Maximal dimensional subalgebras of general Cartan type Lie algebras
Abstract
Let be a field of characteristic zero and let Wn = Der([x1,·s,xn]) be the nth general Cartan type Lie algebra. In this paper, we study Lie subalgebras L of Wn of maximal Gelfand-Kirillov (GK) dimension, that is, with GKdim(L) = n. For n = 1, we completely classify such L, proving a conjecture of the second author. As a corollary, we obtain a new proof that W1 satisfies the Dixmier conjecture, in other words, End(W1) \0\ = Aut(W1), a result first shown by Du. For arbitrary n, we show that if L is a GK-dimension n subalgebra of Wn, then U(L) is not (left or right) noetherian.
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