On dg properads of pre-CY algebras

Abstract

We present new small models for the dg properads that govern pre-CY algebras: one for general pre-CY algebras and one for pre-CY algebras without curvature terms. These small models have only four and, respectively, three generators with valencies ≤ 4 (in contrast to the original properads which have infinitely many generators with arbitrarily large valencies). We prove that the valency upper bound 4 is sharp. We study the cohomology group of the deformation complex of the dg properad governing general pre-CY algebras and prove that it contains the totality Πg≥ 1H(g,1) of cohomology groups of moduli spaces Mg,1 of genus g algebraic curves with one marked point. As an application of this result we prove that the Tradler-Zeinalian properad of V(d)-algebras is not Koszul.

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