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In this paper, we prove that the variety Cₘ (L) of commuting m-tuples of elements of simple Lie algebra L is often reducible. Explicitely, we prove it is reducible for all simple Lie algebra L not isomorphic to sl₂ and sl) ₃, and all m 4. We also prove it is reducible for C₃ (L) for L of types Bₖ, Cₖ, E₇, E₈, F₄, G₂, k 2, as well as for Dₗ for l 10. We do this by proving Theorem on Adding Diagonals, that says that if we can find a simple Lie subalgebra L' whose Dynkin diagram is a subdiagram of the Dynkin diagram of L, then under mild conditions, from the fact that Cₘ (L') is reducible, it follows that Cₘ (L) is also reducible.
Nikola Kovačević (Fri,) studied this question.