Relative Calabi-Yau completions
Abstract
We generalize Keller's construction Kel11 of deformed n-Calabi-Yau completions to the relative context. This gives a construction that extends any given dg functor F : A → B between smooth dg categories to a dg functor F : A → B, together with a family of deformations of (A,B,F) parametrized by relative negative cyclic homology classes η ∈ HNn-2(B, A). We prove that these extensions admit relative n-Calabi-Yau structures in the sense of BD19. In particular, this proof covers the original absolute case of Kel11.
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