Fernando Szechtman
Published 2013-06-18, updated 2013-06-20Version 2
Let $F$ be be an arbitrary field and let $h(n)$ be the Heisenberg algebra of dimension $2n+1$ over $F$. It was shown by Burde that if $F$ has characteristic 0 then the minimum dimension of a faithful $h(n)$-module is $n+2$. We show here that his result remains valid in prime characteristic $p$, as long as $(p,n)\neq (2,1)$. We construct, as well, various families of faithful irreducible $h(n)$-modules if $F$ has prime characteristic, and classify these when $F$ is algebraically closed. Applications to matrix theory are given.
Representations of Lie superalgebras in prime characteristic III
Some conjectures on modular representations of affine $\mathfrak{sl}_2$ and Virasoro algebra
Cohomology of $\frak{q}(2)$ in prime characteristic
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