Group Extensions and Hall Polynomials

This is the second paper on Hall polynomials for symplectic groups. The definition is analogous to that of Hall polynomials for general linear groups. In both papers we compute the number of all totally isotropic subspaces W of type Ž in a vector space with symplectic geometry V of type denoted g se

The "extensions" of rings and modules has yet to be explored in detail in a research monograph. This book does that and much more, by presenting the state of the art research and also stimulating new and further research. The focus of this study of extensions includes the (quasi-) Baer property, the

Let k be a finite field and assume that ⌳ is a finite dimensional associative Ž . k-algebra with 1. Denote by mod ⌳ the category of all finitely generated right ⌳-modules and by ind ⌳ the full subcategory in which every object is a representa-Ž . tive of the isoclass of an indecomposable right ⌳-mod

We prove that the existence of generic polynomials and generic extensions are equivalent over an infinite field.