Simple derivations in two variables
Abstract
Let k be a field of characteristic zero. If c1, c2∈ k \0\, s,t≥ 1 and u≥ 0, then it is shown that the k-derivations ∂x + xu(c1xtys+c2)∂y and ∂x + xu(c1xt+c2ys+1)∂y of k[x,y] are simple. We also give a necessary and sufficient condition for the k-derivation yr∂x + (c1xt1ys1+c2xt2ys2)∂y, where r, t1, s1, t2, s2 ≥ 0 and c1, c2∈ k, of k[x,y] to be simple.
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