On kernel bundles over reducible curves with a node
Abstract
Given a vector bundle on a complex reduced curve and a subspace of which generates , one can consider the kernel of the evaluation map , i.e. the {\it kernel bundle } associated to the pair . Motivated by a well known conjecture of Butler about the semistability of and by the results obtained by several authors when the ambient space is a smooth curve, we investigate the case of a curve with one node. Unexpectedly, we are able to prove results which goes in the opposite direction with respect to what is known in the smooth case. For example, is actually quite never -semistable. Conditions which gives the -semistability of when or when is a line bundle are then given.
Cite
@article{arxiv.1907.09195,
title = {On kernel bundles over reducible curves with a node},
author = {S. Brivio and F. F. Favale},
journal= {arXiv preprint arXiv:1907.09195},
year = {2020}
}
Comments
Some typos corrected. Last version is accepted for publication in "International Journal of Mathematics"