On pairs of commuting derivations of the polynomial ring in two variables

Abstract

Let k be an arbitrary field of characteristic zero, k[x, y] be the polynomial ring and D a k-derivation of the ring k[x, y]. Recall that a nonconstant polynomial F∈ k[x, y] is said to be a Darboux polynomial of the derivation D if D(F)=λ F for some polynomial λ ∈ k[x, y]. We prove that any two linearly independent over the field k commuting k-derivations D1 and D2 of the ring k[x, y] either have a common Darboux polynomial, or D1=Du1, D2=Du2 are Jacobian derivations i.e., Di(f)= J(ui, f) for every f∈ k[x, y], i=1, 2, where the polynomials u1, u2 satisfy the condition J(u1, u2)=c∈ k. This statement about derivations is an analogue of the known fact from Linear Algebra about common eigenvectors of pairs of commuting linear operators.