The following pages link to (Q4153268):
Displaying 19 items.
- Sets of type \((q+1,n)\) in \(\mathrm{PG}(3,q)\) (Q265601) (← links)
- Sets of type \((q,n)\) in \(\mathrm{PG}(3,q)\) (Q310485) (← links)
- A combinatorial characterization of the Hermitian surface (Q392652) (← links)
- \(d\)-dimensional two-character \(k\)-sets in an affine space \(\mathrm{AG}(r,q)\) (Q793337) (← links)
- On quasi-Hermitian varieties in \(\operatorname{PG}(3, q^2)\) (Q898101) (← links)
- On sets of type \((m,n)_{r - 1}\) in PG\((r,q)\) (Q1024479) (← links)
- On the characterization of subgeometries \(PG(r,\sqrt{q})\) in \(PG(r,q)\) (Q1171761) (← links)
- A combinatorial characterization of quadrics (Q1581005) (← links)
- On sets of type \((m,m+q)_2\) in \(\mathrm{PG}(3,q)\) (Q1685556) (← links)
- Non-existence of sets of type \((0, 1, 2 , n_{d})_{d}\) in \(\mathrm{PG}({r,q})\) with \( 3 \leq d\leq r- 1 \) and \(r\geq 4\) (Q1754398) (← links)
- Sets of type (0,n) in Steiner systems and in finite projective planes (Q1895172) (← links)
- Sets of type \((3,h)\) in \(\mathrm{PG}(3,q)\) (Q1932675) (← links)
- A characterization of the Hermitian variety in finite 3-dimensional projective spaces (Q2256119) (← links)
- In \(\mathrm{AG}(3,q)\) any \(q^2\)-set of class \([0,m,n]_2\) containing a line is a cylinder (Q2410127) (← links)
- On sets of type \((q + 1, n)_{2}\) in finite three-dimensional projective spaces (Q2441418) (← links)
- Three different names of a 15 - set of type (3, 6)<sub>2</sub> in PG(3, 3) (Q5031893) (← links)
- (Q5683867) (← links)
- Sets of type \((q+2,n)\) in \(\mathrm{PG}(3, q)\) (Q6115814) (← links)
- The classification of Boolean degree \(1\) functions in high-dimensional finite vector spaces (Q6658177) (← links)
