scientific article; zbMATH DE number 3092212
From MaRDI portal
Publication:5830982
zbMath0057.36301MaRDI QIDQ5830982
Publication date: 1954
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Related Items
Tubes of even order and flat \(\pi\). \(C_ 2\) geometries, Metodi di teoria dei gruppi nello studio delle ovali dei piani proiettivi finiti, On a set of lines of \(PG(3,q)\) corresponding to a maximal cap contained in the Klein quadric of \(PG(5,q)\)., A characterization of the sets of internal and external points of a conic, Rings of geometries. II, Regular pseudo-hyperovals and regular pseudo-ovals in even characteristic, An extension of a theorem of G. Tallini, On finite planar functions, their proper shift planes and their derived translation planes, On sets without tangents and exterior sets of a conic, Archi completi di ordine (q+3)/2 nei piani di Galois, S(2,9) con q=3 (mod. 4), Pseudo-ovals in even characteristic and ovoidal Laguerre planes, The lemma of tangents reformulated, Local sharply transitive actions on finite generalized quadrangles, Irreducible collineation groups with two orbits forming an oval, The geometric description of a cyclic \((q- \sqrt{q}+1)\)-arc in \(\text{PG} (q-\sqrt{q}-3,q)\), \(q\) square, Eggs in PG(\(4n-1,q\)), \(q\) even, containing a pseudo-pointed conic, Algebraische Geometrien, Open problems in finite projective spaces, A property of the inverse of a subspace of a finite field, Maximal caps in \(\mathrm{AG}(6,3)\)., Curve razionali normali e \(k\)-archi negli spazi finiti, Sulle \(k\)-calotte di uno spazio lineare finito, Le geometrie di Galois, The packing problem in statistics, coding theory and finite projective spaces, Embedding the complement of an oval in a projective plane of even order, On the largest caps contained in the Klein quadric of \(PG(5,q)\), \(q\) odd, The uniqueness of the 1-system of \(Q^-(7,q)\), \(q\) odd, Nonexistence of complete \((st-t/s)\)-arcs in generalized quadrangles of order \((s,t)\). I, The classification of the largest caps in AG(5, 3)
