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Recall that a closed subscheme X ⊂ P is non-obstructed if the corresponding point x of the Hilbert scheme
is non-singular. A geometric characterization of non-obstructedness is not known even for smooth space curves. The goal of this work is to prove that subcanonical k-Buchsbaum, k ≤ 2, space curves are non-obstructed. As a main tool we use Serre's correspondence between subcanonical curves and vector bundles.
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