On nilpotent commuting varieties and cohomology of Frobenius kernels
Abstract
The paper studies the dimensions of irreducible components of commuting varieties of (restricted) nilpotent r-tuples in a classical Lie algebra g defined over an algebraically closed field k. As applications, we obtain some new results on the structure of the (even) cohomology ring of Frobenius kernels Gr for each r 1, where G is the simply connected, simple algebraic group such that Lie(G)=g. Explicit calculations for rank two groups are also presented.
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