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Quot schemes, Segre invariants, and inflectional loci of scrolls over curves

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Let E be a vector bundle over a smooth curve C , and $$S = {{\mathbb {P}}}E$$ S = P E the associated projective bundle. We describe the inflectional loci… Click to show full abstract

Let E be a vector bundle over a smooth curve C , and $$S = {{\mathbb {P}}}E$$ S = P E the associated projective bundle. We describe the inflectional loci of certain projective models $$\psi :S \dashrightarrow {{\mathbb {P}}}^n$$ ψ : S ⤏ P n in terms of Quot schemes of E . This gives a geometric characterisation of the Segre invariant $$s_1 (E)$$ s 1 ( E ) , which leads to new geometric criteria for semistability and cohomological stability of bundles over C . We also use these ideas to show that for general enough S and $$\psi $$ ψ , the inflectional loci are all of the expected dimension. An auxiliary result, valid for a general subvariety of $${{\mathbb {P}}}^n$$ P n , is that under mild hypotheses, the inflectional loci associated to a projection from a general centre are of the expected dimension.

Keywords: quot schemes; schemes segre; inflectional loci; loci; segre invariants; invariants inflectional

Journal Title: Geometriae Dedicata
Year Published: 2019

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