Lange's conjecture

Template:Short description In algebraic geometry, Lange's conjecture is a theorem about stability of vector bundles over curves, introduced by Template:Ill^[1] and proved by Montserrat Teixidor i Bigas and Barbara Russo in 1999.

Let C be a smooth projective curve of genus greater or equal to 2. For generic vector bundles ${\displaystyle E_1}$ and ${\displaystyle E_2}$ on C of ranks and degrees ${\displaystyle (r_1,d_1)}$ and ${\displaystyle (r_2,d_2)}$, respectively, a generic extension

${\displaystyle 0\to E_1\to E\to E_2\to 0}$

has E stable provided that ${\displaystyle \mu (E_1)<\mu (E_2)}$, where ${\displaystyle \mu (E_i)=d_i/r_i}$ is the slope of the respective bundle. The notion of a generic vector bundle here is a generic point in the moduli space of semistable vector bundles on C, and a generic extension is one that corresponds to a generic point in the vector space ${\displaystyle {\mathrm{Ext}}^1}$${\displaystyle (E_2,E_1)}$.

An original formulation by Lange is that for a pair of integers ${\displaystyle (r_1,d_1)}$ and ${\displaystyle (r_2,d_2)}$ such that ${\displaystyle d_1/r_1<d_2/r_2}$, there exists a short exact sequence as above with E stable. This formulation is equivalent because the existence of a short exact sequence like that is an open condition on E in the moduli space of semistable vector bundles on C.

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