Odd-quadratic Lie superalgebras with a weak filiform module as an odd part

Abstract: The aim of this work is to study a very special family of odd-quadratic Lie superalgebras ${\mathfrak g}={\mathfrak g}{\bar 0}\oplus {\mathfrak g}{\bar 1}$ such that ${\mathfrak g}{\bar 1}$ is a weak filiform ${\mathfrak g}{\bar 0}$-module (weak filiform type). We introduce this concept after having proved that the unique non-zero odd-quadratic Lie superalgebra $({\mathfrak g},B)$ with ${\mathfrak g}{\bar 1}$ a filiform ${\mathfrak g}{\bar 0}$-module is the abelian $2$-dimensional Lie superalgebra ${\mathfrak g}={\mathfrak g}{\bar 0} \oplus {\mathfrak g}{\bar 1}$ such that $\mbox{{\rm dim }}{\mathfrak g}{\bar 0}=\mbox{{\rm dim }}{\mathfrak g}{\bar 1}=1$. Let us note that in this context the role of the center of ${\mathfrak g}$ is crucial. Thus, we obtain an inductive description of odd-quadratic Lie superalgebras of weak filiform type via generalized odd double extensions. Moreover, we obtain the classification, up to isomorphism, for the smallest possible dimensions, that is, six and eight.