Endotrivial modules for the general linear Lie superalgebra

Abstract

If g = g0 g1 is a Lie superalgebra over an algebraically closed field k of characteristic 0, the notion of an endotrivial module has recently been extended to g-modules by defining M to be endotrivial if Homk(M,M) kev P as g-supermodules. Here, kev denotes the trivial module concentrated in degree 0 and P is a (U(g), U(g0))-projective supermodule. In the stable module category, these modules form a group under the tensor product. If T(g) denotes the group of endotrivial g-modules, it is interesting and useful to identify this group for a given Lie superalgebra g. In this paper, a classification is given in the case where g = gl(m|n) and it is shown that T(gl(m|n)) k × Z × Z2 and is generated by the one parameter family of one dimensional modules kλ where λ ∈ k, 1(kev), which denotes the first syzygy of kev, and the parity change functor.