BD algebras (Beilinson–Drinfeld algebras) are algebraic structures which are defined similarly to BV algebras (Batalin–Vilkovisky algebras). The equation defining the BD operator has the same structure as the equation for BV algebras, but the BD operator is increasing with degree +1. We obtain methods of constructing BD algebras in the context of group cohomology
We study the Morava $E$-theory (at a prime $p$) of $BGL_d(F)$, where $F$ is a finite field with $|F|...
We give a simple algebraic recipe for calculating the components of the BV operator Δ on the Hochsch...
A diagram of algebras is a functor valued in a category of associative algebras. I construct an oper...
We give a simple algebraic recipe for calculating the components of the BV operator Δ on the Hochsch...
summary:We shall give a survey of classical examples, together with algebraic methods to deal with t...
We introduce the notion of a BV-operator $\Delta =\lbrace \Delta ^n:V^n\longrightarrow V^{n-1}\rbrac...
In this article, we extend our preceding studies on higher algebraic structures of (co)homology theo...
This is the final version. Many improvements and corrections have been made.To appear in Free Loop S...
AbstractThe Hochschild cohomology ring of any associative algebra, together with the Hochschild homo...
The tensor hierarchy of maximal supergravity in D dimensions is known to be closely related to a Bor...
For a set theoretical solution of the Yang–Baxter equation (X, σ), we define a d.g. bialgebra B = B(...
For almost any compact connected Lie group C and any field F-p, we compute the Batalin-Vilkovisky al...
This paper provides an explicit cofibrant resolution of the operad encoding Batalin-Vilkovisky algeb...
We develop some basic homological theory of hopfological algebra as defined by Khovanov [Hopfologica...
For the bicomplex structure of grading-restricted vertex algebra cohomology defined in \cite{Huang},...
We study the Morava $E$-theory (at a prime $p$) of $BGL_d(F)$, where $F$ is a finite field with $|F|...
We give a simple algebraic recipe for calculating the components of the BV operator Δ on the Hochsch...
A diagram of algebras is a functor valued in a category of associative algebras. I construct an oper...
We give a simple algebraic recipe for calculating the components of the BV operator Δ on the Hochsch...
summary:We shall give a survey of classical examples, together with algebraic methods to deal with t...
We introduce the notion of a BV-operator $\Delta =\lbrace \Delta ^n:V^n\longrightarrow V^{n-1}\rbrac...
In this article, we extend our preceding studies on higher algebraic structures of (co)homology theo...
This is the final version. Many improvements and corrections have been made.To appear in Free Loop S...
AbstractThe Hochschild cohomology ring of any associative algebra, together with the Hochschild homo...
The tensor hierarchy of maximal supergravity in D dimensions is known to be closely related to a Bor...
For a set theoretical solution of the Yang–Baxter equation (X, σ), we define a d.g. bialgebra B = B(...
For almost any compact connected Lie group C and any field F-p, we compute the Batalin-Vilkovisky al...
This paper provides an explicit cofibrant resolution of the operad encoding Batalin-Vilkovisky algeb...
We develop some basic homological theory of hopfological algebra as defined by Khovanov [Hopfologica...
For the bicomplex structure of grading-restricted vertex algebra cohomology defined in \cite{Huang},...
We study the Morava $E$-theory (at a prime $p$) of $BGL_d(F)$, where $F$ is a finite field with $|F|...
We give a simple algebraic recipe for calculating the components of the BV operator Δ on the Hochsch...
A diagram of algebras is a functor valued in a category of associative algebras. I construct an oper...
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