On linear differential operators related to the Jacobian conjecture (Q1120698)

It is known that the Jacobian conjecture is not true in the analytic case. The author proposes the following ``analytic Jacobian conjecture'' in the two-dimensional case: If \(f,g\in E_ 2\) (the ring of entire functions on \({\mathbb{C}}^ 2)\) and \(Jac(f,g)=1\), then the set \(\{\) Jac(f,h): \(h\in E_ 2\}\subset E_ 2\) is dense in \(E_ 2\) (in the topology of uniform convergence on compact subsets of \({\mathbb{C}}^ 2).\) The author proves that if the above conjecture is true, then the Jacobian conjecture for polynomials holds. The question whether \(\{\) Jac(f,h): \(h\in E_ 2\}\) is dense in \(E_ 2\) or not is reduced to the question if a certain Fréchet space admits continuous linear operators with empty spectrum.