et al. General Galois geometries , 1992 .
[4] A note on line–Baer subspace partitions of PG(3, 4) , 2001 .
[5] Heinz Lüneburg. Translation Planes of Order q2 Admitting SL(2,q) as a Collineation Group , 1980 .