Add to ORKG27 pages. All comments are welcome!In this article we prove that there exists an explicit bijection between nice $d$-pre-Calabi-Yau algebras and $d$-double Poisson differential graded algebras, where $d \in \mathbb{Z}$, extending a result proved by N. Iyudu and M. Kontsevich. We also show that this correspondence is functorial in a quite satisfactory way, giving rise to a (partial) functor from the category of $d$-double Poisson dg algebras to the partial category of $d$-pre-Calabi-Yau algebras. Finally, we further generalize it to include double $P_{\infty}$-algebras, as introduced by T. Schedler
We develop the theory of double multiplicative Poisson vertex algebras. These structures, defined at...
We construct and study the generalization of shifted double Poisson algebras to all additive symmetr...
Abstract. A definition of prepoisson algebras is proposed, combining structures of prelie and zinbie...
Fernandez D, Herscovich E. Cyclic A(infinity)-algebras and double Poisson algebras. Journal of Nonco...
Fernandez D, Herscovich E. Double quasi-poisson algebras are Pre-Calabi-Yau. International Mathemati...
In this article, we prove that double quasi-Poisson algebras, which are noncommutative analogues of ...
We give an explicit formula showing how the double Poisson algebra introduced in [14] appears as a p...
peer reviewedIn this article, we prove that double quasi-Poisson algebras, which are noncommutative ...
We give an explicit formula showing how the double Poisson algebra introduced in \cite{VdB} appears ...
We give an explicit formula showing how the double Poisson algebra introduced in \cite{VdB} appears ...
We give an explicit formula showing how the double Poisson algebra introduced in \cite{VdB} appears ...
We prove that the notion of a curved pre-Calabi-Yau algebra is equivalent to the notion of a curved ...
Double Poisson structures (à la Van den Bergh) on commutative algebras are considered. The main resu...
On construit et étudie la généralisation des algèbres double Poisson décalées à toute catégorie mono...
We construct and study the generalization of shifted double Poisson algebras to all additive symmetr...
We develop the theory of double multiplicative Poisson vertex algebras. These structures, defined at...
We construct and study the generalization of shifted double Poisson algebras to all additive symmetr...
Abstract. A definition of prepoisson algebras is proposed, combining structures of prelie and zinbie...
Fernandez D, Herscovich E. Cyclic A(infinity)-algebras and double Poisson algebras. Journal of Nonco...
Fernandez D, Herscovich E. Double quasi-poisson algebras are Pre-Calabi-Yau. International Mathemati...
In this article, we prove that double quasi-Poisson algebras, which are noncommutative analogues of ...
We give an explicit formula showing how the double Poisson algebra introduced in [14] appears as a p...
peer reviewedIn this article, we prove that double quasi-Poisson algebras, which are noncommutative ...
We give an explicit formula showing how the double Poisson algebra introduced in \cite{VdB} appears ...
We give an explicit formula showing how the double Poisson algebra introduced in \cite{VdB} appears ...
We give an explicit formula showing how the double Poisson algebra introduced in \cite{VdB} appears ...
We prove that the notion of a curved pre-Calabi-Yau algebra is equivalent to the notion of a curved ...
Double Poisson structures (à la Van den Bergh) on commutative algebras are considered. The main resu...
On construit et étudie la généralisation des algèbres double Poisson décalées à toute catégorie mono...
We construct and study the generalization of shifted double Poisson algebras to all additive symmetr...
We develop the theory of double multiplicative Poisson vertex algebras. These structures, defined at...
We construct and study the generalization of shifted double Poisson algebras to all additive symmetr...
Abstract. A definition of prepoisson algebras is proposed, combining structures of prelie and zinbie...