Subbundles of vector bundles on the projective line

## Abstract We review the notions of symplectic and orthogonal vector bundles over curves, and the connection between principal parts and extensions of vector bundles. We give a criterion for a certain extension of rank 2__n__ to be symplectic or orthogonal. We then describe almost all of its rank

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

We propose a new method of classifying vector bundles on projective curves, especially singular ones, according to their "representation type." In particular, we prove that the classification problem of vector bundles, respectively of torsion-free sheaves, on projective curves is always finite, tame

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