We describe relationships between locally singular hyperplanes of the dual polar space DQ ( 2 n , K ) , n ⩾ 2 , and hyperplanes of the half-spin geometries ...

On the hyperplanes of the half-spin geometries and the dual polar spaces DQ(2n, K) · B. Bruyn · Published in Journal of Combinatorial… 1 August 2007 · Mathematics.

We describe relationships between locally singular hyperplanes of the dual polar space DQ(2n,K), n⩾2, and hyperplanes of the half-spin geometries HS(2n−1 ...

We describe relationships between locally singular hyperplanes of the dual polar space DQ(2n,K), n>=2, and hyperplanes of the half-spin geometries HS(2n-1 ...

We describe relationships between locally singular hyperplanes of the dual polar space DQ ( 2 n , K ) , n ⩾ 2 , and hyperplanes of the half-spin geometries ...

On the hyperplanes of the half-spin geometries and the dual polar spaces DQ(2n, K) · B. Bruyn. Mathematics. Journal of Combinatorial Theory. 2007. 2 Citations.

Oct 6, 2006 · Abstract. We characterize the hyperplanes of the dual polar spaces DQ(2n,K) and DQ−(2n + 1,q) which arise.

In[1] Bruyn characterized the hyperplanes of the dual polar spaces DQ (2n,K) and DQ- (2n+1,K). In[2] and[3] he also determined all hyperplanes of DW 2n-. 1,q ...

Let the point-line geometry # = (P , L) be a half-spin geometry of type D n,n . Then, for every embedding of # in the projective space P(V ), where V is a ...

[1] Bart De Bruyn. On the hyperplanes of the half-spin geometries and the dual polar spaces dq(2n, k). J. Comb. Theory Series A, 114(6):979–992,.