Manin triples and non-degenerate anti-symmetric bilinear forms on Lie superalgebras in characteristic $2$

TL;DR

This paper extends the theory of Manin triples to Lie superalgebras over fields of characteristic 2, exploring cohomological conditions, Lie bi-superalgebras, and the construction of Manin triples via double extensions.

Contribution

It introduces the concept of Manin triples for Lie superalgebras in characteristic 2 and links them to Lie bi-superalgebras, including methods for constructing them through double extensions.

Findings

Cohomological conditions for Manin triples in characteristic 2

Introduction of Lie bi-superalgebras in this setting

Construction of Manin triples via double extensions

Abstract

In this paper, we introduce and develop the notion of a Manin triple for a Lie superalgebra $\mathfrak g$ defined over a field of characteristic $p=2$. We find cohomological necessary conditions for the pair $(\mathfrak g, \mathfrak g^*)$ to form a Manin triple. We introduce the concept of Lie bi-superalgebras for $p=2$ and establish a link between Manin triples and Lie bi-superalgebras. In particular, we study Manin triples defined by a classical $r$-matrix with an extra condition (called an admissible classical $r$-matrix). A particular case is examined where $\mathfrak g$ has an even invariant non-degenerate bilinear form. In this case, admissible $r$-matrices can be obtained inductively through the process of double extensions. In addition, we introduce the notion of double extensions of Manin triples, and show how to get a new Manin triple from an existing one.