Stability of Tautological Bundles on Symmetric Products of Curves
Abstract
We prove that, if C is a smooth projective curve over the complex numbers, and E is a stable vector bundle on C whose slope does not lie in the interval [-1,n-1], then the associated tautological bundle E[n] on the symmetric product C(n) is again stable. Also, if E is semi-stable and its slope does not lie in the interval (-1,n-1), then E[n] is semi-stable.
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