Hall Polynomials for Symplectic Groups, II

In the Preamble I shall give a running summary of Sections 1}11 without changing item numbers. For instance Result (3.2) and Remark (3.3) from Section 3 will be reproduced with the same designations. I shall write (P1), 2 , (P11) to indicate that I am summarizing Section 1, 2 , Section 11 of Part I,

The coadjoint orbits for the series B , C , and D are considered in the case when the base point is a multiple of a fundamental weight. A quantization of the big cell is suggested by means of introducing a )-algebra generated by holomorphic coordinate functions. Starting from this algebraic structu

Let A be a finite-dimensional tame quiver algebra over a finite field k. We prove that Hall polynomials exist for A.

The study of asymptotic properties of the conjugacy class of a random element of the finite affine group leads one to define a probability measure on the set of all partitions of all positive integers. Four different probabilistic understandings of this measure are given-three using symmetric functi

We give the Bernstein polynomials for basic matrix entries of irreducible unitary Ž . representations of compact Lie group SU 2 . We also give an application to the Ž . analytic continuation of certain distributions on SU 2 , and finally we briefly describe the Bernstein polynomial for B = B-semi-in

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