Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Computer Science Applications
Reference10 articles.
1. Bichara A., Zanella C.: Tangential Tallini sets in finite Grassmannians of lines. J. Comb. Theory Ser. A 109, 189–202 (2005).
2. Buekenhout F.: Ensembles quadratiques de sespaces projectifs. Math Z. 110, 306–318 (1969).
3. Butler D.K.: A characterisation of the planes meeting a non-singular quadric of $$\text{ PG }(4, q)$$ in a conic. Combinatorica 33, 161–179 (2013).
4. De Clerck F., Hamilton N., O’Keefe C., Penttila T.: Quasi-quadrics and related structures. Aust. J. Comb. 22, 151–166 (2000).
5. de Resmini M.J.: A characterization of the set of lines either tangent to or lying on a nonsingular quadric in $$\text{ PG }(4,q)$$, $$q$$ odd. Finite Geometries. Lecture Notes in Pure and Applied Mathematics, vol. 103, pp. 271–288 (1985).
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