The non-existence of 3-dimensional locally projective spaces of orders (2, 9)

In this paper it is shown that given a non-degenerate elliptic quadric in the projective space PG(2n -1, q), q odd, then there does not exist a spread of PG(2n -1, q) such that each element of the spread meets the quadric in a maximal totally singular subspace. An immediate consequence is that the c

We prove that there does not exist a tiling with Lee spheres of radius at least 2 in the 3-dimensional Euclidean space. In particular, this result verifies a conjecture of Golomb and Welch for n = 3.

In representation theory of finite groups, there is a well-known and important conjecture due to M. Broue. He has conjectured that, for any prime p, if a finite ǵroup G has an abelian Sylow p-subgroup P, then the principal p-blocks of G and Ž . the normalizer N P of P in G are derived equivalent. Le

The new isostructural compounds, K 2 Gd 2 Sb 2 Se 9 and K 2 La 2 Sb 2 S 9 , were discovered by the molten polychalcogenide salt method. They crystallize in the orthorhombic space group Pbam with a ‫؍‬ 11.4880(3) A s , b ‫؍‬ 17.6612(1) A s , c ‫؍‬ 4.2201(1) A s , and Z ‫؍‬ 2 for K 2 Gd 2 Sb 2 Se 9 an

High Resolution Electron Microscopy (HREM) images of PMN \(\left(\mathrm{PbMg}_{1 / 3} \mathrm{Nb}_{2 / 3} \mathrm{O}_{3}\right)\) taken along a \(\langle 110\rangle\) axis of the cubic (perovskite) structure show that ordered regions of the \(\{111\}\) type exist which correspond to \(A B_{1 / 2}^{