A counterexample to DG version of Han's conjecture
Abstract
In 2004, Han proposed the following conjecture: let B be a finite-dimensional k-algebra. If HHn(B)≠ 0 for only finitely many n∈ Z, then B is smooth. This conjecture can be generalized to the DG setting: let B be a finite-dimensional DG k-algebra. If HHn(B)≠ 0 for only finitely many n∈ Z, then B is smooth. In this note, we show that the DG generalization of Han's conjecture is false.
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