The integrality of an adapted pair

Abstract

Let a be an algebraic Lie algebra. An adapted pair for a is pair (h,η) consisting of an ad-semisimple element of h ∈ a and a regular element of η ∈ a* satisfying (ad \ h)η=-η. An adapted pair (h,η) is said to satisfy integrality if ad \ h has integer eigenvalues on a. Integrality is shown to hold for any Frobenius Lie algebra which is a biparabolic subalgebra of a semisimple Lie algebra; but may fail in general. Call a regular if there are no proper semi-invariant polynomial functions on a* and if the subalgebra of invariant functions is polynomial. In this case there are no known counter-examples to integrality. It is shown that if a is the canonical truncation of a biparabolic subalgebra of a simple Lie algebra g which is regular and admits an adapted pair (h,η), then the eigenvalues of ad \ h on a lie in 1m Z, where m is a coefficient of a simple root in the highest root of g. Let a be a regular Lie algebra admitting an adapted pair (h,η). Let a Z be the subalgebra spanned by the eigensubspaces of ad \ h with integer eigenvalue. It is shown that the canonical truncation of a Z is regular. Sufficient knowledge of the relation between the generators for the invariant polynomial functions on a* and on a* Z can then lead to establishing the integrality of (h,η). This method is used to show the integrality of an adapted pair for a truncated parabolic subalgebra of a simple Lie algebra of type C.