Spinor modifications of conic bundles and derived categories of 1-nodal Fano threefolds
Abstract
Given a flat conic bundle X/S and an abstract spinor bundle F on X we define a new conic bundle XF/S, called a spinor modification of X, such that the even Clifford algebras of X/S and XF/S are Morita equivalent and the orthogonal complements of Db(S) in Db(X) and Db(XF) are equivalent as well. We demonstrate how the technique of spinor modifications works in the example of conic bundles associated with some nonfactorial 1-nodal prime Fano threefolds. In particular, we construct a categorical absorption of singularities for these Fano threefolds.
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