Lie Subalgebras of vector fields and the Jacobian Conjecture
Abstract
We study Lie subalgebras L of the vector fields Vecc( A2) of affine 2-space A2 of constant divergence, and we classify those L which are isomorphic to the Lie algebra aff2 of the group Aff2(K) of affine transformations of A2. We then show that the following three statements are equivalent: (i) The Jacobian Conjecture holds in dimension 2; (ii) All Lie subalgebras L ⊂ Vecc( A2) isomorphic to aff2 are conjugate under Aut( A2); (iii) All Lie subalgebras L ⊂ Vecc( A2) isomorphic to aff2 are algebraic.
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