On a class of point-reflection geometries

A method is given for showing that an embeddable point᎐line geometry possesses an absolutely universal projective embedding. This method is applied to show that virtually every embeddable Lie incidence geometry possesses an absolutely universal embedding.

Suppose S is an affine, noetherian scheme, X is a separated, noetherian S-scheme, is a coherent X -bimodule, and ⊂ T is a graded ideal. We study the geometry of the functor n of flat families of truncated = T / -point modules of length n + 1. We then use the results of our study to show that if Proj

In this paper, a new class of partially balanced incomple'e block designs is constructed over an association scheme obtained from a finite projective gecmetry. Further, a general mrbt;s&3 for deriving a balanced incomplete block design from another one is given. [Z] RC Bose and T, Shimatnoto, ClasM

We present a class of self-adjoint extensions of the symmetric operator \(\left.-A \mid C_{0}^{\prime}\left(\mathbb{H}^{\prime} \backslash 0\right\}\right)\) which correspond formally to perturbations of the Laplacian by pseudopotentials involving \(\boldsymbol{d}^{2}\). These operators, which provi