Mathematics – Algebraic Geometry
Scientific paper
2010-04-18
Mathematics
Algebraic Geometry
21 pages; v2: A reference corrected in Section 2
Scientific paper
We show that the adjunction counit of a Fourier-Mukai transform $\Phi$ from $D(X_1)$ to $D(X_2)$ arises from a map of the kernels of the corresponding Fourier-Mukai transforms in a very general setting of $X_{1,2}$ being proper separable schemes of finite type over a field. We write down this map of kernels explicitly - facilitating the computation of the twist (the cone of the adjunction counit) of $\Phi$. We also give another description of this map, better suited to computing cones in the case when the kernel of $\Phi$ is a pushforward from a subscheme $D$ of $X_1 \times X_2$. Moreoever, we show that we can replace the condition of properness of the spaces $X_{1,2}$ by that of $D$ being proper over $X_{1,2}$ and still have this description apply as-is. This can be used, for instance, to compute spherical twists on non-proper varieties directly and in full generality.
Anno Rina
Logvinenko Timothy
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