Leavitt path algebras, B∞-algebras and Keller's conjecture for singular Hochschild cohomology

Abstract

For a finite quiver without sinks, we establish an isomorphism in the homotopy category Ho(B∞) of B∞-algebras between the Hochschild cochain complex of the Leavitt path algebra L and the singular Hochschild cochain complex of the corresponding radical square zero algebra . Combining this isomorphism with a description of the dg singularity category of in terms of the dg perfect derived category of L, we verify Keller's conjecture for the singular Hochschild cohomology of . More precisely, we prove that there is an isomorphism in Ho(B∞) between the singular Hochschild cochain complex of and the Hochschild cochain complex of the dg singularity category of . One ingredient of the proof is the following duality theorem on B∞-algebras: for any B∞-algebra, there is a natural B∞-isomorphism between its opposite B∞-algebra and its transpose B∞-algebra. We prove that Keller's conjecture is invariant under one-point (co)extensions and singular equivalences with levels. Consequently, Keller's conjecture holds for those algebras obtained inductively from by one-point (co)extensions and singular equivalences with levels. These algebras include all finite dimensional gentle algebras.