Abstract
In this paper, a description of sets of points of PG(3, q) of type (q + 1, n) with respect to the planes is given.
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Durante N., Napolitano V., Olanda D.: On k-sets of class [1, h] in a planar space. Atti Sem. Mat. Fis. Univ. Modena 50(2), 305–312 (2002)
De Finis, M.: On k-sets in PG(3, q) of type (m, n) with respect to the planes. Ars Combin. 21, 119–136 (1986)
Durante, N., Napolitano, V., Olanda, D.: On quadrics of PG(3, q). Trends in Incidence and Galois Geometries. A Tribute to Giuseppe Tallini. Quaderni di Matematica-Seconda Università di Napoli 50(2), 67–76 (2010)
Durante, N., Olanda, D.F.: On k-sets of type [2, h] in a planar space. Ars Combin. 78, 201–209 (2006)
De Clerck, F., Hamilton, N., O’ Keefe, C. M., Penttila, T.: Quasi-quadrics and related structures. Aust. J. Combin. 22,151–166 (2000)
De Bernardinis, E.: Quasi fibrazioni parziali minimali. PhD Thesis, Università degli Studi dell’Aquila (2015)
Napolitano V.: On sets of type (q + 1, n)2 in finite three-dimensional projective spaces. J. Geom. 104, 557–562 (2013)
Tallini Scafati, M.: Sui k-insiemi di uno spazio di Galois S r,q a due soli caratteri nella dimensione d. Rend. Acc. Naz. Lincei (8) 60, 782–788 (1976)
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This research was partially supported by G.N.S.A.G.A. of INdAM and the Italian Ministry MIUR.
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Durante, N., Napolitano, V. & Olanda, D. Sets of type (q + 1, n) in PG(3, q). J. Geom. 107, 9–18 (2016). https://doi.org/10.1007/s00022-015-0271-5
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DOI: https://doi.org/10.1007/s00022-015-0271-5