Asian Journal of Mathematics

Volume 9 (2005)

Number 4

Maximal Subbundles of Parabolic Vector Bundles

Pages: 497 – 522

DOI: https://dx.doi.org/10.4310/AJM.2005.v9.n4.a4

Authors

Usha N. Bhosle

Indranil Biswas (School of Mathematics, Tata Institute of Fundamental Research, Bombay, India)

Abstract

Let $X$ be a complex irreducible smooth projective curve of genus at least two and $M(r,d)$ a moduli space of stable parabolic vector bundles over $X$ of rank $r$ and degree $d$ with a fixed parabolic structure. For any parabolic bundle $E_*\in M(r,d)$ and a subbundle $F\, \subset\, E$ of rank $r'$ and fixed induced parabolic structure, set $s^{par}(E_*,F_*)\, :=\, dr'-\text{deg}(F)r$, where $F_*$ is $F$ equipped with the induced parabolic structure. If $E_*$ has a subbundle of rank $r'$ with the fixed induced parabolic structure, then let $s^{par}_{r'}(E_*)$ be the minimum of $s^{par}(E_*,F_*)$ taken over all such subbundles $F$. We investigate the strata of $M(r,d)$ defined by values of $s^{par}_{r'}(E_*)$.

Published 1 January 2005