Integrable generators of Lie algebras of vector fields on SL2(C) and on xy = z2
Abstract
For the special linear group SL2(C) and for the singular quadratic Danielewski surface x y = z2 we give explicitly a finite number of complete polynomial vector fields that generate the Lie algebra of all polynomial vector fields on them. Moreover, we give three unipotent one-parameter subgroups that generate a subgroup of algebraic automorphisms acting infinitely transitively on x y = z2.
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