Families of homogeneous vector bundles on P2

## Abstract Let __X__ be a nonsingular curve of genus 2 over an algebraically closed field of characteristic 2. We show that the moduli space of semistable rank two vector bundles with a fixed determinant of even degree on __X__ is isomorphic to the three dimensional projective space. We prove resu

Let A' be a smooth complex projective curve of genus g over an algebraically closed field k of charcteristic 0. In this paper we prove that given two general stable bundles F and G such that ' max {rank G , r a n k F ) 9 -1 there exists an extension (0.1

For a finite group, we define a ring of equivariant vector bundles on finite sets which is an expanded version of the Green ring of representations of the group. We give a new proof of a decomposition of this ring into a direct sum of ideals. We use this decomposition to present Boltje's derivation