%0 Thesis
%D 2013
%T Semistability and Decorated Bundles
%A Andrea Pustetto
%K Decorated sheaves, semistability, moduli space, Mehta-Ramanathan, maximal destabilizing subsheaf
%X This thesis is devoted to the study of semistability condition of type t=(a,b,c,N) decorated bundles and sheaves in order to better understand and simplify it. We approach the problem in two different ways: on one side we “enclose” the above semistability condition between a stronger semistability condition (\epsilon-semistability) and a weaker one (k-semistability), on the other side we try, and succeed for the case of a = 2, to bound the length of weighted filtrations on which one checks the semistability condition.
%I SISSA
%G en
%U http://hdl.handle.net/1963/7130
%1 7132
%2 Mathematics
%4 1
%# MAT/03 GEOMETRIA
%$ Submitted by Andrea Pustetto (apustett@sissa.it) on 2013-09-25T09:47:01Z
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