β Scribed by P. Fjelstad
No coin nor oath required. For personal study only.
π SIMILAR VOLUMES
## A very practical application of Bayea's theorem, for the analysis of binomial random variables, ia presented. Previous papers (WALT=, 1985; WALTEBS, 19868) have already demonstrated the reliability of the technique for one, or two random variables, and the extension of the approach t o several
Ε½ n . 3 We consider compactifications of P R j β¬ , 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
## Abstract Let ${\cal F}$ be a __k__βuniform hypergraph on __n__ vertices. Suppose that $|F\_{1}\cap \cdots \cap F\_{r}|\ge t$ holds for all $F\_{1},\ldots ,F\_{r}\in {\cal F}$. We prove that the size of ${\cal F}$ is at most ${{n-t}\choose {k-t}}$ if $p= {k \over n}$ satisfies and __n__ is suffi