Some amazing properties of spherical nilpotent orbits

Abstract

Let be simple Lie algebra. We give a conceptual proof for the fact that the nilpotent orbits of height 3 are spherical. It is shown that if the highest root of is fundamental, then has a specific nilpotent orbit of height 3. This orbit satisfies several interesting relations. Moreover, it can be used for an intrinsic construction of a G2 grading in . We also discuss an approach to describing the algebra of covariants on a nilpotent orbit. For the nilpotent orbits of height 2, it is shown that the algebra of regular functions is a free module over the algebra of covariants. For the nilpotent orbits of height 3, a conjectural description of the algebra of covariants is given. This description is compatible with all previously known examples.

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