Twisted tensor product of dg categories and Kontsevich's Swiss Cheese conjecture
Abstract
Let A be a 1-algebra. The Kontsevich Swiss Cheese conjecture [K2] states that the homotopy category Ho(Act(A)) of actions of 2-algebras on A has a final object and that this object is weakly equivalent to the pair (Hoch(A), A), where Hoch(A) is the Hochschild complex of A. Here the category of actions is the category whose objects are pairs (B,A) which are algebras of the chain Swiss Cheese operad such that the induced action of the little interval operad on the component A coincides with the 1-structure on A. We prove that there is a colored dg operad O with 2 colors, weakly equivalent to the chain Swiss Cheese operad for which the following ``stricter" version of the Kontsevich Swiss Cheese conjecture holds. Denote the two colors of O by a (for the 1-algebra argument) and b (for the 2-algebra argument), denote by E1O the restriction of O to the color a, and by E2O the restriction of O to the color b. Let Alg(O) be the category of dg algebras over O. For a fixed 1-algebra A we also have the the category of action Alg(O)A (equal to Act(A) in case of the Swiss Cheese operad). We prove that there is an equivalence of categories Alg(O)A Alg(E2O)/Hoch(A) We stress that for this particular model of Swiss Cheese operad the statement holds on the chain level, without passage to the homotopy category.
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