The paper concerns two
versions of the notion of real forms of Lie superalgebras. One is the standard
approach, where a real form of a complex Lie superalgebra is a real Lie superalgebra
whose complexification is the original complex Lie superalgebra. The second
arises from considering A-points of a Lie superalgebra over a commutative
complex superalgebra A equipped with superconjugation. The first kind of real
form can be obtained as the set of fixed points of an antilinear involutive
automorphism; the second is related to an automorphism ϕ such that ϕ2 is the
identity on the even part and the negative identity on the odd part. The
generalized notion of real forms is then introduced for complex algebraic
supergroups.
Keywords
Lie superalgebra, complex algebraic supergroups, functor,
real structure, real form
