Abstract
In this paper, we give general definitions of non-commutative jets in the local and global situation using square zero extensions and derivations. We study the functors $\operatorname{Exan}_k(A,I)$, where $A$ is any $k$-algebra, and $I$ is any left and right $A$-module and use this to construct affine non-commutative jets. We also study the Kodaira-Spencer class $\operatorname{KS}(\mathcal{L})$ and relate it to the Atiyah class.
Citation
Helge MAAKESTAD. "On jets, extensions and characteristic classes I." J. Gen. Lie Theory Appl. 4 1 - 17, 2010. https://doi.org/10.4303/jglta/G091101
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