On the Grauert–Riemenschneider Vanishing Theorem

Ž n . 3 We consider compactifications of P R j ⌬ , the space of triples of distinct i j points in projective space. One such space is a singular variety of configurations of points and lines; another is the smooth compactification of Fulton and MacPherson; and a third is the triangle space of Schube

In this note we prove that a finite group is almost solvable if every irreducible Ž character is induced from a character of degree at most 4 more precisely, such a Ž . Ž . .

Generalizing a theorem by J. E. Olson determining the Davenport's constant of a finite abelian p-group A, we prove that if S 1 , . . . , S k are given sets of integers satisfying suitable conditions and if g 1 , . . . , g k ʦ A, then a nontrivial vanishing sum of the form s 1 g 1 ϩ и и и ϩ s k g k ,

The well-known Cartan-Jacobson theorem claims that the Lie algebra of derivations of a Cayley algebra is central simple if the characteristic is not 2 or 3. In this paper we have studied these two cases, with the following results: if the characteristic is 2, the theorem is also true, but, if the ch