A note on stable toric sheaves of low rank
Abstract
Kaneyama and Klyachko have shown that any torus equivariant vector bundle of rank r over CPn splits if r < n. In particular, any such bundle is not slope stable. In contrast, we provide explicit examples of stable equivariant reflexive sheaves of rank r on any polarised toric variety (X, L), for 2 ≤ r < dim(X) + rank(Pic(X)), and show that the dimension of their singular locus is strictly bounded by n - r.
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